Institute of Prediction Technology & Forensic Mathematics (PT&FM)
President: John Wong

Institute of Prediction Technology & Forensic Mathematics (PT&FM)

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John Wong's Numerology & Astrology

Preamble Theme: How nuclear explosions are related to nuclear war in A.D.2047 and destruction of the Earth in A.D. 2054 ?

File name: Nuclear-war.A4

Author: Mr. Wong Chung Kai, John

Date: 20th Sept., 2014.


Sir Isaac Newton (25th December, 1642 – 20th March, 1727) was a great English physicist, mathematician, astronomer and natural philosopher. He discovered that the physical phenomenon (Event) of an apple falling down from an apple tree was caused by gravitational force of the Earth. In fact, all events happening in the universe are wholly controlled by gravitational waves. Gravitational waves are generated by interference of gravitational fields of stars. Different masses of stars possess different astral energy. Their gravitational waves produced by interference of their gravitational forces can cause different types of events. These are the individual characteristics of stars.

I am a scientist and mathematician keen on `Prediction Technology and Forensic Mathematics' (預測科技及法證數學). I know the motion of stars is the Diary of God, Jehovah, and time is a switch of an event. I create a subject called `Time Genetics' to study the skills to forecast the occurrence of an event or ascertain a happened event by mathematical and logical approaches based on those formulae created and derived from events in history. I call the skills to forecast the fate of a person as `Micro-Prediction'. The time and place of birth are crucial. I call the skills to predict the destiny of a group of people as `Macro-Prediction'. Biblical prophecies are crucial. I assume all events occurred are caused by `Time Genes' and `Timeon' is a basic fate particle in a time gene. In nature, timeons can be observed by events. They are classified as `Yearon', `Monthon',`Dayon' and `Houron'. `Yearon' is a fate particle such that its influence on an event is one year. Its location varies with solar year. `Monthon' is a fate particle such that its influence on an event is one month. Its location varies with solar month. `Dayon' is a fate particle such that its influence on an event is one day. Its location varies with day. `Houron' is a fate particle such that its influence on an event is a couple of hours. Its location varies with two hours. After the characteristic of a timeon is determined by observations of its influence on events, the location of it can be expressed by a general formula in terms of Stem (U) or Root (Z) of time, or related to both of them. The general formula derived from original observations can be applied to any time interval such as millennium. In that case, the influence of timeon becomes 1,000 years. Up to present, the longest time interval of timeon is 1,000 years. The shortest is 4.17 seconds (4 and 1/6 seconds). For these timeons, new names are given to them. `Millenon' is a timeon such that its influence on an event is 1,000 years. Its location varies with millennium. `Centuryon' is a timeon such that its influence on an event is 100 years. Its location varies with century. `Decadeon' is a timeon such that its influence on an event is 10 years. Its location varies with a decade. `Yearon' is a timeon such that its influence on an event is one year. Its location varies with year. `Monthon' is a timeon such that its influence on an event is one month. Its location varies with month. `Dayon' is a timeon such that its influence on an event is one day. Its location varies with day. `Houron' is a timeon such that its influence on an event is a couple of hours. Its location varies with 2 hours. `Minuteon' is a timeon such that its influence on an event is 10 minutes. Its location varies with 10 minutes. `Secondon' is a timeon such that its influence on an event is 50 seconds. Its location varies with 50 seconds. `Tinyon' is a timeon such that its influence on an event is 4.17 seconds (4 and 1/6 seconds). Its location varies with 4.17 seconds. Thus, a `Millenon' can show the picture of an event for 1,000 years. A `Tinyon' can show the pictures of an event in every 4.17 seconds. Actually, `Timeons' are real stars in the sky. They are huge `particles'. The composition of substances in a star produces unique gravitational force. The spectra of forces of stars are like electromagnetic waves but they have no electric charges. Each timeon has its special influence on an event.

The celestial phenomenon of galaxies is called `Time Model'. In `Time Genetics', it is named as `Time Gene'. A time gene is a combination of two or more timeons. It can switch on several special events at the same time. Its power is the resultant of gravitational forces. In other words, God governs the material universe by the motion of stars and stars are ruled by angels called `Angel of Star'. They are angels who can control the events of human beings in the world by gravitational forces. I express the time genes in a general form of `Ln'. `L' is alphabets from A to J and `n' is numbers from 0 to 11. The alphabetical part is called the `Stem' (U) of a time gene. Its value is its order in alphabet. So, 1=A, 2=B, 3=C, 4=D, 5=E, 6=F, 7=G, 8=H, 9=I & 10=J. For example, 8 means `H'. The numerical part is called the `Root' (Z). For values of the Root, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. Both the stems and roots are recurring. The total number of combinations of stems and roots are 60, like `A0',`B1', ...,`I10', `J11'. According to their sequence, time genes can also be expressed by numbers with 2 digits, like `01',`02',...,`58',`59' and `60'. So, A0=01,B1=02,C2=03, ...,H9=58,I10=59 and J11=60. They are the `Time Codes' in Time Genetics. The combination of `Stem' and `Root' still keeps records of year, month, day and hour in China at present. Besides `Roots' are codes to keep records of time, they show directions and locations in the earth and in the universe as well. The space is divided in 12 sectors. I called the sector which a `Root' represents its direction and location as `Zone'. The name of a `Zone' is same as its alphabetical and numerical name of its `Root'. With reference to the Purple Mountain Observatory at 32 degrees latitude north and 120 degrees longitude east in Nanjing of China as the centre of the earth looking at the sky, each sector of space in the universe is 30 degrees. Altogether, 12 sectors of space are 360 degrees. `Zone A' is north. Its `Zone Number' is assigned to 0. It is `Zone 0'. `Zone B' is north-north-east (NNE). Its `Zone Number' is assigned to 1. It is `Zone 1'. `Zone C' is east-north-east (ENE). Its `Zone Number' is assigned to 2. It is `Zone 2'. `Zone D' is east. Its `Zone Number' is assigned to 3. It is `Zone 3'. `Zone E' is east-south-east (ESE). Its `Zone Number' is assigned to 4. It is `Zone 4'. `Zone F' is south-south-east (SSE). Its `Zone Number' is assigned to 5. It is `Zone 5'. `Zone G' is south. Its `Zone Number' is assigned to 6. It is `Zone 6'. `Zone H' is south-south-west (SSW). Its `Zone Number' is assigned to 7. It is `Zone 7'. `Zone I' is west-south-west (WSW). Its `Zone Number' is assigned to 8. It is `Zone 8'. `Zone J' is west. Its `Zone Number' is assigned to 9. It is `Zone 9'. `Zone K' is west-north-west(WNW). Its `Zone Number' is assigned to 10. It is `Zone 10'. `Zone L' is north-north-west (NNW). Its `Zone Number' is assigned to 11. It is `Zone 11'. The `Centroid of Time' (Z) always lies in a `Zone Number' same as its Root (Z). The destiny of a person can be evaluated in 13 main categories. They are called the `Destiny Sector' of a person. The thirteen Destiny Sectors of human beings are: Soul (S), Body (B), Parents Sector (PS), Behaviour Sector (BS), Family Sector (FS), Work Sector (WS), Servants Sector (SS), Environment Sector (ES), Health Sector (HS), Money Sector (MS), Descendants Sector (DS), Spouse Sector (SS) and Siblings Sector (SS).

The Stem (U) of Year Formula for years in A.D. is U=7+y (Mod 10) and the Root (Z) of Year Formula for years in A.D. is Z=8+y (Mod 12). `y' is the year after `Joint of Year'. Usually, it is on a day 3-5th of February in Gregorian calendar. `Joint of Year' is the border of two consecutive years. The time before `Joint of Year' is regarded as previous year. `x=(Mod 10)' is a special modulated function. It differs from normal modulated functions. It is a modulated function such that if x>10 then `x' becomes `x-10'. If x<1 then `x' becomes `x+10'. Thus, the value of `x' always lies from 1 to 10. `x=(Mod 12)' is a modulated function such that if x>11 then `x' becomes `x-12'. If x<0 then `x' becomes `x+12'. Hence, the value of `x' always lies from 0 to 11. Its location is from `Zone A' to `Zone L'. The Stem (U) of Year 1973 is U=7+1973 (Mod 10) and the Root (Z) of Year 1973 is Z=8+1973 (Mod 12). U=1980 (Mod 10) and Z=1981 (Mod 12). U=1980-197x10 and Z=1981-165x12. U=10 and Z=1. The value of Stem (U) equals 10 means 10th alphabet, `J'. So, the Year Code is `J1'. `Z=1' means the `Centroid of Time' is in `Zone 1'. The Numerology (N) Formula of any Time Code is N=5x{11-[(Z-U) (Mod 12)]}+U. `U' is the Stem and `Z' is the Root of Time Code. Since the Time Code of 1973 is the Year Code, which is `J1' and U=10 & Z=1, the Numerology is N=5x{11-[(1-10) (Mod 12)]}+10. N=5x{11-[-9 (Mod 12)]}+10. N=5x{11-[12-9]}+10. N=5x{11-3}+10. N=5x8+10. N=50. It means the Time Code (TC) of `J1' is 50th entry in the Periodic Table of Numerology. `Yeu' & `Tor' are timeons which means `massive destruction' or `injury'. Yeu=9+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12) & Tor=7+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). `y' is the year in A.D. after `Joint of Year'. Usually, it is on a day 3-5th of February in Gregorian calendar. `Joint of Year' is the border of two consecutive years. The time before the `Joint' is regarded as previous year. `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. Natural numbers are 1,2,3,4,5,……. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up it. `x=(Mod 12)' is a modulated function such that if x>11 then `x' becomes `x-12'. If x<0 then `x' becomes `x+12'. Hence, the value of `x' always lies from 0 to 11. Its location is from `Zone A' to `Zone L'. In terms of Zone Number (Z), they are equivalent to from `Zone 0' to `Zone 11'. Since the locations of timeons `Yeu' and `Tor' vary with `R[y/10]' and `R[y/10]' is equal to the last digit of the year in Gregorian calendar, find out all cases when `Yeu' or `Tor' lies in the same zone number as the Root (Z) of Year. Since zone number of the Root (Z) of any Time Code is the `Centroid of Time', timeons `Yeu' or `Tor' can impose events of `massive destruction' or `injury' in that period of time. The events are wars or great disasters. If y=1973, Yeu=9+R[1973/10]+I[{R[1973/10]}/2]-3xI[{R[1973/10]}/8] (Mod 12). Yeu=9+3+I[3/2]-3xI[3/8] (Mod 12). Yeu=12+I[1.5]-3xI[0.375] (Mod 12). Yeu=12+1-3x0 (Mod 12). Yeu=13 (Mod 12). Yeu=13-12. Yeu=1. So, U=J and Z=Yeu=1. Let `R' be the last digit of y in A.D.. Since R[1973/10]=3, R=3. So, when R=3, Yeu=1. An example for y=1989, U=7+y (Mod 10) & Z=8+y (Mod 12). U=7+1989 (Mod 10) & Z=8+1989 (Mod 12). U=1996 (Mod 10) & Z=1997 (Mod 12). U=1996-199x10 & Z=1997-166x12. U=6 and Z=5. `U=6' means the Stem of Year is the sixth alphabet. It stands for `F'. Since the value of the Root of Year 1989 is 5, the Year Code (YC) of 1989 is `F5'. If y=1989, Tor=7+R[1989/10]+I[{R[1989/10]}/2]-3xI[{R[1989/10]}/8] (Mod 12). Tor=7+9+I[9/2]-3xI[9/8] (Mod 12). Tor=16+I[4.5]-3xI[1.125] (Mod 12). Tor=16+4-3x1 (Mod 12). Tor=17 (Mod 12). Tor=17-12. Tor=5. So, U=F and Z=Tor=5. Since `R' stands for the last digit of year (y) in A.D. of Gregorian calendar and R[1989/10]=9, R=9. Thus, when R=9, Tor=5. The Numerology (N) Formula of any Time Code is N=5x{11-[(Z-U) (Mod 12)]}+U. `U' is the Stem and `Z' is the Root of Time Code. Since the Time Code of 1989 is the Year Code, which is `F5' and U=6 & Z=5, the Numerology is N=5x{11-[(5-6) (Mod 12)]}+6. N=5x{11-[-1 (Mod 12)]}+6. N=5x{11-[12-1]}+6. N=5x{11-11}+6. N=5x0+6. N=6. It means the Time Code of `F5' is 6th entry in the Periodic Table of Numerology.

In history, 4th Middle East War among Israel and Arabic states was switched on by timeon `Yeu' on 6th Oct.,1973. The collapse of Union of Soviet Socialist Republics (U.S.S.R.) was turned on by timeon `Tor'. The Berlin Wall was destroyed on 9th Nov.,1989. The set of elements of time genes with great disaster or war in Time Genetics is T1={E4, F5, C6, D7, I0, J1, C4, D5, E6, F7, I10, J11}. Time genes are easier to understand and remember in the form of Numerology (N). T={05, 06, 43, 44, 49, 50, 53, 54, 55, 56, 59, 60}. That is, 05=E4, 06=F5, 43=C6, 44=D7, 49=I0, 50=J1, 53=C4, 54=D5, 55=E6, 56=F7, 59=I10 and 60=J11.

Why does massive destruction or war occur fiercely when `Yeu' or `Tor' coincides with the `Root' (Z) of time ? The reason is that there are two yearons such that they always have same orbit as the `Root' (Z) of time. `Kim' and `Zee' are two timeons which vary with year. `Kim' means `War' or `Wound' and `Zee' means `Fall down' or `Dead body'. By observation from the celestial phenomenon of galaxies, the orbit of `Kim' is Kim=8+y (Mod 12) and the orbit of `Zee' is Zee=8+y (Mod 12). `y' is the year after `Joint of Year'. Usually, it is on a day 3-5th of February in Gregorian calendar. `Joint of Year' is the border of two consecutive years. The time before `Joint of Year' is regarded as previous year. `x=(Mod 12)' is a modulated function such that if x>11 then `x' becomes `x-12'. If x<0 then `x' becomes `x+12'. Since the `Root of Year' is Z=8+y (Mod 12), Kim=Z and Zee=Z. These are the general formulae of `Kim' and `Zee'. They can be apply to any time interval, like millennium, century, decade, year, month, day, hour, minute and second. Events of wound and death always occur, especially when `Yeu' or `Tor' lies in same `Zone Number' as the `Root' (Z) of time. This phenomenon shows that time is the cause of death. If time exists, death will occur. If time vanishes, death will extinct. Though time exists in the universe, the orbits of `Kim' and `Zee' do not coincide with the `Root' (Z) of time before Adam and Eve have sinned. After Adam and Eve have sinned, the orbits of `Kim' and `Zee' altered. The orbits of `Kim' and `Zee' coincide with the `Root' (Z) of time. It means death enters the world. The mighty God, Jehovah, use stars to administer the material universe. At the end of the world, some stars will be swallowed by black holes and time on these stars will vanish. The material world on these stars will be transformed into a brand new universe of pure energy. The rules in the brand new universe are different from our universe.

If the Time Code of Annual Fortune, Decade Fortune, Centennial Fortune or Millennial Fortune of the earth matches with any element in the set, timeon `Yeu' or `Tor' can impose events of war of massive destruction or disaster of injury to people. Inspecting the Periodic Table of Numerology of timeons `Yeu' & `Tor' against Roots (Z) of time, 4 consecutive genes are found in a group. The Time Codes (TC) are `C4',`D5',`E6'& `F7'. Their Numerology (N) are 53, 54, 55 and 56. Since timeons `Yeu' and `Tor' mean `massive destruction' or war, match them with human history from 1914 to 1953 because World War I broke out on Tue., 28th July, 1914 and Korean War ended on Mon., 27th July, 1953 by Korean Armistice Agreement. The Stem (U) and Root (Z) of Decade Fortune (Big Fortune) Formulae of the Earth in terms of year `y' in A.D. can be set up. U={42+I[(y-4)/10] (Mod 60)} (Mod 10) & Z={41+I[(y-4)/10] (Mod 60)} (Mod 12). `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `n=(Mod 60)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 60. If n>60 then `n' becomes `n-60' and if n<1 then `n' becomes `n+60'. Thus, the value range of `n=(Mod 60)' is from 1 to 60. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11. The Decade Fortune (Big Fortune) Formula of the Earth in terms of Numerology (N) can also be set up. The Decade Fortune Formula of the Earth is N=42+I[(y-4)/10] (Mod 60). `N=(Mod 60)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 60. If N>60 then `N' becomes `N-60' and if N<1 then `N' becomes `N+60'. Thus, the value range of `N=(Mod 60)' is from 1 to 60. For year 2044, U={42+I[(2044-4)/10] (Mod 60)} (Mod 10) & Z={41+I[(2044-4)/10] (Mod 60)} (Mod 12). U={42+I[204] (Mod 60)} (Mod 10) & Z={41+I[204] (Mod U={42+204 (Mod 60)} (Mod 10) & Z={41+204 (Mod 60)} (Mod 12). U={246 (Mod 60)} (Mod 10) & Z={245 (Mod 60)} (Mod 12). U=246-60x4 (Mod 10) & Z=245-60x4 (Mod 12). U=6 (Mod 10) & Z=5 (Mod 12). U=6 & Z=5. `U=6' means 6th alphabet. The Stem of Decade Fortune of the Earth from 2044 to 2053 is `F' and its Root (Z) is 5. Since `F5' is an element in the set of time genes with great disaster or war in Time Genetics, A.D.2044 to 2053 is a decade years of great disasters or wars. Inspecting the Decade Fortunes of the Earth reveals the time genes of 1934-1943, 1944-1953, 1954-1963, 1964-1973, 1974-1983 and 1984-1993 are E6, F7, G8, H9, I10 and J11. Their Numerology (N) are 55, 56, 57, 58, 59 and 60. Among the Decade Fortunes of the Earth, the Decade Time Gene of 1944-1953 (F7) is extraordinary important. Why ? In history, Germany exploded the first atomic device on 12th Oct.,1944. Germany also tested the atomic weapon on 3rd and 12th Mar.,1945. The United States of America (U.S.A.) successfully exploded her first atomic bomb on 16th Jul.,1945 and bombarded Hiroshima and Nagasaki of Japan on 6th and 9th Aug.,1945. Many people were killed in nuclear war. The Union of Soviet Socialist Republics (U.S.S.R.) successfully exploded her first atomic bomb on 29th Aug.,1949. The United Kingdom of Great Britain (UK) successfully exploded her first atomic bomb on 3rd Oct.,1952. The United States of America (U.S.A.) successfully exploded her first hydrogen bomb on 1st Nov.,1952. These revealed that the time gene `F7' of Decade Fortune of the Earth from 1944 to 1953 is related to nuclear wars. The timeons in Time Model with stem `F' in any time gene of the Earth means nuclear destruction of the world. The time genes `A8' and `B9' of the years 1944 and 1945 respectively are not elements in set `T1'. The nuclear war in 1945 was merely switched on by the Decade Time Gene of `F7'. The influence of it lasted 10 years from 1944 to 1953. Further inspections by Decade Fortune Formula of the Earth reveal time genes of 1994-2003, 2004-2013, 2014-2023, 2024-2033, 2034-2043 and 2044-2053 are A0, B1, C2, D3, E4 and F5. Their Numerology are 01, 02, 03, 04, 05 and 06. The Decade Time Genes of A0, B1, C2, D3 are not elements of set `T1'. So, World War III is unlikely to occur before A.D.2033. The wars in A.D.1994-2033 are small and regional. World War III is likely to occur in A.D.2034-2053. The Decade Fortune of the Earth from 2044 to 2053 is `F5' and `F5' is a bad time gene because `Tor' lies in the same zone as the Root (Z) of its Time Code. The time gene is particularly harmful to U.S.A. since the location of U.S.A. is in `Zone 11', which is in the opposite zone of timeon `Tor'. It means war or `massive destruction'. The same scenario happened in 1989 when the Union of Soviet Socialist Republics (U.S.S.R.) began to collapse. Note that the Year Code of 1989 is `F5'. Since the Decade Fortune of the Earth from 2044 to 2053 is `F5', U.S.A. will be ruined like U.S.S.R. in that period. Learnt from history, besides the time gene of `F5' stands for `massive destruction' or `injury', it also means the beginning of collapse of a superpower in the world like U.S.S.R. (A.D.1989-1991) or U.S.A. (A.D.2044-2053). Beginning from A.D.2054, Jesus Christ will return and establish Millennium Kingdom for 1,000 years (A.D.2055-3054). Since the Time Codes of Decade Fortunes of the Earth from 2034 to 2043 is `E4' and from 2044 to 2053 is `F5' and they mean `massive destruction' or `injury', the great tribulation of the world will last 21 years, 2034-2054. The duration of `Great Tribulation of the World' is a triple of 7 years. It is the period of time mentioned in verse 13, chapter 10 of Book of Daniel, `But the prince of the kingdom of Persia withstood me (Jesus Christ) one and twenty days (21 Atonement Days stand for 21 years)……’ and in chapter 6-8, Book of Revelation in the Holy Bible. It is equivalent to the time space Jesus Christ unsealed 5-7th seals mentioned in the Book of Revelation. The last 7 years are called `Great Tribulation of Israel', 2047-2054. The period of time is mentioned in chapter 8-16, Book of Revelation in the Holy Bible. It is equivalent to the time space that seven angels sounded 7 trumpets when Jesus Christ unsealed the 7th seal. They are the last 7 years of the present world before the commencement of a new era, the Millennium Kingdom (A.D.2055-3054). The prophecy of `Seventy Weeks' in chapter 9, verses 24-27, in the Book of Daniel has told us the dates of the Second Coming of Jesus Christ and the establishment of Millennium Kingdom. In history, the going forth of 3rd Commandment to re-build Jerusalem by Persian King Artaxerxes was in 445B.C. and the Holy Covenant between Palestine and Israel was Wye River Memorandum signed on Fri.,23rd Oct.,1998 in first golden jubilee of Israel.

From the going forth of 3rd Commandment to restore Jerusalem to the Holy Covenant (Wye River Memorandum on 23rd Oct.,1998) between Israel and Palestine is 445B.C.+7x70+(7x70)x3+7x7+7x62→A.D.1998.

From the going forth of 3rd commandment to restore Jerusalem to the Holy Covenant (Wye River Memorandum on 23rd Oct.,1998) between Israel and Palestine is (Tue.,23rd Oct.,445B.C.)+7x70 years+(7x70)x3 years+7x7 years+7x62 years→(Fri.,23rd Oct.,1998).

From the going forth of 3rd Commandment to the Second Coming of Jesus Christ is 445B.C.+(7x70)x5+49→A.D.2054.

From the going forth of 3rd Commandment to the Second Coming of Jesus Christ is 445B.C.+50x49+49→A.D.2054.

From Holy Covenant (Wye River Memorandum) to Jesus return is (Fri.,23rd Oct.,1998)+360x7 days+360x49 days+50x7 days→(Thu.,17th Dec.,2054).

From Holy Covenant to setting up of Millennium Kingdom is (Fri.,23rd Oct.,1998)+360x7 days+360x50 days→(Sun.,27th Dec.,2054).

Theoretically, the Second Coming of Jesus Christ is in A.D.2005 because of `445B.C.+(7x70)x5→A.D.2005'. `445B.C.+(7x70)x5→A.D.2005' is equivalent to `445B.C.+50x49→A.D.2005'. `(7x70)x5' is 2450, same as `50x49'. `(7x70)x5' means five-fold `Seventy Weeks' and `50x49' is forty-nine `Golden Jubilees'. 2450 is the L.C.M. of `Seventy Weeks' (7x70) and `Golden Jubilee' (50). The prophecy of `Seventy Weeks' in chapter 9, verses 24-27, in the Book of Daniel has been fullfilled twice already.

From the going forth of 1st commandment (by Persian King Cyrus) to restore Jerusalem to First World War began is 536B.C.+(7x70)x5→A.D.1914.

From the going forth of 1st commandment to restore Jerusalem to having hope of restoring the state of Israel is 536B.C.+50x49→A.D.1914.

From the going forth of 2nd commandment to restore Jerusalem to Jesus Christ was anointed by the Holy Spirit to be the Messiah the Prince of the King of Millennium is 457B.C.+7x7+7x62→A.D.26.

From the going forth of 2nd commandment to restore Jerusalem to Jesus Christ was anointed by the Holy Spirit to be the Messiah the Prince of the King of Millennium is (Tue.,24th Oct.,457B.C.)+7x7 years+7x62 years→(Sat.,24th Oct.,26A.D.).

From the going forth of 2nd commandment to restore Jerusalem to Jesus Christ was crucified dead (the Messiah the Prince was cut off) is 457B.C.+7x7+7x62+3.5→A.D.30.

From the going forth of 2nd commandment to restore Jerusalem to Jesus Christ was crucified dead (the Messiah the Prince was cut off) is (Tue.,24th Oct.,457B.C.)+7x7 years+7x62 years+1260 days→(Fri.,5th April, 30 A.D.).

From Jesus Christ was born to Jesus Christ was crucified dead (the Messiah the Prince was cut off) is 4B.C.+33.5→A.D.30.

From the going forth of 2nd commandment to restore Jerusalem to the confirmation of the existence of Israel and Palestine (Oslo Accords on Fri.,10th Sept.,1993) is 457B.C.+(7x70)x5→A.D.1993.

From the going forth of 2nd commandment to restore Jerusalem to the confirmation of the existence of Israel and Palestine (Oslo Accords on Fri., 10th Sept.,1993) is 457B.C.+50x49→A.D.1993.

Amazingly, the Second Coming of Jesus Christ was not in A.D.2005. It was delayed. It will be delayed by 49 years. These 7x7 years is equivalent to the time space when Jesus Christ unsealed the Book of Revelation in heaven. This is equivalent to what only God know about the end of the world as it was mentioned in verse 36, chapter 24, Book of St. Matthew, `But of that day and hour knoweth no man, no, not even the angels of heaven, but my Father (Jehovah) only’. Each seal corresponds to 7 years, altogether 49 years (A.D.2005-2054). The last 21 years (A.D.2034-2054) are `Great Tribulation of the World'. The duration of 7x3 years is equivalent to unseal the 5th to 7th seals. The last 7 years (A.D.2047-2054) are equivalent to sounding 7 trumpets, called `Great Tribulation of Israel'. The greatest `massive destruction' is in A.D.2054 because it is the 49th year of the delay of the Second Coming of Jesus Christ and the 7x7th year is the Year of Atonement in Israel. So, there will be great disasters in Israel. Moreover, A.D.2054 is the 1st year of Centennial Fortune of time gene `F1'. It is a combination of timeons `Yeu' and `Hui'. The World War III will be ignited by Japan. Japan can deceive and make the United States of America (U.S.A.) a fool to involve in Sino-Japanese War against China in Asia. At the same time, from A.D.2034 to A.D.2054, Iran-Arabic Islamic Allies (Islam Public State) will invade many countries in the Middle East. U.S.A. will be lonesome after A.D.2034 and Palestine will conquer Israel in A.D.2050.

`Hui' is a timeon which means `empty' or `weakness'. By observation, the location of `Hui' in terms of year `y' in A.D. is Hui=2+y (Mod 12). Since the Root (Z) of Year Formula for years in A.D. is Z=8+y (Mod 12), a general formula can be derived. Z-6=2+y (Mod 12). Compare it with Hui=2+y (Mod 12). Hui=Z-6 (Mod 12). Hui=Z+12-6 (Mod 12). Hui=Z+6 (Mod 12). The general formula of timeon `Hui' is Hui=Z+6 (Mod 12). Since the Opposite Zone (Zo) Formula is Zo=Z+6 (Mod 12), the location of `Hui' always lies in the opposite zone of the Root (Z) of any Time Code (TC). When timeon `Yeu' or `Tor' meets `Hui', it means `massive destruction' that makes every thing `empty'. The damage is very great. War, earthquake, tsunami, hurricane, volcano eruption, snowstorm, typhoon, rainstorm, flooding, landslide, fire disaster, plague, famine and traffic accidents of aeroplanes, vehicles and ships will occur frequently in that period. If the Time Code is a Year Code, the influence lasts for 1 year. If it is a Decade Fortune Code, the influence is 10 years. If it is Centennial, the influence is 100 years. The general formula of `Yeu' in terms of Stem (U) is Yeu=2+U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). For Time Code `D1', Stem U=4 because `D' is 4th alphabet and Root Z=1. Since the Opposite Zone (Zo) is Zo=Z+6 (Mod 12), Zo=1+6 (Mod 12). Zo=7 (Mod 12). Zo=7. Yeu=2+4+I[4/3]-2xI[4/5]-2xI[4/6]+2xI[4/7]+2xI[4/10] (Mod 12). Yeu=6+I[1.33]-2xI[0.8]-2xI[0.66]+2xI[0.57]+2xI[0.4] (Mod 12). Yeu=6+1-2x0-2x0+2x0+2x0 (Mod 12). Yeu=7 (Mod 12). Yeu=7. The general formula of timeon `Hui' is Hui=Z+6 (Mod 12). Since Z=1, Hui=1+6 (Mod 12). Hui=7 (Mod 12). Hui=7. Thus, Yeu=Hui. It means Time Code `D1' is a time gene with the combination of timeons `Yeu' and `Hui' lying in the Opposite Zone (Zo) of the Root (Z) of a Time Code. Its harm is greater than a Root with `Yeu' in its zone. The general formula of `Tor' in terms of Stem (U) is Tor=U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+2xI[U/10] (Mod 12). For Time Code `F11', Stem U=6 because `F' is 6th alphabet and Root Z=11. Since the Opposite Zone (Zo) is Zo=Z+6 (Mod 12), Zo=11+6 (Mod 12). Zo=17 (Mod 12). Zo=17-12. Zo=5. Tor=6+I[6/3]-I[6/5]-2xI[6/6]+I[6/7]+2xI[6/10] (Mod 12). Tor=6+I[2]-I[1.2]-2xI[1]+I[0.857]+2xI[0.6] (Mod 12). Tor=6+2-1-2x1+0+2x0 (Mod 12). Tor=5 (Mod 12). Tor=5. The location of `Hui' is Hui=Z+6 (Mod 12). Since Z=11, Hui=11+6 (Mod 12). Hui=17 (Mod 12). Hui=17-12. Hui=5. Thus, Tor=Hui. It means Time Code `F11' is a time gene with the combination of timeons `Tor' and `Hui' lying in the Opposite Zone (Zo) of the Root (Z) of a Time Code. Its harm is greater than a Root with `Tor' in its zone. The Year Code of 1937 is `D1'. In history, 2nd Sino-Japanese War was turned on by `Yeu' & `Hui' on 7th Jul.,1937. The Year Code of 1959 is `F11'. The Vietnam War was switched on by timeons `Tor' and `Hui' on 8th Jul.,1959. By inspecting all possibilities of `Yeu' or `Tor' associated with timeon `Hui' lying in the Opposite Zone (Zo) of the Root (Z) of Time Codes, the set of elements of time genes that can switch on great disasters or wars in Time Genetics is T2={C0, D1, I6, J7, C10, D11, E0, F1, I4, J5, E10, F11}. The time genes are easier to understand and remember in the form of Numerology (N). T2={13, 14, 19, 20, 23, 24, 25, 26, 29, 30, 35, 36}. That is, 13=C0, 14=D1, 19=I6, 20=J7, 23=C10, 24=D11, 25=E0, 26=F1, 29=I4, 30=J5, 35=E10 and 36=F11. If the Time Code of `Annual Fortune' (Year Fortune), Decade Fortune or Centennial Fortune of the earth matches with any element in the set, the combinations of `Yeu' with `Hui' or `Tor' with `Hui' can switch on wars of massive destruction or disasters of severe injury to people. How to determine the Centennial Fortune of the Earth ? When did Industrial Revolution take place in Europe ? Inspecting the Periodic Table of Numerology (N) of `Yeu' or `Tor' with `Hui' and Roots (Z) of time, 4 consecutive genes are found in a group. The Time Codes are `C10', `D11', `E0' and `F1'. Their Numerology (N) are 23, 24, 25 and 26. Since `Yeu' or `Tor' combined with `Hui' mean `massive destruction' that makes every thing `empty' or `injury' that people result in physical `weakness', the development of industrial technology is essential to make it real. If 2054 is the beginning of a new era in the world, match the 4 consecutive time genes with centennial history. The Centennial Time Code of `C10' is A.D.1754-1853. `D11' is A.D.1854-1953. `E0' is A.D.1954-2053. `F1' is A.D.2054-2153. For Numerology (N), N=23 is 1754-1853. N=24 is 1854-1953. N=25 is 1954-2053. N=26 is 2054-2153. The Stem (U) and Root (Z) of Centennial Fortune Formulae of the Earth in terms of year `y' in A.D. can be set up. U={6+I[(y-54)/100] (Mod 60)} (Mod 10) & Z={5+I[(y-54)/100] (Mod 60)} (Mod 12). For year 1754, U={6+I[(1754-54) /100] (Mod 60)} (Mod 10). U={6+I[1700/100] (Mod 60)} (Mod 10). U={6+I[17] (Mod 60)} (Mod 10). U={6+17 (Mod 60)} (Mod 10). U={23 (Mod 60)} (Mod 10). U=23 (Mod 10). U=23-10x2. U=3. The Stem (U) of Centennial Fortune of the Earth in A.D.1754 is `C' because `C' is 3rd alphabet. The Root (Z) of Centennial Fortune of the Earth in A.D.1754 is Z={5+I[(1754-54)/100] (Mod 60)} (Mod 12). Z={5+I[1700/100] (Mod 60)} (Mod 12). Z={5+I[17] (Mod 60)} (Mod 12). Z={5+17 (Mod 60)} (Mod 12). Z={22 (Mod 60)} (Mod 12). Z=22 (Mod 12). Z=22-12. Z=10. Thus, the Time Code (TC) of Centennial Fortune of the Earth from A.D.1754 to 1853 is `C10'. It means Industrial Revolution began in 1754. The Stem (U) of Centennial Fortune of the Earth in A.D.2054 is U={6+I[(2054-54)/100] (Mod 60)} (Mod 10). U={6+I[(2054-54)/100] (Mod 60)} (Mod 10). U={6+I[2000/100] (Mod 60)} (Mod 10). U={6+I[20] (Mod 60)} (Mod 10). U={6+20 (Mod 60)} (Mod 10). U={26 (Mod 60)} (Mod 10). U=26 (Mod 10). U=26-10x2. U=6. The Root (Z) of Centennial Fortune of the Earth in A.D.2054 is Z={5+I[(2054-54)/100] (Mod 60)} (Mod 12). Z={5+I[2000/100] (Mod 60)} (Mod 12). Z={5+I[20] (Mod 60)} (Mod 12). Z={5+20 (Mod 60)} (Mod 12). Z={25 (Mod 60)} (Mod 12). Z=25 (Mod 12). Z=25-12x2. Z=1. Since the Stem (U) and Root (Z) of Centennial Fortune (CeF) of the Earth in A.D.2054 is U=6 and Z=1, its Time Code is `F1'. `F1' is a bad time gene because it is an element in set `T2'. The time genes in set `T2' are combinations of timeon `Yeu' or `Tor' with `Hui' lying in the opposite zone of the Root (Z) of a Time Code. Since time gene `F1' is a combination of `Yeu' and `Hui', the `massive destruction' is extraordinary enormous. Thus, the Battle of Armageddon mentioned in chapter 16 of the Book of Revelation will be taken place in A.D.2054.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the end of Battle of Armageddon is 445B.C.+(7x70)x5+49-->A.D.2054.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the beginning of Millennium Kingdom is 445B.C.+50x49+50-->A.D.2055.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the ultimate battle at the end of Millennium Kingdom is 445B.C.+(7x70)x5+49+1000-->A.D.3054.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the end of Millennium Kingdom is 445B.C.+50x49+49+1000-->A.D.3054.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the beginning of Eternity is 445B.C.+(7x70)x5+50+1000-->A.D.3055.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the beginning of Eternity is 445B.C.+50x49+50+1000-->A.D.3055.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the beginning of Eternity after passing 7-fold `Seventy Weeks' and 70 years is 445B.C.+(7x70)x7+70-->A.D.3055.

From the going forth of the 3rd commandment by Persian King Artaxerxes to restore Jerusalem to the beginning of Eternity after passing 70 Jubilees is 445B.C.+50x70-->A.D.3055. The prophecy of `Seventy Weeks' means disaster and desolation of Israel but the statute of `Jubilee' leads to freedom and eternity. These are the basic principles of the prophecy of `Seventy Weeks' and the statute of `Jubilee'. `Seventy Weeks' is equivalent to seven-fold `Seventy' and seventy-fold `Jubilee' is equivalent to fifty-fold `Seventy'. Since seven-fold `Seventy Weeks' plus seventy is equal to seventy-fold `Jubilee', Jerusalem should be kept in desolation for seventy years in the time of Prophet Daniel for rejuvenation of modern Israel state. In fact, seventy years of desolation in Jerusalem is equal to the sum in years for twenty-one `Atonement Days' mentioned in chapter 10, verse 13, Book of Daniel and forty-nine years of time that Jesus Christ needed to unseal the Book of Revelation in heaven. Each seal stands for seven years of disaster. So, unsealing seven seals mean forty-nine years of desolation in Jerusalem. The desolation of seventy years in Jerusalem in the time of Prophet Daniel would make modern Israel survive in a rather peaceful condition for seventy years counting from her restoration of state in A.D.1948. Israel will come across a significant change in A.D.2018.

John Wong’s Prediction Technology & Forensic Mathematics (PT&FM) Website: http://ptfm.orgfree.com

E-mail: wck_john@hotmail.com

President: Mr. Wong Chung Kai, John. How to predict world's nuclear war: Picture #1 How to predict world's nuclear war: Picture #2 How to predict world's nuclear war: Picture #3 How to predict world's nuclear war: Picture #4 How to predict world's nuclear war: Picture #5 How to predict world's nuclear war: Picture #6 How to predict world's nuclear war: Picture #7 How to predict world's nuclear war: Picture #8 How to predict world's nuclear war: Picture #9 How to predict world's nuclear war: Picture #10 How to predict world's nuclear war: Picture #11 How to predict world's nuclear war: Picture #12 How to predict world's nuclear war: Picture #13 How to predict world's nuclear war: Picture #14 How to predict world's nuclear war: Picture #15 How to predict world's nuclear war: Picture #16 How to predict world's nuclear war: Picture #17 How to predict world's nuclear war: Picture #18 How to predict world's nuclear war: Picture #19 How to predict world's nuclear war: Picture #20 How to predict world's nuclear war: Picture #21 How to predict world's nuclear war: Picture #22

Basic Knowledge of Prediction Technology and Forensic Mathematics (PT&FM)

Name / CodeCode AnalysisSummary / FormulaeContent / ExplanationExample / Remarks
Specific Terms & Definitions: STD1.Specific Terms: Positive & Negative, Five Spirits, Ten Stems, Twelve Roots, Numer, Numerology, Twelve Positions, Four Seasons, Stems Synthesize, Stems Produce, Stems Restrain, Stems Diminish, Roots Synthesize, Roots Impact, Roots Damage, Roots Harm, Roots Concur, Roots Combine, Joint of Month, Midjoint of Month, Joint of Year, Time Code.

2.Mathematical Virtual Foci: Soul, Body, Nature, Countenance, Fortune, Bounds.

3.Wonderful Gravitational Wave / Invisible Particle: Fate Particle, Timeon, Time Gene, Chzon, Millenon, Centuryon, Decadeon, Yearon, Monthon, Dayon, Houron, Minuteon, Secondon, Tinyon.

4.Fortune: Fortune Code, Fortune Origin, Fortune Co-ordinates, Year Formula, Decade Bounds/Large Bounds, Year Bounds/Small Bounds, Month Bounds, Day Bounds, 2-Hour Bounds, 10-Minute Bounds, 50-Second, 4.17-Second (actually 25/6 seconds) Bounds.

5.Destiny: Destiny Characteristics, Destiny Characteristics Track, Zone, Adjacent Zones, Opposite Zones, Symmetric Zones, Concurrent Zones, Combined Zones, Sex Code, Decade Fortune Revolution Mode, Small Fortune Spin Mode, Wong's Small Fortune Spin Mode, Life Code.

6.Functions: Conditional function `&C[ ]', Remainder function `R[m/n]', Integer function `I[n]', Approximated integer function `A[n]', Special Modulated function `x=(Mod 5)', Modulated function `x=(Mod 1)', Modulated function `x=(Mod 2)', Modulated function `x=(Mod 5)', Modulated function `Z=(Mod 12)', Modulated function `x=(Mod 60)', Modulated function `x=(Mod 600)' & Modulated function `x=(Mod 720)'.

1.Positive & Negative, 2.Five Spirits, 3.Ten Stems, 4.Twelve Roots, 5.Numer, 6.Numerology, 7.Twelve Positions, 8.Four Seasons, 9.Stems Synthesize, 10.Stems Produce, 11.Stems Restrain, 12.Stems Diminish, 13.Roots Synthesize, 14.Roots Impact, 15.Roots Damage, 16.Roots Harm, 17.Roots Concur, 18.Roots Combine, 19.Joint of Month, 20.Midjoint of Month, 21.Joint of Year, 22.Time Code, 23.Soul, 24.Body, 25.Nature, 26.Countenance, 27.Fortune, 28.Bounds, 29.Fate Particle, 30.Timeon, 31.Time Gene, 32.Chzon, 33.Millenon, 34.Centuryon, 35.Decadeon, 36.Yearon, 37.Monthon, 38.Dayon, 39.Houron, 40.Minuteon, 41.Secondon, 42.Tinyon, 43.Fortune Code, 44.Fortune Origin, 45.Fortune Co-ordinates, 46.Year Formula, 47.Destiny Characteristics, 48.Destiny Characteristics Track, 49.Zone, 50.Adjacent Zones, 51.Opposite Zones, 52.Symmetric Zones, 53.Concurrent Zones, 54.Combined Zones, 55.Sex Code, 56.Decade Fortune Revolution Mode, 57.Small Fortune Spin Mode, 58.Wong's Small Fortune Spin Mode, 59.Life Code. 60.FunctionThe destiny of human beings is greatly affected by the sun and the moon. If two persons who have same `Time Codes' (including year, month, day & time) in Gregorian calendar as well as lunar month and day, the destiny of them is similar. In general, there are 3,110,400 basic types of essences of human. The appearance and fate of people in each type are alike. But, there are altogether 13,436,928,000,000 varieties of appearance and fate of people in the world. If the `Life Code' of father and the `Life Code' of mother are also taken in consideration, the number of varieties is infinite. This means that no two individuals, including appearances and destiny, are identical in the world.
Life Code Formula: LCFather's Life Code: FLC=YC+S+Chz+B+m+DC. Mother's Life Code: MLC=YC+S+Chz+B+f+DC. Self Life Code: SLC=YC+S+Chz+B+SC+DC. Male: LC=(FLC, MLC, YC+S+Chz+B+m+DC). Female: LC=(FLC, MLC, YC+S+Chz+B+f+DC). Since the expression of `Life Code' (LC) is very long, usually people neglect the `Life Code of Father' (FLC) and the `Life Code of Mother' (MLC) for simplicity. People regard `Self Life Code' (SLC) as a special form of simplified `Life Code' (LC). In this case, `LC' equals `SLC'. Hence, `LC' is simplified as LC=YC+S+Chz+B+SC+DC.The `Life Code' of a person is composed of the `Life Code of Father' (FLC), the `Life Code of Mother' (MLC) and the `Life Code of Self' (SLC). Since the `Life Code of Father' also consists of the `Life Code' of his parents and the `Life Code of Mother' also consists of the `Life Code' of her parents, the destiny of a person is interactive among one's clan. The standard general form of `Life Code Formula' is `LC=(FLC, MLC, SLC)', where `FLC' is the `Life Code' of father, `MLC' is the `Life Code' of mother and `SLC' is the `Life Code' of oneself. The `Life Code' (LC) are all composed of numerals, alphabets and commas. Theoretically, if the `Life Codes' of two individuals are identical, the appearance and fate of them are alike. But practically, except conjugated twins, there are no two persons coming out of two different clans with identical appearances and destiny because the `Life Codes' of their parents are not identical. Actually, conjugated twins are regarded as one single person in the `Fate Theory' because they were born all of a lump. `YC' is the `Year Code' at birth of a person reckoning in a solar calender. The `Year Code' is expressed in the form of `Fortune Sequence Code' of `Year Co-ordinates'. `S' is the zone which marks the position of `Soul'. `Chz' is the `Code' of finger-prints of `Destiny Characteristics' of a person. `B' is the zone which marks the position of `Body'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `DC' is the `Day Code' of a person at birth reckoning in a solar calender.If the `Year Code' of father at birth YC=29, the zone of `Soul' S=9, the `Code' of finger-prints of `Destiny Characteristics' Chz=7, the zone of `Body' B=9, the `Day Code' DC=22, and apply the `Father's Life Code Formula'. FLC=YC+S+Chz+B+m+DC. FLC=29S9Chz7B9m22. If the `Year Code' of mother at birth YC=36, the zone of `Soul' S=8, the `Code' of finger-prints of `Destiny Characteristics' Chz=1, the zone of `Body' B=8, the `Day Code' DC=3, and apply the `Mother's Life Code Formula'. MLC=YC+S+Chz+B+f+DC. MLC=36S8Chz1B8f3. If the `Year Code' of oneself at birth YC=4, the zone of `Soul' S=11, the `Code' of finger-prints of `Destiny Characteristics' Chz=10, the zone of `Body' B=1, the `Sex Code' SC=f, the `Day Code' DC=38, and apply the `Self Life Code Formula'. SLC=YC+S+Chz+B+SC+DC. SLC=4S11Chz10B1f38. Hence, the `Life Code' LC=(29S9Chz7B9m22, 36S8Chz1B8f3, 4S11Chz10B1f38). The special form of simplified `Life Code' of oneself LC=4S11Chz10B1f38.
Destiny Theorem: DTS=X or FB=X`S' is the zone which marks the position of `Soul'. `FB' is the zone of `Fortune Bounds'. `X' is the zone which marks the position of `Fate Particles' evoking an `Event' in a `Bounds'. The specific term of `Fate Particle' is `Timeon'. It can be regarded as an invisible particle or a particular wave of gravitational force that can enlighten thinkings and determine the ultimate behaviour of human beings. The `Event' appears as a consequence of ideas and behaviours. This is known as `Destiny'. That is, `Fate Particles' evoke `Events'.If X=5, then S=5 or FB=5.
Soul Formula: SS=m-A[h/2] (Mod 12)`S' is the zone which marks the position of `Soul'. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `h' is the time of birth of a person reckoning on a 24-hour base. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `S=(Mod 12)' is a modulated function such that if S>11 then `S' becomes `S-12' and if S<0 then `S' becomes `S+12'. Thus, the value range of `S=(Mod 12)' is from 0 to 11.If m=10 and h=23:45, then S=10-A[(23+45/60)/2] (Mod 12). S=10-A[23.75/2] (Mod 12). S=10-12 (Mod 12). S=-2 (Mod 12). S=-2+12. S=10.
Body Formula: BB=m+A[h/2] (Mod 12)`B' is the zone which marks the position of `Body'. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `h' is the time of birth of a person reckoning on a 24-hour base. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `B=(Mod 12)' is a modulated function such that if B>11 then `B' becomes `B-12' and if B<0 then `B' becomes `B+12'. Thus, the value range of `B=(Mod 12)' is from 0 to 11.If m=7 and h=11:12, then B=7+A[(11+12/60)/2] (Mod 12). B=7+A[11.2/2] (Mod 12). B=7+6 (Mod 12). B=13 (Mod 12). B=13-12. B=1.
Category Formula: CatThe Category Formula is: Cat=S+n (Mod 12). `n' is any integer between 0 and 11. `S' is the zone of Soul. The `Soul Sector' is equal to `Soul', S=m-A[h/2] (Mod 12). `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `h' is the time of birth of a person reckoning on a 24-hour base. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `S=(Mod 12)' is a modulated function such that if S>11 then `S' becomes `S-12' and if S<0 then `S' becomes `S+12'. Thus, the value range of `S=(Mod 12)' is from 0 to 11. The `Body Sector' is equal to `Body', B=m+A[h/2] (Mod 12). `Parents Sector' is PS=S+1 (Mod 12) or PS=1+m-A[h/2] (Mod 12). `Behaviour Sector' is BS=S+2 (Mod 12) or BS=2+m-A[h/2] (Mod 12). `Family Sector' is FS=S+3 (Mod 12) or FS=3+m-A[h/2] (Mod 12). `Work Sector' is WS=S+4 (Mod 12) or WS=4+m-A[h/2] (Mod 12). `Servant Sector' is SS=S+5 (Mod 12) or SS=5+m-A[h/2] (Mod 12). `Environment Sector' is ES=S+6 (Mod 12) or ES=6+m-A[h/2] (Mod 12) . `Health Sector' is HS=S+7 (Mod 12) or HS=7+m-A[h/2] (Mod 12). `Money Sector' is MS=S+8 (Mod 12) or MS=8+m-A[h/2] (Mod 12). `Descendants Sector' is DS=S+9 (Mod 12) or DS=9+m-A[h/2] (Mod 12). `Spouse Sector' is SS=S+10 (Mod 12) or SS=10+m-A[h/2] (Mod 12). `Siblings Sector' is SS=S+11 (Mod 12) or SS=11+m-A[h/2] (Mod 12).There are 13 sectors in the fate catagory of a person. `S' is the zone which marks the location of `Soul' of a person. The `Soul Sector' in the `Category' is same as the value of `Soul' (S) of a person. `B' is the zone which marks the location of `Body' of a person. The `Body Sector' in the `Category' is same as the value of `Body' (B) of a person. `PS' represents the zone of `Parents Sector'. `BS' represents the zone of `Behaviour Sector'. `FS' represents the zone of `Family Sector'. `WS' represents the zone of `Work Sector'. `SS' represents the zone of `Servant Sector'. `ES' represents the zone of `Environment Sector'. `HS' represents the zone of `Health Sector'. `MS' represents the zone of `Money Sector'. `DS' represents the zone of `Descendants Sector', especially for sons & daughters. `SS' represents the zone of `Spouse Sector'. `SS' represents the zone of `Siblings Sector'. `Cat=(Mod 12)' is a modulated function such that if Cat>11 then `Cat' becomes `Cat-12' and if Cat<0 then `Cat' becomes `Cat+12'. Thus, the value range of `Cat=(Mod 12)' is from 0 to 11.If m=5 and h=15:33, S=m-A[h/2] (Mod 12) and B=m+A[h/2] (Mod 12), apply the `Category Formula'. Soul S=m-A[h/2] (Mod 12). Body B=m+A[h/2] (Mod 12). Parents Sector PS=S+1 (Mod 12). Behaviour Sector BS=S+2 (Mod 12). Family Sector FS=S+3 (Mod 12). Work Sector WS=S+4 (Mod 12). Servant Sector SS=S+5 (Mod 12). Environment Sector ES=S+6 (Mod 12). Health Sector HS=S+7 (Mod 12). Money Sector MS=S+8 (Mod 12). Descendants Sector DS=S+9 (Mod 12). Spouse SS=S+10 (Mod 12). Siblings Sectors SS=S+11 (Mod 12). S=5-A[(15+33/60)/2] (Mod 12). S=5-A[7.665] (Mod 12). S=5-8 (Mod 12). S=-3 (Mod 12). S=12-3. S=9. The `Soul Sector' is S=9. B=5+A[(15+33/60)/2] (Mod 12). B=5+A[7.665] (Mod 12). B=5+8 (Mod 12). B=13 (Mod 12). B=13-12. B=1. The `Body Sector' is B=1. For `Parents Sector', PS=9+1 (Mod 12). PS=10 (Mod 12). PS=10. For `Behaviour Sector', BS=9+2 (Mod 12). BS=11 (Mod 12). BS=11. For `Family Sector', FS=9+3 (Mod 12). FS=12 (Mod 12). FS=12-12. FS=0. For `Work Sector', WS=9+4 (Mod 12). WS=13 (Mod 12). WS=13-12. WS=1. For `Servant Sector', SS=9+5 (Mod 12). SS=14 (Mod 12). SS=14-12. SS=2. For `Environment Sector', ES=9+6 (Mod 12). ES=15 (Mod 12). ES=15-12. ES=3. For `Health Sector', HS=9+7 (Mod 12). HS=16 (Mod 12). HS=16-12. HS=4. For `Money Sector', MS=9+8 (Mod 12). MS=17 (Mod 12). MS=17-12. MS=5. For `Descendants Sector', DS=9+9 (Mod 12). DS=18 (Mod 12). DS=18-12. DS=6. For `Spouse Sector', SS=9+10 (Mod 12). SS=19 (Mod 12). SS=19-12. SS=7. For `Siblings Sector', SS=9+11 (Mod 12). SS=20 (Mod 12). SS=20-12. SS=8.
Nature Formula: NN=Chzon / Yearon / Houron &C[y,m,d,h]If N=Chzon, the zone is equal to `Lm', `Ku', `Tm', `Mo' or `Pr'. These are `Chzons'. `Chzons' are `Timeons' related to `Destiny Characteristics' (Chz). The variables of `Chz' are solar year (y), solar month (m), lunar day (d) and the time (h) reckoning on a 24-hour base. If N=Yearon, the zone is equal to `Luk'. `Luk' is a `Yearon'. `Yearon' is a `Timeon' related to `Year'. If N=Houron, the zone is equal to `Kk'. `Kk' is an `Houron'. `Houron' is a `Timeon' related to a `Couple Hours'. `y' is the year of birth of a person in Gregorian calendar after `Joint of Year'. `Joint of Year' is `Joint of February'. If the time of birth is before `Joint of February', it is regarded as previous year. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `d' is the lunar day of birth of a person. `h' is the time of birth of a person reckoning on a 24-hour base. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `N=(Mod 12)' is a modulated function such that if N>11 then `N' becomes `N-12' and if N<0 then `N' becomes `N+12'. Thus, the value range of `N=(Mod 12)' is from 0 to 11.If y=2002, m=8, d=2, h=23:45 and Chz=11, apply the Nature Formula `N=Chzon / Yearon / Houron &C[y,m,d,h]'. N=Lm. `Lm' is a `Chzon' and `Lm=4+Chz (Mod 12)'. Thus, N=4+Chz (Mod 12). N=4+11 (Mod 12). N=15 (Mod 12). N=15-12. N=3. If y=1992, m=10, d=12, h=23:45 and Chz=4, apply the Nature Formula `N=Chzon / Yearon / Houron &C[y,m,d,h]'. N=Luk. `Luk' is a `Yearon' and `Luk=8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12)'. Thus, N=8+R[2002/10]+I[{R[2002/10]}/2]-3xI[{R[2002/10]}/8] (Mod 12). N=8+2+I[2/2]-3xI[2/8] (Mod 12). N=10+I[1]-3xI[0.25] (Mod 12). N=10+1-3x0 (Mod 12). N=11 (Mod 12). N=11. If y=2004, m=5, d=25, h=4:30 and Chz=1, apply the Nature Formula `N=Chzon / Yearon / Houron &C[y,m,d,h]'. N=Kk. `Kk' is an `Houron' and `Kk=4+A[h/2] (Mod 12)'. Thus, N=4+A[h/2] (Mod 12). N=4+A[(4+30/60)/2] (Mod 12). N=4+A[(4.5)/2] (Mod 12). N=4+A[2.25] (Mod 12). N=4+2 (Mod 12). N=6 (Mod 12). N=6.
Countenance Formula: CC=Chzon / Houron &C[y,m,d,h]If C=Chzon, the zone is equal to `Ke', `Tg', `Su' or `Le'. These are `Chzons'. `Chzons' are `Timeons' related to `Destiny Characteristics' (Chz). The variables of `Chz' are solar year (y), solar month (m), lunar day (d) and the time (h) reckoning on a 24-hour base. If C=Houron, the zone is equal to `Ch' or `Im'. `Ch' and `Im' are `Hourons'. `Houron' is a `Timeon' related to two hours. `y' is the year of birth of a person in Gregorian calendar after `Joint of Year'. `Joint of Year' is `Joint of February'. If the time of birth is before `Joint of February', it is regarded as previous year. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `d' is the lunar day of birth of a person. `h' is the time of birth of a person reckoning on a 24-hour base. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `C=(Mod 12)' is a modulated function such that if C>11 then `C' becomes `C-12' and if C<0 then `C' becomes `C+12'. Thus, the value range of `C=(Mod 12)' is from 0 to 11.If y=1998, m=4, d=14, h=5:37 and Chz=8, R[y/12]=R[1998/12]=6. Apply the Countenance Formula `C=Chzon / Houron &C[y,m,d,h]'. C=Le. `Le' is a `Chzon' and `Le=9-Chz (Mod 12). Thus, C=9-Chz (Mod 12). C=9-8 (Mod 12). C=1 (Mod 12). C=1. If y=2000, m=9, d=7, h=13:15 and Chz=2, R[y/12]=R[2000/12]=8. Apply the Countenance Formula `C=Chzon / Houron &C[y,m,d,h]'. C=Ch. `Ch' is an `Houron' and `Ch=10-A[h/2] (Mod 12)'. Thus, C=10-A[h/2] (Mod 12). C=10-A[(13+15/60)/2] (Mod 12). C=10-A[(13.25)/2] (Mod 12). C=10-A[6.625] (Mod 12). C=10-7 (Mod 12). C=3 (Mod 12). C=3.
Super Fortune Origin Formula: UNSThe change of fortune for every 100 years or 1,000 years is called `Super Fortune'. The origin of `Super Fortune Co-ordinates' is at (UNS,ZNS), where `UNS' and `ZNS' are integers. Up to present, the formula to determine the origin of `Super Fortune Co-ordinates', (UNS,ZNS), has not been established.The origin of `Super Fortune Co-ordinates' is at (UNS,ZNS), where `UNS' and `ZNS' are integers. The origin of `Super Fortune' is the starting point of human history. It is believed that the `Super Fortune' is revolving around in the space clockwise. It starts to move from the origin at (UNS,ZNS) to the next `Fortune Co-ordinates' on a 100-yearly or 1,000-yearly base. The `Super Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. Up to present, the origin of `Super Fortune Co-ordinates' has not been determined mathematically.Remarks: No mathematical data are available at present. If the `Time Interval' of two consecutive `Super Fortune Co-ordinates' is 100 years, the period of a complete `Super Fortune' is: 100x60=6,000 years. It means that the human civilization is 6,000 years a cycle. If human civilization began about 6,000 years ago, human civilization will be ruined in the near future. If the `Time Interval' of two consecutive `Super Fortune Co-ordinates' is 1,000 years, the period of a complete `Super Fortune' is: 1,000x60=60,000 years. It means that the human civilization is 60,000 years a cycle.
Super Fortune Formula: GCSIf the position of `Super Fortune Co-ordinates' is at (X,Y) and the `Time Interval' between two consecutive `Super Fortune Co-ordinates' is `n' years, then the `Super Fortune Co-ordinates' are at (G,C) after `y' years. The `Fortune Formula' is G=X+I[y/n] (Mod 10) & C=Y+I[y/n] (Mod 12).The change of fortune for every 100 years or 1,000 years is called `Super Fortune'. The origin of `Super Fortune Co-ordinates' is at (UNS,ZNS), where `UNS' and `ZNS' are integers. The origin of `Super Fortune' is the starting point of human history. It is believed that the `Super Fortune' is revolving around in the `Fortune Track' (FT) clockwise. The `Revolution Mode' (RM) of `Super Fortune' is a mathematical expression that can show the revolving direction of `Super Fortune' in its `Fortune Track' (FT). There is only one type of `Revolution Mode' for `Super Fortune' of the Earth. It is `Clockwise Revolution Mode' (CRM). The `Super Fortune' of the Earth is revolving clockwise in its `Fortune Track' (FT). The `Super Fortune' starts to move from the origin at (UNS,ZNS) to the next `Fortune Co-ordinates' on a 100-yearly or 1,000-yearly base. It recurs in 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. Up to present, the origin of `Super Fortune Co-ordinates' has not been determined mathematically. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `I[y/n]' is an integer function such that it takes the integral part of the number when `y' is divided by `n', without rounding up the number. `n' is a natural number. `y' is the number of solar years. `n' is the `Time Interval' between two consecutive `Super Fortune Co-ordinates' in years. `G=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G>10 then `G' becomes `G-10' and if G<1 then `G' becomes `G+10'. Thus, the value range of `G=(Mod 10)' is from 1 to 10. `C=(Mod 12)' is a modulated function such that if C>11 then `C' becomes `C-12' and if C<0 then `C' becomes `C+12'. Thus, the value range of `C=(Mod 12)' is from 0 to 11.If the `Super Fortune Co-ordinates' (X,Y)=(8,11), y=21986 and n=100, apply the `Super Fortune Formula'. G=X+I[y/n] (Mod 10) & C=Y+I[y/n] (Mod 12). The values of `G' and `C' of the new `Super Fortune Co-ordinates' (G,C) after `y' years are: G=8+I[21986/100] (Mod 10) & C=11+I[21986/100] (Mod 12). G=8+I[219.86] (Mod 10) & C=11+I[219.86] (Mod 12). G=8+219 (Mod 10) & C=11+219 (Mod 12). G=227 (Mod 10) & C=230 (Mod 12). G=227-22x10 & C=230-12x19. G=227-220 & C=230-228. G=7 & C=2. Hence, after 21986 years, the `Super Fortune' will move from `Co-ordinates' (8,11) with a value of the `Fortune Sequence Code' of `Super Fortune Co-ordinates' of `48' to `Co-ordinates' (7,2) with a new value of the `Fortune Sequence Code' of `Super Fortune Co-ordinates' of `27'. Thus, the value of the `Fortune Sequence Code' of `Super Fortune Co-ordinates' is changed from `48' to `27'.
Super Bounds Formula: BOUNDSThe `Super Bounds' always moves consecutively clockwise along the zones every 100 years or 1,000 years. Thus, the time interval, `n', of `Millennial Bounds' is 1,000 years, i.e. n=1000. The the time interval, `n', of `Centennial Bounds' is 100 years, i.e. n=100. If the co-ordinates of the `Origin of Super Bounds' of the Earth are (X,Y) and `n' is the `Time Interval', the `Super Bounds Co-ordinates' of the Earth will move to (G,C) after `y' years. The standard general form of `Super Bounds Formula' of the Earth is G=X+I[y/n] (Mod 10) & C=Y+I[y/n] (Mod 12).The change of fortune for every 100 years or 1,000 years is called `Super Bounds'. `Super Bounds' is the focus of `Super Fortune' because it shows the `Centennial Fortune' or `Millennial Fortune' in a zone of the Earth. The `Super Bounds' always moves consecutively clockwise along the zones for every 100 years or 1,000 years. There are altogether twelve zones. The zones recur from 0 to 11. They are integers and usually assigned to variable `X'. The `Revolution Mode' (RM) of `Super Bounds' is `Clockwise Revolution Mode' (CRM). The `Fortune Track' (FT) of the `Super Bounds' of the Earth is always revolving clockwise. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `G=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G>10 then `G' becomes `G-10' and if G<1 then `G' becomes `G+10'. Thus, the value range of `G=(Mod 10)' is from 1 to 10. `C=(Mod 12)' is a modulated function such that if C>11 then `C' becomes `C-12' and if C<0 then `C' becomes `C+12'. Thus, the value range of `C=(Mod 12)' is from 0 to 11.Assume the first human being appeared on the Earth is in 253,497B.C. and the origin of `Millennial Bounds' are (7, 10). Find the `Co-ordinates of Millennial Bounds' (G,C) in 10,273B.C.. From the given data, y=253497-10273 and n=1000. Apply the `Super Bounds Formula'. G=X+I[y/n] (Mod 10) & C=Y+I[y/n] (Mod 12). G=7+I[(253497-10273)/1000] (Mod 10) & C=10+I[(253497-10273)/1000] (Mod 12). G=7+I[243224/1000] (Mod 10) & C=10+I[243224/1000] (Mod 12). G=7+I[243.224] (Mod 10) & C=10+I[243.224] (Mod 12). G=7+243 (Mod 10) & C=10+243 (Mod 12). G=250 (Mod 10) & C=253 (Mod 12). G=250-24x10 & C=253-21x12. G=250-240 & C=253-252. G=10 & C=1. Hence, the `Co-ordinates of Millennial Bounds' (G,C) are (10,1). Assume the first human being appeared on the Earth is in 253,497B.C. and the origin of `Centennial Bounds' are (9,4). Find the `Co-ordinates of Centennial Bounds' (G,C) in A.D.156,791. From the given data, y=253497+156791 and n=100. Apply the `Super Bounds Formula'. G=X+I[y/n] (Mod 10) & C=Y+I[y/n] (Mod 12). G=9+I[(253497+156791)/100] (Mod 10) & C=4+I[(253497+156791)/100] (Mod 12). G=9+I[410288/100] (Mod 10) & C=4+I[410288/100] (Mod 12). G=9+I[4102.88] (Mod 10) & C=4+I[4102.88] (Mod 12). G=9+4102 (Mod 10) & C=4+4102 (Mod 12). G=4111 (Mod 10) & C=4106 (Mod 12). G=4111-411x10 & C=4106-342x12. G=1 & C=2. Hence, the `Co-ordinates of Centennial Bounds' (G,C) are (1,2).
Millennial Bounds Origin Formula: BOUNDSMThe change of fortune for every 1,000 years is called `Millennial Fortune'. The origin of `Millennial Bounds Co-ordinates' is at (UM0,ZM0), where the values of `UM0' and `ZM0' are integers. `ZM0' is equal to the zone of `Soul' of the first modern wise man appeared on the Earth and S=m-A[h/2] (Mod 12). `S' is the zone which marks the position of `Soul' of the first modern wise man appeared on the Earth. `y' is the year of the first modern wise man appeared on the Earth. `y' is approximately equal to the year in B.C. of Gregorian calendar but the first day of the year is not on 1st of January in Gregorian calendar. The beginning of a year is usually on 4th of February in Gregorian calendar. It is called `Joint of Year'. The time of the first modern wise man appeared on the Earth after `Joint of Year' is regarded as `y' B.C.. If the time of the first modern wise man appeared on the Earth is before `Joint of Year', `y' is regarded as previous year. That is, the year is `y+1' B.C.. `Joint of Year' is same as `Joint of February', which is usually on 4th of February of a year in Gregorian calendar. `m' is the solar month that the first modern wise man appeared on the Earth after `Joint of Month'. `h' is the time of the first modern wise man appeared on the Earth reckoning on a 24-hour base. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `S=(Mod 12)' is a modulated function such that if S>11 then `S' becomes `S-12' and if S<0 then `S' becomes `S+12'. Thus, the value range of `S=(Mod 12)' is from 0 to 11. Millennial Bounds Origin Formula: UM0=3+{S&C[S<2:+2]}-2x{I{R[(1-y)/1000]/100} (Mod 5)} (Mod 10) & ZM0=S, S=m-A[h/2] (Mod 12). Or, UM0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}-2x{I{R[(1-y)/1000]/100} (Mod 5)} (Mod 10) & ZM0=m-A[h/2] (Mod 12).`Millennial Bounds' is the focus of `Millennial Fortune' because it shows the `Millennial Fortune' in a zone of human beings. The co-ordinate of vertical axis of the origin of `Millennial Bounds' always starts from the zone of `Soul' of the first modern wise man appeared on the Earth. Hence, ZM0=S. The origin of `Millennial Bounds' is different from the origin of `Millennial Fortune' and their co-ordinates usually are not the same. The former is the starting point of `Millennial Bounds'. It always starts from the zone of `Soul' of the first modern wise man appeared on the Earth and it marks the `Millennial Fortune' of human beings within a `Bounds' represented by a zone. The latter is the starting point of `Millennial Fortune'. It shows the influences of `Gravitational Waves' of `Timeons' for a pair of `Fortune Co-ordinates' in a millennium. The `Gravitational Waves' of `Timeons' are the sources of power that determine human fortune. In other words, the `Events' evoked by the `Fate Particles' of `Millennial Fortune' in a zone of `Millennial Bounds' structure the `Millennial Fortune' of human beings. The `Millennial Bounds' is revolving around clockwise. It starts to move from the `Co-ordinates' of `Soul' at (UM0,ZM0) to the next `Fortune Co-ordinates' on a millennial base. The `Millennial Bounds' oscillates in a loop of 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `R[(1-y)/1000]' is a remainder function such that it takes the remainder of `1-y' divided by 1000. `X=(Mod 5)' is a special modulated function such that if X>5 then `X' becomes `X-5' and if X<1 then `X' becomes `X+5'. Thus, the value range of `X=(Mod 5)' is from 1 to 5. `Y=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If Y>10 then `Y' becomes `Y-10' and if Y<1 then `Y' becomes `Y+10'. Thus, the value range of `Y=(Mod 10)' is from 1 to 10.Assume the first modern wise man appeared on the Earth is on 17th Apr.,253,497B.C. and S=1. Find the co-ordindates of the origin of `Millennial Bounds' (UM0,ZM0). Apply the `Millennial Bounds Origin Formula'. UM0=3+{S&C[S<2:+2]}-2x{I{R[(1-y)/1000]/100} (Mod 5)} (Mod 10) & ZM0=S. UM0=3+{1&C[1<2:+2]}-2x{I{R[(1-253497)/1000]/100} (Mod 5)} (Mod 10) & ZM0=1. UM0=3+{1+2}-2x{I{R[-253496/1000]/100} (Mod 5)} (Mod 10) & ZM0=1. UM0=3+{1+2}-2x{I[-496/100] (Mod 5)} (Mod 10). UM0=3+3-2x{I[-4.96] (Mod 5)} (Mod 10). UM0=3+3-2x{-5 (Mod 5)} (Mod 10). UM0=3+3-2x{2x5-5} (Mod 10). UM0=6-2x5 (Mod 10). UM0=6-10 (Mod 10),UM0=-4 (Mod 10),UM0=10-4,UM0=6. The co-ordindates of the origin of `Millennial Bounds' are (6,1).
Centennial Bounds Origin Formula: BOUNDSCThe change of fortune for every 100 years is called `Centennial Fortune'. The origin of `Centennial Bounds Co-ordinates' is at (UC0,ZC0), where the values of `UC0' and `ZC0' are integers. `ZC0' is equal to the zone of `Soul' of the first modern wise man appeared on the Earth and S=m-A[h/2] (Mod 12). `S' is the zone which marks the position of `Soul' of the first modern wise man appeared on the Earth. `y' is the year of the first modern wise man appeared on the Earth. `y' is approximately equal to the year in B.C. of Gregorian calendar but the first day of the year is not on 1st of January in Gregorian calendar. The beginning of a year is usually on 4th of February in Gregorian calendar. It is called `Joint of Year'. The time of the first modern wise man appeared on the Earth after `Joint of Year' is regarded as `y' B.C.. If the time of the first modern wise man appeared on the Earth is before `Joint of Year', `y' is regarded as previous year. That is, the year is `y+1' B.C.. `Joint of Year' is same as `Joint of February', which is usually on 4th of February of a year in Gregorian calendar. `m' is the solar month that the first modern wise man appeared on the Earth after `Joint of Month'. `h' is the time of the first modern wise man appeared on the Earth reckoning on a 24-hour base. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `S=(Mod 12)' is a modulated function such that if S>11 then `S' becomes `S-12' and if S<0 then `S' becomes `S+12'. Thus, the value range of `S=(Mod 12)' is from 0 to 11. Centennial Bounds Origin Formula: UC0=3+{S&C[S<2:+2]}-2x{I{R[(1-y)/100]/10} (Mod 5)} (Mod 10) & ZC0=S, S=m-A[h/2] (Mod 12). Or, UC0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}-2x{I{R[(1-y)/100]/10} (Mod 5)} (Mod 10) & ZC0=m-A[h/2] (Mod 12).`Centennial Bounds' is the focus of `Centennial Fortune' because it shows the `Centennial Fortune' in a zone of human beings. The co-ordinate of vertical axis of the origin of `Centennial Bounds' always starts from the zone of `Soul' of the first modern wise man appeared on the Earth. Hence, ZC0=S. The origin of `Centennial Bounds' is different from the origin of `Centennial Fortune' and their co-ordinates usually are not the same. The former is the starting point of `Centennial Bounds'. It always starts from the zone of `Soul' of the first modern wise man appeared on the Earth and it marks the `Centennial Fortune' of human beings within a `Bounds' represented by a zone. The latter is the starting point of `Centennial Fortune'. It shows the influences of `Gravitational Waves' of `Timeons' for a pair of `Fortune Co-ordinates' in a century. The `Gravitational Waves' of `Timeons' are the sources of power that determine human fortune. In other words, the `Events' evoked by the `Fate Particles' of `Centennial Fortune' in a zone of `Centennial Bounds' structure the `Centennial Fortune' of human beings. The `Centennial Bounds' is revolving around clockwise. It starts to move from the `Co-ordinates' of `Soul' at (UC0,ZC0) to the next `Fortune Co-ordinates' on a centennial base. The `Centennial Bounds' oscillates in a loop of 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `R[(1-y)/100]' is a remainder function such that it takes the remainder of `1-y' divided by 100. `X=(Mod 5)' is a special modulated function such that if X>5 then `X' becomes `X-5' and if X<1 then `X' becomes `X+5'. Thus, the value range of `X=(Mod 5)' is from 1 to 5. `Y=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If Y>10 then `Y' becomes `Y-10' and if Y<1 then `Y' becomes `Y+10'. Thus, the value range of `Y=(Mod 10)' is from 1 to 10.Assume the first modern wise man appeared on the Earth is on 17th Apr.,253,497B.C. and S=7. Find the co-ordindates of the origin of `Centennial Bounds' (UC0,ZC0). Apply the Centennial Bounds Origin Formula. UC0=3+{S&C[S<2:+2]}-2x{I{R[(1-y)/100]/10} (Mod 5)} (Mod 10) & ZC0=S. UC0=3+{7&C[7<2:+2]}-2x{I{R[(1-253497)/100]/10} (Mod 5)} (Mod 10) & ZC0=7. UC0=3+7-2x{I{R[-253496/100]/10} (Mod 5)} (Mod 10) & ZC0=7. UC0=3+7-2x{I[-96/10] (Mod 5)} (Mod 10) & ZC0=7. UC0=10-2x{I[-9.6] (Mod 5)} (Mod 10). UC0=10-2x{-10 (Mod 5)} (Mod 10). UC0=10-2x{3x5-10} (Mod 10). UC0=10-2x5 (Mod 10). UC0=0 (Mod 10). UC0=0+10. UC0=10. The co-ordindates of the origin of `Centennial Bounds' are (10,7).
Decade Fortune Revolution Mode Formula: REVOLVE`Revolution Mode' (RM) is a mathematical expression that can show the revolving direction of `Decade Fortune' (DeF) in the `Decade Fortune Track' (DeFT). There are altogether two different types of `Decade Fortune Revolution Modes', namely `Clockwise Revolution Mode' (CRM) and `Anti-clockwise Revolution Mode' (ARM). The `Decade Fortune' (DeF) is either revolving clockwise or anti-clockwise in the `Decade Fortune Track' (DeFT). It varies according to the `Sex Code' (SC) of a person and the year of birth `y' in B.C. or A.D. in Gregorian calendar. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The Decade Fortune Revolution Mode Formula for people born in `y' A.D. is: RM=R[(&C[SC:m=0, f=1]+y)/2]. For people born in `y' B.C., the Decade Fortune Revolution Mode Formula is: RM=R[(&C[SC:m=0, f=1]+y-1)/2].Based on calculation of the `Decade Fortune Revolution Mode Formula', RM=0 means that the `Decade Fortune Revolution Mode' is clockwise. If RM=1, it means that the `Decade Fortune Revolution Mode' is anti-clockwise. In `PT&FM', conventionally the mathematical value of clockwise revolving direction is assigned to positive and the value of anti-clockwise revolving direction is assigned to negative. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[m/n]' is a remainder function such that it takes the remainder of `m' divided by `n'. `n' is a natural number.If SC=m and y=A.D.2004, apply the Decade Fortune Revolution Mode Formula for people born in A.D.. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(0+2004)/2]. RM=R[2004/2]. RM=0. `RM=0' means that the `Decade Fortune Revolution Mode' is clockwise. If SC=m and y=A.D.1997, apply the Decade Fortune Revolution Mode Formula for people born in A.D.. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(0+1997)/2]. RM=R[1997/2]. RM=1. `RM=1' means that the `Decade Fortune Revolution Mode' is anti-clockwise. If SC=f and y=A.D.1996, apply the Decade Fortune Revolution Mode Formula for people born in A.D.. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(1+1996)/2]. RM=R[1997/2]. RM=1. `RM=1' means that the `Decade Fortune Revolution Mode' is anti-clockwise. If SC=f and y=A.D.1999, apply the Decade Fortune Revolution Mode Formula for people born in A.D.. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(1+1999)/2]. RM=R[2000/2]. RM=0. `RM=0' means that the `Decade Fortune Revolution Mode' is clockwise. If SC=m and y=7 B.C., apply the Decade Fortune Revolution Mode Formula for people born in B.C.. RM=R[(&C[SC:m=0, f=1]+y-1)/2]. RM=R[(0+7-1)/2]. RM=R[6/2]. RM=0. `RM=0' means that the `Decade Fortune Revolution Mode' is clockwise.
Ziping's Decade Fortune Origin Formula: UN0`Ziping's Decade Fortune' is also named as `Ziping's Big Fortune' in general. The origin of `Ziping's Decade Fortune Co-ordinates' is at (UN0,ZN0). `y' is the year of birth of a person approximately equal to the year in A.D. of Gregorian calendar but the first day of the year is not on 1st of January in Gregorian calendar. The beginning of a year is usually on 4th of February in Gregorian calendar. It is called `Joint of Year'. The time of birth after `Joint of Year' is `y'. If the time of birth is before `Joint of Year', `y' is regarded as previous year. That is, the year of birth is `y-1'. `Joint of Year' is same as `Joint of February', which is usually on 4th of February of a year in Gregorian calendar. The value of `ZN0' is approximately related to the solar month of birth, `m', of a person, but the beginning of a new month is not on the first day of the month in Gregorian calendar. The critical value between two consecutive months is called `Joint of Month'. The `Joints of Month' always lie on from the 3rd to 8th day of a month in Gregorian calendar. In general, not for precise calculations, `Joint of Month' can be regarded as the 6th day of a month. If the date of birth of a person is within the 3rd to 8th day of a month in Gregorian calendar, precise calculations should be carried out. That is, if the time of birth is after `Joint of Month', the month of birth is `m'. If the time of birth is before `Joint of Month', the month of birth is `m-1 (Mod 12)'. The time and date of `Joint of Month' between two consecutive solar months always change from month to month. `Joint of Month' also varies according to the longitude and latitude of a place. The exact date and time of `Joint of Month' of a place can be found in a Chinese lunar calendar of that place. For people born in `y' A.D., Ziping's Decade Fortune Origin Formula is: UN0=3+{m&C[m<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & ZN0=m (Mod 12). For people born in `y' B.C., Ziping's Decade Fortune Origin Formula is: UN0=3+{m&C[m<2:+2]}-2x{R[(1-y)/10] (Mod 5)} (Mod 10) & ZN0=m (Mod 12).`Ziping's Decade Fortune Origin' (UN0,ZN0) is the Month Code (MC) of a person at birth. `UN0' is the `Stem' and `ZN0' is the `Root' of the `Month Code'. The origin of `Ziping's Decade Fortune' is the starting point of one's `Fortune Co-ordinates' before it reaches the `Initial Age Decade Bounds'. The `Decade Fortune' is revolving around either clockwise or anti-clockwise oscillating in a loop of 60 `Fortune Co-ordinates' (G,C) in a ten-yearly base, where `G' and `C' are integers. The time interval from the origin of `Fortune Co-ordinates' at (UN0,ZN0) shifts to the next `Fortune Co-ordinates' is less than 10 years because the `Initial Age Decade Bounds' usually is less than 10. For example, if the `Initial Bounds' of a person is `Age=3 to 12', the `Fate Particles' of the origin of `Fortune Co-ordinates' at (UN0,ZN0) only have influences on one's fortune from age 0 to 3. `m' is the approximate value of solar month of birth. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' and `R[(1-y)/10]' are remainder functions such that they take the remainders of `y' divided by 10 and `1-y' divided by 10. `n=(Mod 5)' is a special modulated function such that if n>5 then `n' becomes `n-5' and if n<1 then `n' becomes `n+5'. Thus, the value range of `n=(Mod 5)' is from 1 to 5. `UN0=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If UN0>10 then `UN0' becomes `UN0-10' and if UN0<1 then `UN0' becomes `UN0+10'. Thus, the value range of `UN0=(Mod 10)' is from 1 to 10. `ZN0=(Mod 12)' is a modulated function such that if ZN0>11 then `ZN0' becomes `ZN0-12' and if ZN0<0 then `ZN0' becomes `ZN0+12'. Thus, the value range of `ZN0=(Mod 12)' is from 0 to 11.Assume a male was born on 16th Jan., A.D.1987. The birthday is before `Joint of Year', 4th Feb., A.D.1987. So, y=1986. The month of birth is after `Joint of January', 6th Jan., A.D.1987. Thus, m=1. Apply `Ziping's Decade Fortune Origin Formula' for people born in A.D.. UN0=3+{m&C[m<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & ZN0=m (Mod 12). UN0=3+{1&C[1<2:+2]}+2x{R[1986/10] (Mod 5)} (Mod 10). UN0=3+1+2+2x{6 (Mod 5)} (Mod 10). UN0=6+2x{6-5} (Mod 10). UN0=6+2x1 (Mod 10). UN0=8 (Mod 10). UN0=8. ZN0=m (Mod 12). ZN0=1 (Mod 12). ZN0=1. The origin of `Ziping's Decade Fortune Co-ordinates' (UN0, ZN0) are (8,1). Hence, `Ziping's Decade Fortune Co-ordinates' from birth to `Initial Bounds' are (8,1). The `Big Fortune Code' is `38', `H1', `8B', `HB' or `SUN-CHO'. If a female was born on 20th Sept., A.D.1952. The birthday is after `Joint of Year', 5th Feb., A.D.1952. So, y=1952. The month of birth is after `Joint of September', 8th Sept., A.D.1952. Thus, m=9. Apply `Ziping's Decade Fortune Origin Formula' for people born in A.D.. UN0=3+{m&C[m<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & ZN0=m (Mod 12). UN0=3+{9&C[9<2:+2]}+2x{R[1952/10] (Mod 5)} (Mod 10). UN0=3+9+2x{2 (Mod 5)} (Mod 10). UN0=12+2x2 (Mod 10). UN0=16 (Mod 10). UN0=16-10 (Mod 10). UN0=6. ZN0=m (Mod 12). ZN0=9 (Mod 12). ZN0=9. The origin of `Ziping's Decade Fortune Co-ordinates' (UN0, ZN0) is (6,9). Hence, `Ziping's Decade Fortune Co-ordinates' from birth to `Initial Bounds' are (6,9). The `Big Fortune Code' is `46', `F9', `6J', `FJ' or `GAI-YAU'. Assume a male was born on 2nd Nov.,7 B.C.. The birthday is after `Joint of Year', 4th Feb.,7 B.C.. So, y=7. The month of birth is before `Joint of November', 8th Nov.,7B.C.. Thus, m=10. Apply `Ziping's Decade Fortune Origin Formula' for people born in B.C.. UN0=3+{m&C[m<2:+2]}-2x{R[(1-y)/10] (Mod 5)} (Mod 10) & ZN0=m (Mod 12). UN0=3+{10&C[10<2:+2]}-2x{R[(1-7)/10] (Mod 5)} (Mod 10). UN0=3+10-2x{R[-6/10] (Mod 5)} (Mod 10). UN0=13-2x{-6 (Mod 5)} (Mod 10). UN0=13-2x{2x5-6} (Mod 10). UN0=13-2x4 (Mod 10). UN0=5 (Mod 10). UN0=5. ZN0=m (Mod 12). ZN0=10 (Mod 12). ZN0=10. The origin of `Ziping's Decade Fortune Co-ordinates' (UN0, ZN0) are (5,10). Hence, `Ziping's Decade Fortune Co-ordinates' from birth to `Initial Bounds' are (5,10). The `Big Fortune Code' is `35', `E10', `5K', `EK' or `MOO-SHT'.
Ziping's Decade Fortune Formula: GP0The standard general form of `Ziping's Decade Fortune Formula' for people born in `y' A.D. is: G0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:3+{m+1 (Mod 12)}&C[m+1<2:+2]+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:3+{m-1 (Mod 12)}&C[m-1<2:+2]+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). Ziping's Decade Fortune Formula can be simplified as follows. For `Clockwise Revolution Mode' (RM=0): G0=3+{m+1 (Mod 12)}&C[m+1<2:+2]+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10] (Mod 10) & C0={m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10] (Mod 12). For `Anti-clockwise Revolution Mode' (RM=1): G0=3+{m-1 (Mod 12)}&C[m-1<2:+2]+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10] (Mod 10) & C0={m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10] (Mod 12). `y' is the year of birth in A.D. after `Joint of Year' in Gregorian calendar. Usually, `Joint of Year' is on 4th of February. `Joint of Year' is same as `Joint of February'. `m' is the month of birth after `Joint of Month'. Usually, `Joint of Month' is from 3rd to 8th of the month in Gregorian calendar. `J' is a conventional symbol to denote the day and time of `Joint of Month' before or after the date of birth such that `J1' is the day and time of `Joint of Month' before the date of birth and `J2' is the day and time of `Joint of Month' after the date of birth. The units of `J1' and `J2' are days. `d' is the day and time at birth. `J2-d' is the difference between the date and time of birth and the next `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `d-J1' is the difference between the date and time of birth and previous `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `a' is the age of the person in `Decade Bounds'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The `Time Interval' between two consecutive `Decade Fortune Co-ordinates' is 10 years. Hence, `n=10', where `n' is the time interval between two consecutive `Decade Fortune Co-ordinates' in years. If the position of `Decade Fortune Co-ordinates' is at (X,Y), then the `Decade Fortune Co-ordinates' are at (G0,C0) after `y' years. The simplified form of `Fortune Co-ordinates' Formula: G0=&C{RM=0:G0=X+I[y/n] (Mod 10), RM=1:G0=X-I[y/n] (Mod 10)} & C0=&C{RM=0:C0=Y+I[y/n] (Mod 12), RM=1:C0=Y-I[y/n] (Mod 12)}. It can be further simplified as follows. For `Clockwise Revolution Mode' (RM=0): G0=X+I[y/10] (Mod 10) & C0=Y+I[y/10] (Mod 12). For `Anti-clockwise Revolution Mode' (RM=1): G0=X-I[y/10] (Mod 10) & C0=Y-I[y/10] (Mod 12). The standard general form of `Ziping's Decade Fortune Formula' for people born in `y' B.C. is: G0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:3+{m+1 (Mod 12)}&C[m+1<2:+2]-2x{R[(1-y)/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:3+{m-1 (Mod 12)}&C[m-1<2:+2]-2x{R[(1-y)/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). Note that the `Revolution Mode Formula' for people born in `y' B.C. is different from people born in `y' A.D.. The `Revolution Mode Formula' for people born in `y' B.C. is `RM=R[(&C[SC:m=0, f=1]+y-1)/2]'.The origin of `Decade Fortune Co-ordinates' is at (UN0,ZN0), where `UN0' and `ZN0' are integers. The origin of `Decade Fortune' is the starting point of one's `Decade Fortune'. The `Decade Fortune' is revolving around in the space either clockwise or anti-clockwise. The `Decade Fortune' of human being is revolving either clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and the year of birth `y' in Gregorian calendar. For example, based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y)/2]' for people born in A.D. or based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y-1)/2]' for people born in B.C., if RM=0 it means that the `Revolution Mode' is clockwise. If RM=1 it means that the `Revolution Mode' is anti-clockwise. The `Fortune Co-ordinates' start to shift from the origin at (UN0,ZN0) to the next `Fortune Co-ordinates' on a 10-yearly base. The `Decade Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(G0,C0)' where `G0' and `C0' are integers. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `G0=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G0>10 then `G0' becomes `G0-10' and if G0<1 then `G0' becomes `G0+10'. Thus, the value range of `G0=(Mod 10)' is from 1 to 10. `C0=(Mod 12)' is a modulated function such that if C0>11 then `C0' becomes `C0-12' and if C0<0 then `C0' becomes `C0+12'. Thus, the value range of `C0=(Mod 12)' is from 0 to 11.Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962. Find the `Stem', `Root' and `Decade Fortune Code' (Big Fortune Code) of his `Decade Fortune' in A.D.2012. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:35 a.m. on 6th Jan., A.D.1962. So, J1=6+(3+35/60)/24 days in January. J1=6.1493 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:18 p.m. on 4th Feb., A.D.1962. So, J2=4+(15+18/60)/24 days in February. J2=4.6375 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:18 p.m. on 4th Feb., A.D.1962, it is regarded as previous year. That is, y=1961. The age of the person in A.D.2012 is a=2012-1961. a=51. Since the birthday at 10:00 p.m. on 16th January of A.D.1962 is after `Joint of Month' which is at 3:18 p.m. on 6th January of A.D.1962, the month of birth m=1 and d=16+22/24 days in January. d=16.9166 days in January. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=[31-(16+22/24)]+[4+(15+18/60)/24] days. J2-d=[31-16.916666]+[4+0.6375] days. J2-d=14.083334+4.6375 days. J2-d=18.720834 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=[16+22/24]-[6+(3+35/60)/24] days. d-J1=16.916666-6.1493055 days. d-J1=10.767361 days. Apply the standard general form of Ziping's Decade Fortune Formula for people born in A.D.. G0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:3+{m+1 (Mod 12)}&C[m+1<2:+2]+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:3+{m-1 (Mod 12)}&C[m-1<2:+2]+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). G0=&C{R[(0+1961)/2]=0:3+{1+1 (Mod 12)}&C[1+1<2:+2]+2x{R[1961/10] (Mod 5)}+I[(51-A[18.720834/3])/10], R[(0+1961)/2]=1:3+{1-1 (Mod 12)}&C[1-1<2:+2]+2x{R[1961/10] (Mod 5)}-I[(51-A[10.767361/3])/10]} (Mod 10) & C0=&C{R[(0+1961)/2]=0:{1+1 (Mod 12)}+I[(51-A[18.720834/3])/10], R[(0+1961)/2]=1:{1-1 (Mod 12)}-I[(51-A[10.767361/3])/10]} (Mod 12). G0=&C{R[1961/2]=0:3+{2 (Mod 12)}&C[2<2:+2]+2x{1 (Mod 5)}+I[(51-A[6.240278])/10], R[1961/2]=1:3+{0 (Mod 12)}&C[0<2:+2]+2x{1 (Mod 5)}-I[(51-A[3.5891203])/10]} (Mod 10) & C0=&C{R[1961/2]=0:{2 (Mod 12)}+I[(51-A[6.240278])/10], R[1961/2]=1:{0 (Mod 12)}-I[(51-A[3.5891203])/10]} (Mod 12). G0=&C{1=0:3+2+2x1+I[(51-6)/10], 1=1:3+0+2+2x1-I[(51-4)/10]} (Mod 10) & C0=&C{1=0:2+I[(51-6)/10], 1=1:0-I[(51-4)/10]} (Mod 12). G0=&C{1=0:7+I[45/10], 1=1:7-I[45/10]} (Mod 10) & C0=&C{1=0:2+I[45/10], 1=1:0-I[45/10]} (Mod 12). G0=&C{1=0:7+I[4.5], 1=1:7-I[4.5]} (Mod 10) & C0=&C{1=0:2+I[4.5], 1=1:0-I[4.5]} (Mod 12). G0=&C{1=0:7+4, 1=1:7-4} (Mod 10) & C0=&C{1=0:2+4, 1=1:0-4} (Mod 12). G0=&C{1=0:11, 1=1:3} (Mod 10) & C0=&C{1=0:6, 1=1:-4} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, G0=3 (Mod 10) and C0=-4 (Mod 12). G0=3 and C0=12-4. C0=8. `G0=3' stands for the `Stem' (G0) of the `Decade Fortune' of the client in A.D.2012 is `C' because `C' is the 3rd alphabet. The `Root' (C0) of `Decade Fortune' is 8. So, the `Decade Fortune Co-ordinates' are (3,8). The `Big Fortune Code' is `33', `C8', `3I', `CI' or `BIM-SAN'. An alternative method is to find the `Revolution Mode' (RM) of the `Decade Fortune' first. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(0+1961)/2]. RM=R[1961/2]. RM=1. The `Revolution Mode' of the `Decade Fortune' is anti-clockwise. Then, apply the simplified form of Ziping's Decade Fortune Formula for people born in A.D. for anti-clockwise `Revolution Mode' (RM=1). G0=3+{m-1 (Mod 12)}&C[m-1<2:+2]+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10] (Mod 10) & C0={m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10] (Mod 12). G0=3+{1-1 (Mod 12)}&C[1-1<2:+2]+2x{R[1961/10] (Mod 5)}-I[(51-A[(16.9166-6.1493)/3])/10] (Mod 10) & C0={1-1 (Mod 12)}-I[(51-A[(16.9166-6.1493)/3])/10] (Mod 12). G0=3+{0 (Mod 12)}&C[0<2:+2]+2x{1 (Mod 5)}-I[(51-A[10.7673/3])/10] (Mod 10) & C0={0 (Mod 12)}-I[(51-A[10.7673/3])/10] (Mod 12). G0=3+0+2+2x1-I[(51-A[3.5891])/10] (Mod 10) & C0=0-I[(51-A[3.5891])/10] (Mod 12). G0=5+2-I[(51-4)/10] (Mod 10) & C0=-I[(51-4)/10] (Mod 12). G0=7-I[47/10] (Mod 10) & C0=-I[47/10] (Mod 12). G0=7-I[4.7] (Mod 10) & C0=-I[4.7] (Mod 12). G0=7-4 (Mod 10) & C0=-4 (Mod 12). G0=3 (Mod 10) & C0=12-4. G0=3 & C0=8. The `Stem' of the `Decade Fortune' of the client in A.D.2012 is `C' because `C' is the 3rd alphabet and the `Root' is 8. So, the `Decade Fortune Code' (Big Fortune Code) is `C8'. Assume a female was born at 12:23 p.m. on 4th February of A.D.1925. Find the `Stem', `Root' and `Decade Fortune Code' (Big Fortune Code) of her `Decade Fortune' in A.D.1997. From the given data, we know that the `Sex Code' (SC) is `f' and f=1. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:54 a.m. on 6th Jan., A.D.1925. So, J1=6+(3+54/60)/24 days in January. J1=6.1625 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:37 p.m. on 4th Feb., A.D.1925. So, J2=4+(15+37/60)/24 days in February. J2=4.6506944 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:37 p.m. on 4th Feb., A.D.1925, it is regarded as previous year. That is, y=1924. The age of the person in A.D.1997 is a=1997-1924. a=73. Since the birthday at 12:23 p.m. on 4th February of A.D.1925 is before `Joint of Month' which is at 3:37 p.m. on 4th February of A.D.1925, the month of birth m=1. Since the time of birth is at 12:23 p.m. on 4th February of A.D.1925, d=4+(12+23/60)/24 days in February. d=4.5159722 days in February. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=4.6506944-4.5159722 days, J2-d=0.1347222 day. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=4.5159722+(31-6.1625) days. d-J1=4.5159722+24.8375 days. d-J1=29.353472 days. Apply the standard general form of Ziping's Decade Fortune Formula for people born in A.D.. G0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:3+{m+1 (Mod 12)}&C[m+1<2:+2]+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:3+{m-1 (Mod 12)}&C[m-1<2:+2]+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). G0=&C{R[(1+1924)/2]=0:3+{1+1 (Mod 12)}&C[1+1<2:+2]+2x{R[1924/10] (Mod 5)}+I[(73-A[0.1347222/3])/10], R[(1+1924)/2]=1:3+{1-1 (Mod 12)}&C[1-1<2:+2]+2x{R[1924/10] (Mod 5)}-I[(73-A[29.353472/3])/10]} (Mod 10) & C0=&C{R[(1+1924)/2]=0:{1+1 (Mod 12)}+I[(73-A[0.1347222/3])/10], R[(1+1924)/2]=1:{1-1 (Mod 12)}-I[(73-A[29.353472/3])/10]} (Mod 12). G0=&C{R[1925/2]=0:3+{2 (Mod 12)}&C[2<2:+2]+2x{4 (Mod 5)}+I[(73-A[0.0449074])/10], R[1925/2]=1:3+{0 (Mod 12)}&C[0<2:+2]+2x{4 (Mod 5)}-I[(73-A[9.7844906])/10]} (Mod 10) & C0=&C{R[1925/2]=0:{2 (Mod 12)}+I[(73-A[0.0449074])/10], R[1925/2]=1:{0 (Mod 12)}-I[(73-A[9.7844906])/10]} (Mod 12). G0=&C{1=0:3+2&C[2<2:+2]+2x4+I[(73-0)/10], 1=1:3+0&C[0<2:+2]+2x4-I[(73-10)/10]} (Mod 10) & C0=&C{1=0:2+I[(73-0)/10], 1=1:0-I[(73-10)/10]} (Mod 12). G0=&C{1=0:3+2+8+I[73/10], 1=1:3+0+2+8-I[63/10]} (Mod 10) & C0=&C{1=0:2+I[73/10], 1=1:-I[63/10]} (Mod 12). G0=&C{1=0:13+I[7.3], 1=1:13-I[6.3]} (Mod 10) & C0=&C{1=0:2+I[7.3], 1=1:-I[6.3]} (Mod 12). G0=&C{1=0:13+7, 1=1:13-6} (Mod 10) & C0=&C{1=0:2+7, 1=1:-6} (Mod 12). G0=&C{1=0:20, 1=1:7} (Mod 10) & C0=&C{1=0:9, 1=1:-6} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, G0=7 (Mod 10) and C0=-6 (Mod 12). G0=7 and C0=12-6. C0=6. The `Stem' of the `Decade Fortune' of the client in A.D.1997 is `G' because `G' is the 7th alphabet and the `Root' is 6. So, the `Decade Fortune Co-ordinates' are (7,6). The `Big Fortune Code' is `07', `G6', `7G', `GG' or `GEN-NGG'. An alternative method is to find the `Revolution Mode' (RM) of the `Decade Fortune' first. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(1+1924)/2]. RM=R[1925/2]. RM=1. The `Revolution Mode' of the `Decade Fortune' is anti-clockwise. Then, apply the simplified form of Ziping's Decade Fortune Formula for people born in A.D. for anti-clockwise `Revolution Mode' (RM=1). G0=3+{m-1 (Mod 12)}&C[m-1<2:+2]+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10] (Mod 10) & C0={m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10] (Mod 12). G0=3+{1-1 (Mod 12)}&C[1-1<2:+2]+2x{R[1924/10] (Mod 5)}-I[(73-A[29.353472/3])/10] (Mod 10) & C0={1-1 (Mod 12)}-I[(73-A[29.353472/3])/10] (Mod 12). G0=3+{0 (Mod 12)}&C[0<2:+2]+2x{4 (Mod 5)}-I[(73-A[9.7844906])/10] (Mod 10) & C0={0 (Mod 12)}-I[(73-A[9.7844906])/10] (Mod 12). G0=3+0+2+2x4-I[(73-10)/10] (Mod 10) & C0=0-I[(73-10)/10] (Mod 12). G0=13-I[63/10] (Mod 10) & C0=-I[63/10] (Mod 12). G0=13-I[6.3] (Mod 10) & C0=-I[6.3] (Mod 12). G0=13-6 (Mod 10) & C0=-6 (Mod 12). G0=7 (Mod 10) & C0=12-6. G0=7 & C0=6. The `Stem' of the `Decade Fortune' of the client in A.D.1997 is `G' because `G' is the 7th alphabet and the `Root' is 6. So, the `Decade Fortune Code' (Big Fortune Code) is `G6'. Assume the present `Decade Fortune Co-ordinates' (X,Y) are (2,9) and the `Revolution Mode' is clockwise (i.e. RM=0). Find the `Decade Fortune Co-ordinates' (G0,C0) of 16 years later (i.e. y=16). Apply the simplified Decade Fortune Formula. G0=X+I[y/10] (Mod 10) & C0=Y+I[y/10] (Mod 12). The values of `G0' and `C0' of the new `Decade Fortune Co-ordinates' (G0,C0) after `y' years are: G0=2+I[16/10] (Mod 10) & C0=9+I[16/10] (Mod 12). G0=2+I[1.6] (Mod 10) & C0=9+I[1.6] (Mod 12). G0=2+1 (Mod 10) & C0=9+1 (Mod 12). G0=3 (Mod 10) & C0=10 (Mod 12). G0=3 & C0=10. Hence, after counting 16 years clockwise, the `Decade Fortune' will move from `Co-ordinates' (2,9) with a value of the `Sequence Code of Decade Fortune Co-ordinates' of `22' to `Co-ordinates' (3,10) with a new value of the `Sequence Code of Decade Fortune Co-ordinates' of `23'. Thus, the value of the `Sequence Code of Decade Fortune Co-ordinates' is changed from `22' to `23'. Assume the present `Decade Fortune Co-ordinates' (X,Y) are (8,1) and the `Revolution Mode' is anti-clockwise (i.e. RM=1). Find the `Decade Fortune Co-ordinates' (G0,C0) of 42 years later (i.e. y=42). Apply the simplified Decade Fortune Formula. G0=X-I[y/10] (Mod 10) & C0=Y-I[y/10] (Mod 12). The values of `G0' and `C0' of the new `Decade Fortune Co-ordinates' (G0,C0) after `y' years are: G0=8-I[42/10] (Mod 10) & C0=1-I[42/10] (Mod 12). G0=8-I[4.2] (Mod 10) & C0=1-I[4.2] (Mod 12). G0=8-4 (Mod 10) & C0=1-4 (Mod 12). G0=4 (Mod 10) & C0=-3 (Mod 12). G0=4 & C0=12-3. C0=9. Hence, after counting 42 years anti-clockwise, the `Decade Fortune' will move from `Co-ordinates' (8,1) with a value of the `Sequence Code of Decade Fortune Co-ordinates' of `38' to `Co-ordinates' (4,9) with a new value of the `Sequence Code of Decade Fortune Co-ordinates' of `34'. Thus, the value of the `Sequence Code of Decade Fortune Co-ordinates' is changed from `38' to `34'.
Ziping's Decade Bounds Formula: BOUNDSP0The standard general form of `Ziping's Decade Bounds Formula' for people born in `y' A.D. is: P0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). The standard general form of `Ziping's Decade Bounds Formula' for people born in `y' B.C. is: P0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). `y' is the year of birth after `Joint of Year' in Gregorian calendar. Usually, `Joint of Year' is on 4th of February. `Joint of Year' is same as `Joint of February'. `m' is the month of birth after `Joint of Month'. Usually, `Joint of Month' is from 3rd to 8th of the month. `J' is a conventional symbol to denote the day and time of `Joint of Month' before or after the date of birth such that `J1' is the day and time of `Joint of Month' before the date of birth and `J2' is the day and time of `Joint of Month' after the date of birth. The units of `J1' and `J2' are days. `d' is the day and time of birth. The unit of `d' is in day. `J2-d' is the difference between the date and time of birth and the next `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `d-J1' is the difference between the date and time of birth and previous `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `a' is the age of the person in `Decade Bounds'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The `Ziping's Decade Bounds' moves consecutively either clockwise or anti-clockwise along the zones every ten years. Thus, the time interval of `Decade Bounds' is 10 years. If we let the zone of `Ziping's Decade Bounds' at age `a' be `P0', the minimum age of `Decade Fortune' be 'e', then for people born in A.D. is: e=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:A[(d-J1)/3]}. For people born in B.C. is: e=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y-1)/2]=1:A[(d-J1)/3]}. If the value of `J' is unknown, let J=6 for approximate calculation. The maximum deviation in age for approximate calculation is 1. If the birthday is between 3rd to 8th, approximate calculation cannot be used. The calculation must use precise value of `J'. If one's age is less than the minimum age of `Decade Fortune', i.e. `a' is less than `e', one is not qualified to have a `Decade Fortune'. So, one has no `Decade Bounds' at that moment. The simplified form of `Ziping's Decade Bounds Formula' for people born in `y' A.D. is: If a>e or a=e, P0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-e)/10]} (Mod 12). The simplified form of `Ziping's Decade Bounds Formula' for people born in `y' B.C. is: If a>e or a=e, P0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{m+1 (Mod 12)}+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:{m-1 (Mod 12)}-I[(a-e)/10]} (Mod 12).`Decade Bounds' is also named as `Large Bounds'. `Decade Bounds' is the focus of `Decade Fortune' because it shows the decade fortune in a zone of a person. The first `Decade Bounds' is called the `Initial Decade Bounds'. The first `Ziping's Decade Bounds' is equal to the zone of `Ziping's Decade Fortune' next to `Ziping's Decade Fortune Origin' (UN0,ZN0) according to its direction of revolution. The `Ziping's Decade Bounds' moves consecutively either clockwise or anti-clockwise according to the `Revolution Mode' (RM) along the zones every ten years. There are altogether twelve zones. The zones recur from 0 to 11. They are integers and usually assigned to variable `X'. The `Revolution Mode' (RM) of `Decade Bounds' is a mathematical expression that can show the revolving direction of `Decade Bounds' in its `Fortune Track' (FT). There are altogether two different types of `Revolution Modes', namely `Clockwise Revolution Mode' (CRM) and `Anti-clockwise Revolution Mode' (ARM). The `Decade Bounds' of human being is revolving either clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and the year of birth `y' in Gregorian calendar. For example, based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y)/2]' for people born in A.D. or based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y-1)/2]' for people born in B.C., if RM=0 it means that the `Revolution Mode' is clockwise. If RM=1 it means that the `Revolution Mode' is anti-clockwise. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `P0=(Mod 12)' is a modulated function such that if P0>11 then `P0' becomes `P0-12' and if P0<0 then `P0' becomes `P0+12'. Thus, the value range of `P0=(Mod 12)' is from 0 to 11.Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962. Find the zone of `Ziping's Decade Bounds' (P0) in A.D.2012. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:35 a.m. on 6th Jan., A.D.1962. So, J1=6+(3+35/60)/24 days in January. J1=6.1493055 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:18 p.m. on 4th Feb., A.D.1962. So, J2=4+(15+18/60)/24 days in February. J2=4.6375 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:18 p.m. on 4th Feb., A.D.1962, it is regarded as previous year. That is, y=1961. The age of the person in A.D.2012 is a=2012-1961. a=51. Since the birthday at 10:00 p.m. on 16th January of A.D.1962 is after `Joint of Month' which is at 3:18 p.m. on 6th January of A.D.1962, the month of birth m=1 and d=16+22/24 days in January. d=16.916666 days in January. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=[31-(16+22/24)]+[4+(15+18/60)/24] days. J2-d=[31-16.916666]+[4+0.6375] days. J2-d=14.083334+4.6375 days. J2-d=18.720834 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=[16+22/24]-[6+(3+35/60)/24] days. d-J1=16.916666-6.1493055 days. d-J1=10.767361 days. Apply the standard general form of `Ziping's Decade Bounds Formula' for people born in A.D.. P0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). The zone of `Ziping's Decade Bounds' (P0) is P0=&C{R[(0+1961)/2]=0:{1+1 (Mod 12)}+I[(51-A[(14.083334+4.6375)/3])/10], R[(0+1961)/2]=1:{1-1 (Mod 12)}-I[(51-A[(16.9166-6.1493)/3])/10]} (Mod 12). P0=&C{R[1961/2]=0:{2 (Mod 12)}+I[(51-A[18.720834/3])/10], R[1961/2]=1:{0 (Mod 12)}-I[(51-A[10.7673/3])/10]} (Mod 12). P0=&C{1=0:2+I[(51-A[6.240278])/10], 1=1:0-I[(51-A[3.5891])/10]} (Mod 12). P0=&C{1=0:2+I[(51-6)/10], 1=1:0-I[(51-4)/10]} (Mod 12). P0=&C{1=0:2+I[45/10], 1=1:-I[47/10]} (Mod 12). P0=&C{1=0:2+I[4.5], 1=1:-I[4.7]} (Mod 12). P0=&C{1=0:2+4, 1=1:-4} (Mod 12). P0=&C{1=0:6, 1=1:-4} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, P0=-4 (Mod 12). P0=12-4. P0=8. Assume a male was born at 10:35 a.m. on 27th Sept., A.D.1952. Find the zone of `Ziping's Decade Bounds' (P0) in A.D.2007. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of September' which is at 1:14 a.m. on 8th Sept., A.D.1952. So, J1=8+(1+14/60)/24 days in September. J1=8.0513888 days in September. `Joint of Month' after the date of birth is `Joint of October' which is at 4:33 p.m. on 8th Oct., A.D.1952. So, J2=8+(16+33/60)/24 days in October. J2=8.6895833 days in October. Since the birthday is after `Joint of Year' which is at 4:54 a.m. on 5th Feb., A.D.1952, y=1952. The age of the person in A.D.2007 is a=2007-1952. a=55. Since the birthday at 10:35 a.m. on 27th Sept., A.D.1952 is after `Joint of Month' which is at 1:14 a.m. on 8th Sept., A.D.1952, the month of birth m=9 and d=27+(10+35/60)/24 days in September. d=27.440972 days in September. `J2-d' is the day and time difference between `Joint of October' and the date and time of birth. J2-d=8+(16+33/60)/24+{30-[27+(10+35/60)/24]} days. J2-d=8.6895833+{30-27.440972} days. J2-d=11.248611 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of September'. d-J1=27+(10+35/60)/24-[8+(1+14/60)/24] days. d-J1=27.440972-8.0513888 days. d-J1=19.389584 days. The minimum age of `Ziping's Decade Fortune' for people born in A.D. is e=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:A[(d-J1)/3]}. e=&C{R[(0+1952)/2]=0:A[11.248611/3], R[(0+1952)/2]=1:A[19.389584/3]}. e=&C{0=0:A[3.749537], 0=1:A[6.4631946]}. e=&C{0=0:4, 0=1:6}. Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, e=4. That is a>e. Apply the `Ziping's Decade Bounds Formula' for people born in A.D.. If a>e or a=e, P0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-e)/10]} (Mod 12). The zone of `Ziping's Decade Bounds' (P0) is P0=&C{R[(0+1952)/2]=0:{9+1 (Mod 12)}+I[(55-4)/10], R[(0+1952)/2]=1:{9-1 (Mod 12)}-I[(55-4)/10]} (Mod 12). P0=&C{R[1952/2]=0:{10 (Mod 12)}+I[51/10], R[1952/2]=1:{8 (Mod 12)}-I[51/10]} (Mod 12). P0=&C{0=0:{10 (Mod 12)}+I[5.1], 0=1:{8 (Mod 12)}-I[5.1} (Mod 12). P0=&C{0=0:10+5, 0=1:8-5} (Mod 12). P0=&C{0=0:15, 0=1:3} (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, P0=15 (Mod 12). P0=15-12. P0=3. Assume a female was born at 12:23 p.m. on 20th Apr., A.D.1926. Find the zone of `Ziping's Decade Bounds' (P0) in A.D.1997. From the given data, we know that the `Sex Code' (SC) is `f' and f=1. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of April' which is at 9:19 p.m. on 5th Apr., A.D.1926. So, J1=5+(21+19/60)/24] days in April. J1=5.8881944 days in April. `Joint of Month' after the date of birth is `Joint of May' which is at 3:09 p.m. on 6th May, A.D.1926. So, J2=6+(15+9/60)/24 days in May. J2=6.63125 days in May. Since the birthday is after `Joint of Year' which is at 9:39 p.m. on 4th Feb., A.D.1926, `Year of Birth' y=1926. The age of the person in A.D.1997 is a=1997-1926. a=71. Since the birthday at 12:23 p.m. on 20th Apr., A.D.1926 is after `Joint of Month' which is at 9:19 p.m. on 5th Apr., A.D.1926, the month of birth m=4 and d=20+(12+23/60)/24 days in April. d=20.515972 days in April. `J2-d' is the day and time difference between `Joint of May' and the date and time of birth. J2-d=6+(15+9/60)/24+{30-[20+(12+23/60)/24]}. J2-d=6.63125+{30-20.515972}. J2-d=16.115278. `d-J1' is the day and time difference between the date and time of birth and `Joint of April'. d-J1=20+(12+23/60)/24-[5+(21+19/60)/24] days. d-J1=20.515972-5.8881944 days. d-J1=14.627778 days. The minimum age of `Decade Fortune' for people born in A.D. is e=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:A[(d-J1)/3]}. e=&C{R[(1+1926)/2]=0:A[16.115278/3], R[(1+1926)/2]=1:A[14.627778/3]}. e=&C{R[1927/2]=0:A[5.3717593], R[(1927/2]=1:A[4.875926]}. e=&C{1=0:5, 1=1:5}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, e=5. That is, a>e. Apply the `Ziping's Decade Bounds Formula' for people born in A.D.. If a>e or a=e, P0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m+1 (Mod 12)}+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1 (Mod 12)}-I[(a-e)/10]} (Mod 12). The zone of `Ziping's Decade Bounds' (P0) is P0=&C{R[(1+1926)/2]=0:{4+1 (Mod 12)}+I[(71-5)/10], R[(1+1926)/2]=1:{4-1 (Mod 12)}-I[(71-5)/10]} (Mod 12). P0=&C{R[1927/2]=0:{5 (Mod 12)}+I[66/10], R[1927/2]=1:{3 (Mod 12)}-I[66/10]} (Mod 12). P0=&C{1=0:5+I[6.6], 1=1:3-I[6.6]} (Mod 12). P0=&C{1=0:5+6, 1=1:3-6} (Mod 12). P0=&C{1=0:11, 1=1:-3} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, P0=-3 (Mod 12). P0=12-3. P0=9.
Ziping's Decade Bounds Age Formula: AP `Ziping's Decade Bounds' revolves consecutively along the zones either clockwise or anti-clockwise for every ten years. Thus, the time interval of `Decade Bounds' is 10 years. In `PT&FM', the beginning of a year is not on 1st of January in Gregorian calendar. The beginning of a year is `Joint of February'. The critical value between two consecutive years is called `Joint of Year'. `Joint of February' is the boundary of two consecutive years. It always lies on from the 3rd to 5th day of February. In general, not for precise calculations, `Joint of February' can be regarded as the 4th day of February. If the date of birth is within the 3rd to 5th day of February, precise calculations should be carried out. That is, if the time of the date of birth is after `Joint of February', the year is `y'. If the time of the date of birth is before `Joint of February', the year is `y-1'. The time and date of `Joint of February' between two consecutive years in Gregorian calendar always change from year to year. `Joint of February' also varies according to the longitude and latitude of a place. The exact date and time of `Joint of February' of a year can be found in a Chinese lunar calendar. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `y' is the year of birth. `m' is the month of birth after `Joint of Month'. Usually, `Joint of Month' is from 3rd to 8th of the month. `d' is the date and time of birth reckoning in Gregorian calendar. The unit of `d' is day. The zone of `Decade Bounds' is `P0'. `AP' is the minimum age of `Decade Bounds'. `AP' is called the `Lower Bound Age' of the `Decade Bounds'. The `Upper Bound Age' is equal to `AP+9' because the time interval of `Decade Bounds' is 10 years. `J' is a conventional symbol to denote the day and time of `Joint of Month' before or after the date of birth such that `J1' is the day and time of `Joint of Month' before the date of birth and `J2' is the day and time of `Joint of Month' after the date of birth. The units of `J1' and `J2' are days. `J2-d' is the difference between the date and time of birth and the next `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `d-J1' is the difference between the date and time of birth and previous `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. The `Ziping's Decade Bounds Age Formula' for people born in A.D. is: AP=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{P0-m-1 (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1-P0 (Mod 12)}x10+A[(d-J1)/3]}. The `Ziping's Decade Bounds Age Formula' for people born in B.C. is: AP=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{P0-m-1 (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y-1)/2]=1:{m-1-P0 (Mod 12)}x10+A[(d-J1)/3]}. The `Ziping's Decade Bounds Age Formula' can be simplified as follows. For `Clockwise Revolution Mode' (RM=0): AP={P0-m-1 (Mod 12)}x10+A[(J2-d)/3]. For `Anti-clockwise Revolution Mode' (RM=1): AP={m-1-P0 (Mod 12)}x10+A[(d-J1)/3].`Ziping's Decade Bounds' is also named as `Ziping's Large Bounds'. `Decade Bounds' is the focus of `Decade Fortune' because it shows the decade fortune in a zone of a person. The first `Decade Bounds' is called the `Initial Decade Bounds'. The first `Ziping's Decade Bounds' is equal to the zone of `Ziping's Decade Fortune' next to `Ziping's Decade Fortune Origin' (UN0,ZN0) according to its direction of revolution. `Ziping's Decade Bounds' moves consecutively either clockwise or anti-clockwise according to the `Revolution Mode' (RM) along the zones every ten years. There are altogether twelve zones. The zones recur from 0 to 11. They are integers and usually assigned to variable `X'. The `Revolution Mode' (RM) of `Decade Bounds' is a mathematical expression that can show the revolving direction of `Decade Bounds' in its `Fortune Track' (FT). There are altogether two different types of `Revolution Modes', namely `Clockwise Revolution Mode' (CRM) and `Anti-clockwise Revolution Mode' (ARM). The `Decade Bounds' of human being is revolving either clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and the year of birth `y' in Gregorian calendar. For example, based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y)/2]' for people born in A.D. or based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y-1)/2]' for people born in B.C., if RM=0 it means that the `Revolution Mode' is clockwise. If RM=1 it means that the `Revolution Mode' is anti-clockwise. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `AP=(Mod 12)' is a modulated function such that if AP>11 then `AP' becomes `AP-12' and if AP<0 then `AP' becomes `AP+12'. Thus, the value range of `AP=(Mod 12)' is from 0 to 11.Assume a male was born at 0:45 a.m. on 6th Oct., A.D.1952. Find the minimum age (AP) when the zone of `Decade Bounds' (P0) is 4. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of September' which is at 1:14 a.m. on 8th Sept., A.D.1952. So, J1=8+(1+14/60)/24 days in September. J1=8.0513888 days in September. `Joint of Month' after the date of birth is `Joint of October' which is at 4:33 p.m. on 8th Oct., A.D.1952. So, J2=8+(16+33/60)/24 days in October. J2=8.6895833 days in October. Since the birthday is after `Joint of Year' which is at 4:54 a.m. on 5th Feb., A.D.1952, y=1952. Since the birthday at 0:45 a.m. on 6th Oct., A.D.1952 is before `Joint of Month' which is at 4:33 p.m. on 8th Oct., A.D.1952, the month of birth m=9 and d=6+45/60/24 days in October. d=6.03125 days in October. `J2-d' is the day and time difference between `Joint of October' and the date and time of birth. J2-d=8.6895833-6.03125 days. J2-d=2.6583333 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of September'. d-J1=6.03125+(30-8.0513888) days. d-J1=6.03125+21.948612 days. d-J1=27.979862 days. Apply the `Ziping's Decade Bounds Age Formula' for people born in A.D.. AP=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{P0-m-1 (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1-P0 (Mod 12)}x10+A[(d-J1)/3]}. AP=&C{R[(0+1952)/2]=0:{4-9-1 (Mod 12)}x10+A[2.6583333/3], R[(0+1952)/2]=1:{9-1-4 (Mod 12)}x10+A[27.979862/3]}. AP=&C{R[1952/2]=0:{-6 (Mod 12)}x10+A[0.8861111], R[1952/2]=1:{4 (Mod 12)}x10+A[9.3266206]}. AP=&C{0=0:{12-6}x10+1, 0=1:4x10+9}. AP=&C{0=0:6x10+1, 0=1:40+9}. AP=&C{0=0:61, 0=1:49}. Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, AP=61. Hence, the minimum age of the client is 61 when the zone of `Decade Bounds' is 4 and it ends till an age of 70. Assume a female was born at 12:23 p.m. on 4th Feb., A.D.1925. Find the minimum age (AP) when the zone of `Decade Bounds' (P0) is 2. From the given data, we know that the `Sex Code' (SC) is `f' and f=1. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:54 a.m. on 6th Jan., A.D.1925. So, J1=6+(3+54/60)/24 days in January. J1=6.1625 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:37 p.m. on 4th Feb., A.D.1925. So, J2=4+(15+37/60)/24 days in February. J2=4.6506944 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:37 p.m. on 4th Feb., A.D.1925, it is regarded as previous year. That is, y=1924. Since the birthday at 12:23 p.m. on 4th Feb., A.D.1925 is before `Joint of Month' which is at 3:37 p.m. on 4th Feb., A.D.1925, the month of birth m=1 and d=4+(12+23/60)/24 days in February. d=4.5159722 days in February. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=4.6506944-4.5159722 days. J2-d=0.1347222 day. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=4.5159722+(31-6.1625) days. d-J1=4.5159722+24.8375 days. d-J1=29.353472 days. Apply the `Ziwei's Decade Bounds Age Formula' for people born in A.D.. AP=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{P0-m-1 (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1-P0 (Mod 12)}x10+A[(d-J1)/3]}. AP=&C{R[(1+1924)/2]=0:{2-1-1 (Mod 12)}x10+A[0.1347222/3], R[(1+1924)/2]=1:{1-1-2 (Mod 12)}x10+A[29.353472/3]}. AP=&C{R[1925/2]=0:{0 (Mod 12)}x10+A[0.0449074], R[1925/2]=1:{-2 (Mod 12)}x10+A[9.7844906]}. AP=&C{1=0:0x10+0, 1=1:{12-2}x10+10}. AP=&C{1=0:0, 1=1:10x10+10}. AP=&C{1=0:0, 1=1:110}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, AP=110. Hence, the minimum age of the client is 110 when the zone of `Decade Bounds' is 2 and it ends till an age of 119. Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962. Find the minimum age (AP) when the zone of `Decade Bounds' (P0) is 10. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:35 a.m. on 6th Jan., A.D.1962. So, J1=6+(3+35/60)/24 days in January. J1=6.1493055 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:18 p.m. on 4th Feb., A.D.1962. So, J2=4+(15+18/60)/24 days in February. J2=4.6375 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:18 p.m. on 4th Feb., A.D.1962, it is regarded as previous year. That is, y=1961. Since the birthday at 10:00 p.m. on 16th January of A.D.1962 is after `Joint of Month' which is at 3:18 p.m. on 6th January of A.D.1962, the month of birth m=1 and d=16+22/24 days in January. d=16.916666 days in January. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=[31-(16+22/24)]+[4+(15+18/60)/24] days. J2-d=[31-16.916666]+[4+0.6375] days. J2-d=14.083334+4.6375 days. J2-d=18.720834 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=[16+22/24]-[6+(3+35/60)/24] days. d-J1=16.916666-6.1493055 days. d-J1=10.767361 days. Apply the `Ziwei's Decade Bounds Age Formula' for people born in A.D.. AP=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{P0-m-1 (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-1-P0 (Mod 12)}x10+A[(d-J1)/3]}. AP=&C{R[(0+1961)/2]=0:{10-1-1 (Mod 12)}x10+A[18.720834/3], R[(0+1961)/2]=1:{1-1-10 (Mod 12)}x10+A[10.767361/3]}. AP=&C{R[1961/2]=0:{8 (Mod 12)}x10+A[6.240278], R[1961/2]=1:{-10 (Mod 12)}x10+A[3.5891203]}. AP=&C{1=0:8x10+6, 1=1:{12-10}x10+4}. AP=&C{1=0:86, 1=1:2x10+4}. AP=&C{1=0:86, 1=1:24}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, AP=24. Hence, the minimum age of the client is 24 when the zone of `Decade Bounds' is 10 and it ends till an age of 33. An alternative method to calculate the minimum age (AP) of `Decade Bounds' is by the simplified `Decade Bounds Age Formula'. The first step is to find out the `Revolution Mode' (RM) of `Decade Fortune' of the client by the `Revolution Mode Formula'. Apply the `Revolution Mode Formula' for people born in A.D.. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(0+1961)/2]. RM=R[1961/2]. RM=1. Hence, the `Revolution Mode' of `Decade Fortune' of the client is anti-clockwise. Then, apply the simplified `Ziwei's Decade Bounds Age Formula' for `Anti-clockwise Revolution Mode' (RM=1). AP={m-1-P0 (Mod 12)}x10+A[(d-J1)/3]. AP={1-1-10 (Mod 12)}x10+A[10.767361/3]. AP={-10 (Mod 12)}x10+A[3.5891203]. AP={12-10}x10+4. AP=2x10+4,AP=24. Hence, the minimum age of the client is 24 when the zone of `Decade Bounds' is 10 and it ends till an age of 33.
Ziwei Doushu's Decade Fortune Origin Formula: U0The origin of `Ziwei Doushu's Decade Fortune Co-ordinates' is at (U0,Z0). `U0' is the `Stem'. `Z0' is the `Root' of zone (Z) of the `Soul' (S). Thus, `Z0' is equal to `S'. S=m-A[h/2] (Mod 12). `Ziwei Doushu's Decade Fortune' is also named as `Ziwei's Big Fortune' in general. `y' is the year of birth of a person approximately equal to the year in A.D. of Gregorian calendar but the first day of the year is not on 1st of January in Gregorian calendar. The beginning of a year is usually on 4th of February in Gregorian calendar. It is called `Joint of Year'. The time of birth after `Joint of Year' is `y'. If the time of birth is before `Joint of Year', `y' is regarded as previous year. That is, the year of birth is `y-1'. `Joint of Year' is same as `Joint of February', which is usually on 4th of February of a year in Gregorian calendar. `m' is the month of birth of a person. It is approximately equal to the month in Gregorian calendar but the beginning of a new month is not on the first day of the month in Gregorian calendar. The critical value between two consecutive months is called `Joint of Month'. The `Joints of Month' always lie on from the 3rd to 8th day of a month in Gregorian calendar. In general, not for precise calculations, `Joint of Month' can be regarded as the 6th day of a month. If the date of birth of a person is within the 3rd to 8th day of a month in Gregorian calendar, precise calculations should be carried out. That is, if the time of birth is after `Joint of Month', the month of birth is `m'. If the time of birth is before `Joint of Month', the month of birth is `m-1 (Mod 12)'. The time and date of `Joint of Month' between two consecutive solar months always change from month to month. `Joint of Month' also varies according to the longitude and latitude of a place. The exact date and time of `Joint of Month' of a place can be found in a Chinese lunar calendar of that place. `h' is the time of birth of a person reckoning on a 24-hour base. The standard general form of `Ziwei's Decade Fortune Origin Formula' for people born in `y' A.D. is: U0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12). The simplified form is `U0=3+{S&C[S<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12) or Z0=S'. For people born in `y' B.C., the standard general form of `Ziwei's Decade Fortune Origin Formula' is: U0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}-2x{R[(1-y)/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12). The simplified form is `U0=3+{S&C[S<2:+2]}-2x{R[(1-y)/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12) or Z0=S'.`Ziwei Doushu's Decade Fortune Origin' is called `Ziwei's Decade Fortune Origin' in short. `Ziwei's Decade Fortune Origin' (U0,Z0) is the `Decade Fortune Co-ordinates' of the `Soul' (S) of a person in `Initial Decade Bounds' (S0). The `Decade Fortune' is revolving around either clockwise or anti-clockwise oscillating in a loop of 60 `Fortune Co-ordinates' (G,C) on a ten-yearly base, where `G' and `C' are integers. It starts to move from the `Decade Fortune Co-ordinates' of `Soul' at (U0,Z0) to the next `Decade Fortune Co-ordinates' (G,C) after 10 years. The starting age of `Ziwei's Decade Fortune Origin' (U0,Z0) of a person is the `Initial Age Decade Bounds'. In other words, the `Initial Age Decade Bounds' is the minimum age for `Ziwei's Decade Fortune' of a person to take place. After 10 years, the `Decade Fortune Co-ordinates' will shift from `Ziwei's Decade Fortune Origin' (U0,Z0) to the next `Decade Fortune Co-ordinates'. At the same time, the focus of `Decade Fortune' also moves to the next `Decade Bounds'. The `Root' of `Ziwei's Decade Fortune Origin' (U0,Z0) of a person is always equal to the zone of `Soul' (S). So, Z0=S. The `Decade Fortune Co-ordinates' always shift to the next `Decade Fortune Co-ordinates' for every 10 years. The `Decade Fortune' of a `Decade Bounds' is 10 years. There is no `Decade Fortune' or `Decade Bounds' if the age of a person is below the `Initial Age Decade Bounds'. For example, if the `Initial Age Decade Bounds' is 3, the `Decade Fortune' starts when the child is 3 years old. There is no `Decade Fortune' or `Decade Bounds' when the child is below 3 years old. The `Initial Age Decade Bounds' ends when the child is 12 years old. So, the influence of `Ziwei's Decade Fortune Origin' (U0,Z0) of the person is from 3 years old to 12 years old. The timeons of the `Stem' (U0) and `Root' (Z0) of `Ziwei's Decade Fortune Origin' (U0,Z0) can switch on a lot of `Events' in that period. `Ziwei's Decade Fortune' and `Ziwei's Decade Bounds' always shift to the next in same phase and `Ziwei's Decade Fortune Origin' (U0,Z0) always equals to `Ziwei's Decade Bounds Origin' (U0,S0). `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `S=(Mod 12)' is a modulated function such that if S>11 then `S' becomes `S-12' and if S<0 then `S' becomes `S+12'. Thus, the value range of `S=(Mod 12)' is from 0 to 11. `R[y/10]' and `R[(1-y)/10]' are remainder functions such that they take the remainders of `y' divided by 10 and `1-y' divided by 10. `n=(Mod 5)' is a special modulated function such that if n>5 then `n' becomes `n-5' and if n<1 then `n' becomes `n+5'. Thus, the value range of `n=(Mod 5)' is from 1 to 5. `U0=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U0>10 then `U0' becomes `U0-10' and if U0<1 then `U0' becomes `U0+10'. Thus, the value range of `U0=(Mod 10)' is from 1 to 10. `Z0=(Mod 12)' is a modulated function such that if Z0>11 then `Z0' becomes `Z0-12' and if Z0<0 then `Z0' becomes `Z0+12'. Thus, the value range of `Z0=(Mod 12)' is from 0 to 11.If a person was born on 12th Aug., A.D.1986 and S=1, find the `Fortune Co-ordinates' of `Ziwei's Decade Fortune Origin'. Since the date of birth is after `Joint of Year' and `Joint of August' which is 8th Aug., A.D.1986, y=1986 and m=8. Apply `Ziwei's Decade Fortune Origin Formula' for people born in A.D.. U0=3+{S&C[S<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12) or Z0=S. U0=3+{1&C[1<2:+2]}+2x{R[1986/10] (Mod 5)} (Mod 10) & Z0=1. U0=3+{1+2}+2x{6 (Mod 5)} (Mod 10). U0=3+3+2x{6-5} (Mod 10). U0=6+2x1 (Mod 10). U0=8 (Mod 10). U0=8. The `Fortune Co-ordinates' of `Ziwei's Decade Fortune Origin' are (8,1). The `Big Fortune Code' is `38', `H1', `8B', `HB' or `SUN-CHO'. If a person was born on 1st Feb., A.D.1991 and S=2, find the `Fortune Co-ordinates' of `Ziwei's Decade Fortune Origin'. Since the date of birth is before `Joint of Year' and `Joint of February' which is 4th Feb., A.D.1991, y=1990 and m=1. Apply `Ziwei's Decade Fortune Origin Formula' for people born in A.D.. U0=3+{S&C[S<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12) or Z0=S. U0=3+{2&C[2<2:+2]}+2x{R[1990/10] (Mod 5)} (Mod 10) & Z0=2. U0=3+2+2x{0 (Mod 5)} (Mod 10). U0=5+2x0 (Mod 10). U0=5 (Mod 10). U0=5. The `Fortune Co-ordinates' of `Ziwei's Decade Fortune Origin' are (5,2). The `Big Fortune Code' is `15', `E2', `5C', `EC' or `MOO-YAN'. If a person was born on 12th Oct., A.D.1942 at 6:30 p.m., find the `Fortune Co-ordinates' of `Ziwei's Decade Fortune Origin'. Since the date of birth is after `Joint of Year' and `Joint of October' which is 9th Oct., A.D.1942, y=1942 and m=10. h=(12+6+30/60), h=18.5. Apply `Ziwei's Decade Fortune Origin Formula' for people born in A.D.. U0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)} (Mod 10) & Z0=m-A[h/2] (Mod 12). U0=3+{{10-A[(18+30/60)/2] (Mod 12)}&C[{10-A[(18+30/60)/2] (Mod 12)}<2:+2]}+2x{R[1942/10] (Mod 5)} (Mod 10) & Z0=10-A[(18+30/60)/2] (Mod 12). U0=3+{{10-A[18.5/2] (Mod 12)}&C[{10-A[18.5/2] (Mod 12)}<2:+2]}+2x{2 (Mod 5)} (Mod 10) & Z0=10-A[18.5/2] (Mod 12). U0=3+{{10-A[9.25] (Mod 12)}&C[{10-A[9.25] (Mod 12)}<2:+2]}+2x2 (Mod 10) & Z0=10-A[9.25] (Mod 12). U0=3+{{10-9 (Mod 12)}&C[{10-9 (Mod 12)}<2:+2]}+4 (Mod 10) & Z0=10-9 (Mod 12). U0=3+{{1 (Mod 12)}&C[{1 (Mod 12)}<2:+2]}+4 (Mod 10) & Z0=1 (Mod 12). U0=3+{1&C[1<2:+2]}+4 (Mod 10) & Z0=1. U0=3+{1+2}+4 (Mod 10). U0=3+3+4 (Mod 10). U0=10 (Mod 10). U0=10. The `Fortune Co-ordinates' of `Ziwei's Decade Fortune Origin' are (10,1). The `Big Fortune Code' is `50', `J1', `10B', `JB' or `QUI-CHO'.
Ziwei Doushu's Decade Fortune Formula: GC0The standard general form of `Ziwei Doushu's Decade Fortune Formula' for people born in `y' A.D. is: G0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). `Ziwei Doushu's Decade Fortune Formula' can be simplified as follows. For `Clockwise Revolution Mode' (RM=0): G0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10] (Mod 10) & C0={m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10] (Mod 12). For `Anti-clockwise Revolution Mode' (RM=1): G0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10] (Mod 10) & C0={m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10] (Mod 12). `y' is the year of birth in A.D. after `Joint of Year' in Gregorian calendar. Usually, `Joint of Year' is on 4th of February. `Joint of Year' is same as `Joint of February'. `m' is the month of birth after `Joint of Month'. Usually, `Joint of Month' is from 3rd to 8th of the month in Gregorian calendar. `h' is the time of birth reckoning on a 24-hour base. `J' is a conventional symbol to denote the day and time of `Joint of Month' before or after the date of birth such that `J1' is the day and time of `Joint of Month' before the date of birth and `J2' is the day and time of `Joint of Month' after the date of birth. The units of `J1' and `J2' are days. `d' is the day and time of birth. `J2-d' is the difference between the date and time of birth and the next `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `d-J1' is the difference between the date and time of birth and previous `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `a' is the age of the person in `Decade Bounds'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The `Time Interval' between two consecutive `Decade Fortune Co-ordinates' is 10 years. Hence, `n=10', where `n' is the time interval between two consecutive `Decade Fortune Co-ordinates' in years. If the position of `Decade Fortune Co-ordinates' is at (X,Y), then the `Decade Fortune Co-ordinates' are at (G0,C0) after `y' years. The simplified form of `Fortune Co-ordinates' Formula: G0=&C{RM=0:G0=X+I[y/n] (Mod 10), RM=1:G0=X-I[y/n] (Mod 10)} & C0=&C{RM=0:C0=Y+I[y/n] (Mod 12), RM=1:C0=Y-I[y/n] (Mod 12)}. It can be further simplified as follows. For `Clockwise Revolution Mode' (RM=0): G0=X+I[y/10] (Mod 10) & C0=Y+I[y/10] (Mod 12). For `Anti-clockwise Revolution Mode' (RM=1): G0=X-I[y/10] (Mod 10) & C0=Y-I[y/10] (Mod 12). The standard general form of `Ziwei Doushu's Decade Fortune Formula' for people born in `y' B.C. is: G0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}-2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}-2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). Note that the `Revolution Mode Formula' for people born in `y' B.C. is different from people born in `y' A.D.. The `Revolution Mode Formula' for people born in `y' B.C. is `RM=R[(&C[SC:m=0, f=1]+y-1)/2]'.`Ziwei Doushu's Decade Fortune Formula' is called `Ziwei's Decade Fortune Formula' in short. The origin of `Decade Fortune Co-ordinates' is at (UN0,ZN0), where `UN0' and `ZN0' are integers. The origin of `Decade Fortune' is the starting point of one's `Decade Fortune'. The `Decade Fortune' is revolving around in the space either clockwise or anti-clockwise. The `Decade Fortune' of human being is revolving either clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and the year of birth `y' in Gregorian calendar. For example, based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y)/2]' for people born in A.D. or based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y-1)/2]' for people born in B.C., if RM=0 it means that the `Revolution Mode' is clockwise. If RM=1 it means that the `Revolution Mode' is anti-clockwise. The `Fortune Co-ordinates' start to shift from the origin at (UN0,ZN0) to the next `Fortune Co-ordinates' on a 10-yearly base. The `Decade Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(G0,C0)' where `G0' and `C0' are integers. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `G0=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G0>10 then `G0' becomes `G0-10' and if G0<1 then `G0' becomes `G0+10'. Thus, the value range of `G0=(Mod 10)' is from 1 to 10. `C0=(Mod 12)' is a modulated function such that if C0>11 then `C0' becomes `C0-12' and if C0<0 then `C0' becomes `C0+12'. Thus, the value range of `C0=(Mod 12)' is from 0 to 11.Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962. Find the `Stem', `Root' and `Decade Fortune Code' (Big Fortune Code) of his `Decade Fortune' in A.D.2012. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:35 a.m. on 6th Jan., A.D.1962. So, J1=6+(3+35/60)/24 days in January. J1=6.1493055 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:18 p.m. on 4th Feb., A.D.1962. So, J2=4+(15+18/60)/24 days in February. J2=4.6375 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:18 p.m. on 4th Feb., A.D.1962, it is regarded as previous year. That is, y=1961. The age of the person in A.D.2012 is a=2012-1961. a=51. Since the birthday at 10:00 p.m. on 16th January of A.D.1962 is after `Joint of Month' which is at 3:18 p.m. on 6th January of A.D.1962, the month of birth m=1 and d=16+22/24 days in January. d=16.916666 days in January. The time of birth is h=22 reckoning on 24-hour base. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=[31-(16+22/24)]+[4+(15+18/60)/24] days. J2-d=[31-16.916666]+[4+0.6375] days. J2-d=14.083334+4.6375 days. J2-d=18.720834 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=[16+22/24]-[6+(3+35/60)/24] days. d-J1=16.916666-6.1493055 days. d-J1=10.767361 days. Apply the standard general form of `Ziwei's Decade Fortune Formula' for people born in A.D.. G0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). G0=&C{R[(0+1961)/2]=0:3+{{1-A[22/2] (Mod 12)}&C[{1-A[22/2] (Mod 12)}<2:+2]}+2x{R[1961/10] (Mod 5)}+I[(51-A[(18.720834)/3])/10], R[(0+1961)/2]=1:3+{{1-A[22/2] (Mod 12)}&C[{1-A[22/2] (Mod 12)}<2:+2]}+2x{R[1961/10] (Mod 5)}-I[(51-A[10.767361/3])/10]} (Mod 10) & C0=&C{R[(0+1961)/2]=0:{1-A[22/2] (Mod 12)}+I[(51-A[18.720834/3])/10], R[(0+1961)/2]=1:{1-A[22/2] (Mod 12)}-I[(51-A[10.767361/3])/10]} (Mod 12). G0=&C{R[1961/2]=0:3+{{1-A[11] (Mod 12)}&C[{1-A[11] (Mod 12)}<2:+2]}+2x{1 (Mod 5)}+I[(51-A[6.240278])/10], R[1961/2]=1:3+{{1-A[11] (Mod 12)}&C[{1-A[11] (Mod 12)}<2:+2]}+2x{1 (Mod 5)}-I[(51-A[3.5891203])/10]} (Mod 10) & C0=&C{R[1961/2]=0:{1-A[11] (Mod 12)}+I[(51-A[6.240278])/10], R[1961/2]=1:{1-A[11] (Mod 12)}-I[(51-A[3.5891203])/10]} (Mod 12). G0=&C{1=0:3+{{1-11 (Mod 12)}&C[{1-11 (Mod 12)}<2:+2]}+2x1+I[(51-6)/10], 1=1:3+{{1-11 (Mod 12)}&C[{1-11 (Mod 12)}<2:+2]}+2x1-I[(51-4)/10]} (Mod 10) & C0=&C{1=0:{1-11 (Mod 12)}+I[(51-6)/10], 1=1:{1-11 (Mod 12)}-I[(51-4)/10]} (Mod 12). G0=&C{1=0:3+{{-10 (Mod 12)}&C[{-10 (Mod 12)}<2:+2]}+2+I[45/10], 1=1:3+{{-10 (Mod 12)}&C[{-10 (Mod 12)}<2:+2]}+2-I[47/10]} (Mod 10) & C0=&C{1=0:{-10 (Mod 12)}+I[45/10], 1=1:{-10 (Mod 12)}-I[47/10]} (Mod 12). G0=&C{1=0:3+{{12-10}&C[{12-10}<2:+2]}+2+I[4.5], 1=1:3+{{12-10}&C[{12-10}<2:+2]}+2-I[4.7]} (Mod 10) & C0=&C{1=0:{12-10}+I[4.5], 1=1:{12-10}-I[4.7]} (Mod 12). G0=&C{1=0:3+{2&C[2<2:+2]}+2+4, 1=1:3+{2&C[2<2:+2]}+2-4} (Mod 10) & C0=&C{1=0:2+4, 1=1:2-4} (Mod 12). G0=&C{1=0:3+2+2+4, 1=1:3+2+2-4} (Mod 10) & C0=&C{1=0:6, 1=1:-2} (Mod 12). G0=&C{1=0:11, 1=1:3} (Mod 10) & C0=&C{1=0:6, 1=1:12-2} (Mod 12). G0=&C{1=0:11, 1=1:3} (Mod 10) & C0=&C{1=0:6, 1=1:10} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, G0=3 (Mod 10) & C0=10 (Mod 12). G0=3 & C0=10. `G0=3' stands for the `Stem' (G0) of the `Decade Fortune' of the client in A.D.2012 is `C' because `C' is the 3rd alphabet. The `Root' (C0) of `Decade Fortune' is 10. So, the `Decade Fortune Co-ordinates' are (3,10). The `Big Fortune Code' is `23', `C10', `3K', `CK' or `BIM-SHT'. An alternative method is to find the `Revolution Mode' (RM) of the `Decade Fortune' first. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(0+1961)/2]. RM=R[1961/2]. RM=1. The `Revolution Mode' of the `Decade Fortune' is anti-clockwise. Then, apply the simplified form of `Ziwei's Decade Fortune Formula' for people born in A.D. for anti-clockwise `Revolution Mode' (RM=1). G0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10] (Mod 10) & C0={m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10] (Mod 12). G0=3+{{1-A[22/2] (Mod 12)}&C[{1-A[22/2] (Mod 12)}<2:+2]}+2x{R[1961/10] (Mod 5)}-I[(51-A[(16.916666-6.1493055)/3])/10] (Mod 10) & C0={1-A[22/2] (Mod 12)}-I[(51-A[(16.916666-6.1493055)/3])/10] (Mod 12). G0=3+{{1-A[11] (Mod 12)}&C[{1-A[11] (Mod 12)}<2:+2]}+2x{1 (Mod 5)}-I[(51-A[(10.767361)/3])/10] (Mod 10) & C0={1-A[11] (Mod 12)}-I[(51-A[10.767361/3])/10] (Mod 12). G0=3+{{1-11 (Mod 12)}&C[{1-11 (Mod 12)}<2:+2]}+2x1-I[(51-A[3.5891203])/10] (Mod 10) & C0={1-11 (Mod 12)}-I[(51-A[3.5891203])/10] (Mod 12). G0=3+{{-10 (Mod 12)}&C[{-10 (Mod 12)}<2:+2]}+2-I[(51-4)/10] (Mod 10) & C0={-10 (Mod 12)}-I[(51-4)/10] (Mod 12). G0=3+{{12-10}&C[{12-10}<2:+2]}+2-I[47/10] (Mod 10) & C0={12-10}-I[47/10] (Mod 12). G0=3+{2&C[2<2:+2]}+2-I[4.7] (Mod 10) & C0=2-I[4.7] (Mod 12). G0=3+2+2-4 (Mod 10) & C0=2-4 (Mod 12). G0=3 (Mod 10) & C0=-2 (Mod 12). G0=3 & C0=12-2. C0=10. The `Stem' of the `Decade Fortune' of the client in A.D.2012 is `C' because `C' is the 3rd alphabet and the `Root' is 10. So, the `Decade Fortune Code' (Big Fortune Code) is `C10'. Assume a female was born at 12:23 p.m. on 4th February of A.D.1925. Find the `Stem', `Root' and `Decade Fortune Code' (Big Fortune Code) of her `Decade Fortune' in A.D.1997. From the given data, we know that the `Sex Code' (SC) is `f' and f=1. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:54 a.m. on 6th Jan., A.D.1925. So, J1=6+(3+54/60)/24 days in January. J1=6.1625 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:37 p.m. on 4th Feb., A.D.1925. So, J2=4+(15+37/60)/24 days in February. J2=4.6506944 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:37 p.m. on 4th Feb., A.D.1925, it is regarded as previous year. That is, y=1924. The age of the person in A.D.1997 is a=1997-1924. a=73. Since the birthday at 12:23 p.m. on 4th February of A.D.1925 is before `Joint of Month' which is at 3:37 p.m. on 4th February of A.D.1925, the month of birth m=1. Since the time of birth is at 12:23 p.m. on 4th February of A.D.1925, d=4+(12+23/60)/24 days in February. d=4.5159722 days in February. The time of birth is h=12+23/60. h=12.3833333. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=4.6506944-4.5159722 days. J2-d=0.1347222 day. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=4.5159722+(31-6.1625) days. d-J1=4.5159722+24.8375 days. d-J1=29.353472 days. Apply the standard general form of `Ziwei's Decade Fortune Formula' for people born in A.D.. G0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10]} (Mod 10) & C0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10], R[(&C[SC:m=0, f=1]+y)/2]=1:{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12). G0=&C{R[(1+1924)/2]=0:3+{{1-A[12.3833333/2] (Mod 12)}&C[{1-A[12.3833333/2] (Mod 12)}<2:+2]}+2x{R[1924/10] (Mod 5)}+I[(73-A[(4.6506944-4.5159722)/3])/10], R[(1+1924)/2]=1:3+{{1-A[12.3833333/2] (Mod 12)}&C[{1-A[12.3833333/2] (Mod 12)}<2:+2]}+2x{R[1924/10] (Mod 5)}-I[(73-A[(4.5159722+24.8375)/3])/10]} (Mod 10) & C0=&C{R[(1+1924)/2]=0:{1-A[12.3833333/2] (Mod 12)}+I[(73-A[(4.6506944-4.5159722)/3])/10], R[(1+1924)/2]=1:{1-A[12.3833333/2] (Mod 12)}-I[(73-A[(4.5159722+24.8375)/3])/10]} (Mod 12). G0=&C{R[1925/2]=0:3+{{1-A[6.1916665] (Mod 12)}&C[{1-A[6.1916665] (Mod 12)}<2:+2]}+2x{4 (Mod 5)}+I[(73-A[0.1347222/3])/10], R[1925/2]=1:3+{{1-A[6.1916665] (Mod 12)}&C[{1-A[6.1916665] (Mod 12)}<2:+2]}+2x{4 (Mod 5)}-I[(73-A[29.353472/3])/10]} (Mod 10) & C0=&C{R[1925/2]=0:{1-A[6.1916665] (Mod 12)}+I[(73-A[0.1347222/3])/10], R[1925/2]=1:{1-A[6.1916665] (Mod 12)}-I[(73-A[29.353472/3])/10]} (Mod 12). G0=&C{1=0:3+{{1-6 (Mod 12)}&C[{1-6 (Mod 12)}<2:+2]}+2x{4 (Mod 5)}+I[(73-A[0.0449074])/10], 1=1:3+{{1-6 (Mod 12)}&C[{1-6 (Mod 12)}<2:+2]}+2x{4 (Mod 5)}-I[(73-A[9.7844906])/10]} (Mod 10) & C0=&C{1=0:{1-6 (Mod 12)}+I[(73-A[0.0449074])/10], 1=1:{1-6 (Mod 12)}-I[(73-A[9.7844906])/10]} (Mod 12). G0=&C{1=0:3+{{-5 (Mod 12)}&C[{-5 (Mod 12)}<2:+2]}+2x4+I[(73-0)/10], 1=1:3+{{-5 (Mod 12)}&C[{-5 (Mod 12)}<2:+2]}+2x4-I[(73-10)/10]} (Mod 10) & C0=&C{1=0:{-5 (Mod 12)}+I[(73-0)/10], 1=1:{-5 (Mod 12)}-I[(73-10)/10]} (Mod 12). G0=&C{1=0:3+{{12-5}&C[{12-5}<2:+2]}+8+I[73/10], 1=1:3+{{12-5}&C[{12-5}<2:+2]}+8-I[63/10]} (Mod 10) & C0=&C{1=0:{12-5}+I[73/10], 1=1:{12-5}-I[63/10]} (Mod 12). G0=&C{1=0:3+{7&C[7<2:+2]}+8+I[7.3], 1=1:3+{7&C[7<2:+2]}+8-I[6.3]} (Mod 10) & C0=&C{1=0:7+I[7.3], 1=1:7-I[6.3]} (Mod 12). G0=&C{1=0:3+7+8+7, 1=1:3+7+8-6} (Mod 10) & C0=&C{1=0:7+7, 1=1:7-6} (Mod 12). G0=&C{1=0:25, 1=1:12} (Mod 10) & C0=&C{1=0:14, 1=1:1} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, G0=12 (Mod 10) & C0=1 (Mod 12). G0=12-10 & C0=1. G0=2. `G0=2' stands for the `Stem' (G0) of the `Decade Fortune' of the client in A.D.1997 is `B' because `B' is the 2nd alphabet. The `Root' (C0) of `Decade Fortune' is 1. So, the `Decade Fortune Co-ordinates' are (2,1). The `Big Fortune Code' is `02', `B1', `2B', `BB' or `EUT-CHO'. An alternative method is to find the `Revolution Mode' (RM) of the `Decade Fortune' first. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(1+1924)/2]. RM=R[1925/2]. RM=1. The `Revolution Mode' of the `Decade Fortune' is anti-clockwise. Then, apply the simplified form of `Ziwei's Decade Fortune Formula' for people born in A.D. for anti-clockwise `Revolution Mode' (RM=1). G0=3+{{m-A[h/2] (Mod 12)}&C[{m-A[h/2] (Mod 12)}<2:+2]}+2x{R[y/10] (Mod 5)}-I[(a-A[(d-J1)/3])/10] (Mod 10) & C0={m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10] (Mod 12). G0=3+{{1-A[12.3833333/2] (Mod 12)}&C[{1-A[12.3833333/2] (Mod 12)}<2:+2]}+2x{R[1924/10] (Mod 5)}-I[(73-A[(4.5159722+24.8375)/3])/10] (Mod 10) & C0={1-A[12.3833333/2] (Mod 12)}-I[(73-A[(4.5159722+24.8375)/3])/10] (Mod 12). G0=3+{{1-A[6.1916665] (Mod 12)}&C[{1-A[6.1916665] (Mod 12)}<2:+2]}+2x{4 (Mod 5)}-I[(73-A[29.353472/3])/10] (Mod 10) & C0={1-A[6.1916665] (Mod 12)}-I[(73-A[29.353472/3])/10] (Mod 12). G0=3+{{1-6 (Mod 12)}&C[{1-6 (Mod 12)}<2:+2]}+2x4-I[(73-10)/10] (Mod 10) & C0={1-6 (Mod 12)}-I[(73-10)/10] (Mod 12). G0=3+{{-5 (Mod 12)}&C[{-5 (Mod 12)}<2:+2]}+8-I[63/10] (Mod 10) & C0={-5 (Mod 12)}-I[63/10] (Mod 12). G0=3+{{12-5}&C[{12-5}<2:+2]}+8-I[6.3] (Mod 10) & C0={12-5}-I[6.3] (Mod 12). G0=3+{7&C[7<2:+2]}+8-6 (Mod 10) & C0=7-6 (Mod 12). G0=3+7+8-6 (Mod 10) & C0=1 (Mod 12). G0=12 (Mod 10) & C0=1. G0=12-10. G0=2. The `Stem' of the `Decade Fortune' of the client in A.D.1997 is `B' because `B' is the 2nd alphabet and the `Root' is 1. So, the `Decade Fortune Code' (Big Fortune Code) is `B1'. Assume the present `Decade Fortune Co-ordinates' (X,Y) are (2,9) and the `Revolution Mode' is clockwise (i.e. RM=0). Find the `Decade Fortune Co-ordinates' (G0,C0) of 16 years later (i.e. y=16). Apply the simplified Decade Fortune Formula. G0=X+I[y/10] (Mod 10) & C0=Y+I[y/10] (Mod 12). The values of `G0' and `C0' of the new `Decade Fortune Co-ordinates' (G0,C0) after `y' years are: G0=2+I[16/10] (Mod 10) & C0=9+I[16/10] (Mod 12). G0=2+I[1.6] (Mod 10) & C0=9+I[1.6] (Mod 12). G0=2+1 (Mod 10) & C0=9+1 (Mod 12). G0=3 (Mod 10) & C0=10 (Mod 12). G0=3 & C0=10. Hence, after counting 16 years clockwise, the `Decade Fortune' will move from `Co-ordinates' (2,9) with a value of the `Sequence Code of Decade Fortune Co-ordinates' of `22' to `Co-ordinates' (3,10) with a new value of the `Sequence Code of Decade Fortune Co-ordinates' of `23'. Thus, the value of the `Sequence Code of Decade Fortune Co-ordinates' is changed from `22' to `23'. Assume the present `Decade Fortune Co-ordinates' (X,Y) are (8,1) and the `Revolution Mode' is anti-clockwise (i.e. RM=1). Find the `Decade Fortune Co-ordinates' (G0,C0) of 42 years later (i.e. y=42). Apply the simplified Decade Fortune Formula. G0=X-I[y/10] (Mod 10) & C0=Y-I[y/10] (Mod 12). The values of `G0' and `C0' of the new `Decade Fortune Co-ordinates' (G0,C0) after `y' years are: G0=8-I[42/10] (Mod 10) & C0=1-I[42/10] (Mod 12). G0=8-I[4.2] (Mod 10) & C0=1-I[4.2] (Mod 12). G0=8-4 (Mod 10) & C0=1-4 (Mod 12). G0=4 (Mod 10) & C0=-3 (Mod 12). G0=4 & C0=12-3. C0=9. Hence, after counting 42 years anti-clockwise, the `Decade Fortune' will move from `Co-ordinates' (8,1) with a value of the `Sequence Code of Decade Fortune Co-ordinates' of `38' to `Co-ordinates' (4,9) with a new value of the `Sequence Code of Decade Fortune Co-ordinates' of `34'. Thus, the value of the `Sequence Code of Decade Fortune Co-ordinates' is changed from `38' to `34'.
Ziwei Doushu's Decade Bounds Formula: BOUNDS0The standard general form of `Ziwei Doushu's Decade Bounds Formula' for people born in `y' A.D. is: S0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10]} (Mod 12), R[(&C[SC:m=0, f=1]+y)/2]=1:{{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12)}. The standard general form of `Ziwei Doushu's Decade Bounds Formula' for people born in `y' B.C. is: S0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10]} (Mod 12), R[(&C[SC:m=0, f=1]+y-1)/2]=1:{{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12)}. `y' is the year of birth after `Joint of Year' in Gregorian calendar. Usually, `Joint of Year' is on 4th of February. `Joint of Year' is same as `Joint of February'. `m' is the month of birth after `Joint of Month'. Usually, `Joint of Month' is from 3rd to 8th of the month. `h' is the time of birth reckoning on a 24-hour base. `J' is a conventional symbol to denote the day and time of `Joint of Month' before or after the date of birth such that `J1' is the day and time of `Joint of Month' before the date of birth and `J2' is the day and time of `Joint of Month' after the date of birth. The units of `J1' and `J2' are days. `d' is the day and time of birth. The unit of `d' is in day. `J2-d' is the difference between the date and time of birth and the next `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `d-J1' is the difference between the date and time of birth and previous `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `a' is the age of the person in `Decade Bounds'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The `Ziwei Doushu's Decade Bounds' moves consecutively either clockwise or anti-clockwise along the zones every ten years. Thus, the time interval of `Decade Bounds' is 10 years. If we let the zone of `Soul' be `S', the zone of `Decade Bounds' at age `a' be `S0', the minimum age of `Decade Fortune' be 'e', then for people born in A.D. is: e=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:A[(d-J1)/3]}. For people born in B.C. is: e=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y-1)/2]=1:A[(d-J1)/3]}. If the value of `J' is unknown, let J=6 for approximate calculation. The maximum deviation in age for approximate calculation is 1. If the birthday is between 3rd to 8th, approximate calculation cannot be used. The calculation must use precise value of `J'. If one's age is less than the minimum age of `Decade Fortune', i.e. `a' is less than `e', one is not qualified to have a `Decade Fortune'. So, one has no `Decade Bounds' at that moment. The simplified form of `Ziwei's Decade Bounds Formula' for people born in `y' A.D. is: If a>e or a=e, S0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:S+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y)/2]=1:S-I[(a-e)/10]} (Mod 12). The simplified form of `Ziwei's Decade Bounds Formula' for people born in `y' B.C. is: If a>e or a=e, S0=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:S+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y-1)/2]=1:S-I[(a-e)/10]} (Mod 12).`Ziwei Doushu's Decade Bounds' is called `Ziwei's Decade Bounds' in short. `Decade Bounds' is also named as `Large Bounds'. `Decade Bounds' is the focus of `Decade Fortune' because it shows the decade fortune in a zone of a person. The first `Decade Bounds' is called the `Initial Decade Bounds'. The first `Ziwei's Decade Bounds' is the same as the zone of `Soul', `S'. That is, the value of the first `Ziwei's Decade Bounds' is equal to `S'. The `Ziwei's Decade Bounds' moves consecutively either clockwise or anti-clockwise according to the `Revolution Mode' (RM) along the zones every ten years. There are altogether twelve zones. The zones recur from 0 to 11. They are integers and usually assigned to variable `X'. The `Revolution Mode' (RM) of `Decade Bounds' is a mathematical expression that can show the revolving direction of `Decade Bounds' in its `Fortune Track' (FT). There are altogether two different types of `Revolution Modes', namely `Clockwise Revolution Mode' (CRM) and `Anti-clockwise Revolution Mode' (ARM). The `Decade Bounds' of human being is revolving either clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and the year of birth `y' in Gregorian calendar. For example, based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y)/2]' for people born in A.D. or based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y-1)/2]' for people born in B.C., if RM=0 it means that the `Revolution Mode' is clockwise. If RM=1 it means that the `Revolution Mode' is anti-clockwise. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `S0=(Mod 12)' is a modulated function such that if S0>11 then `S0' becomes `S0-12' and if S0<0 then `S0' becomes `S0+12'. Thus, the value range of `S0=(Mod 12)' is from 0 to 11.Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962. Find the zone of `Ziwei's Decade Bounds' (S0) in A.D.2012. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:35 a.m. on 6th Jan., A.D.1962. So, J1=6+(3+35/60)/24 days in January. J1=6.1493055 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:18 p.m. on 4th Feb., A.D.1962. So, J2=4+(15+18/60)/24 days in February. J2=4.6375 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:18 p.m. on 4th Feb., A.D.1962, it is regarded as previous year. That is, y=1961. The age of the person in A.D.2012 is a=2012-1961. a=51. Since the birthday at 10:00 p.m. on 16th January of A.D.1962 is after `Joint of Month' which is at 3:18 p.m. on 6th January of A.D.1962, the month of birth m=1 and d=16+22/24 days in January. d=16.916666 days in January. The time of birth is h=22 reckoning on 24-hour base. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=[31-(16+22/24)]+[4+(15+18/60)/24] days. J2-d=[31-16.916666]+[4+0.6375] days. J2-d=14.083334+4.6375 days. J2-d=18.720834 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=[16+22/24]-[6+(3+35/60)/24] days. d-J1=16.916666-6.1493055 days. d-J1=10.767361 days. Apply the standard general form of `Ziwei's Decade Bounds Formula' for people born in A.D.. S0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{{m-A[h/2] (Mod 12)}+I[(a-A[(J2-d)/3])/10]} (Mod 12), R[(&C[SC:m=0, f=1]+y)/2]=1:{{m-A[h/2] (Mod 12)}-I[(a-A[(d-J1)/3])/10]} (Mod 12)}. The zone of `Ziwei's Decade Bounds' is S0=&C{R[(0+1961)/2]=0:{{1-A[22/2] (Mod 12)}+I[(51-A[(14.083334+4.6375)/3])/10]} (Mod 12), R[(0+1961)/2]=1:{{1-A[22/2] (Mod 12)}-I[(51-A[(16.9166-6.1493)/3])/10]} (Mod 12)}. S0=&C{R[1961/2]=0:{{1-A[11] (Mod 12)}+I[(51-A[18.720834/3])/10]} (Mod 12), R[1961/2]=1:{{1-A[11] (Mod 12)}-I[(51-A[10.7673/3])/10]} (Mod 12)}. S0=&C{1=0:{{1-11 (Mod 12)}+I[(51-A[6.240278])/10]} (Mod 12), 1=1:{{1-11 (Mod 12)}-I[(51-A[3.5891])/10]} (Mod 12)}. S0=&C{1=0:{{-10 (Mod 12)}+I[(51-6)/10]} (Mod 12), 1=1:{{-10 (Mod 12)}-I[(51-4)/10]} (Mod 12)}. S0=&C{1=0:{{12-10}+I[45/10]} (Mod 12), 1=1:{{12-10}-I[47/10]} (Mod 12)}. S0=&C{1=0:{2+I[4.5]} (Mod 12), 1=1:{2-I[4.7]} (Mod 12)}. S0=&C{1=0:{2+4} (Mod 12), 1=1:{2-4} (Mod 12)}. S0=&C{1=0:6 (Mod 12), 1=1:-2 (Mod 12)}. S0=&C{1=0:6, 1=1:12-2}. S0=&C{1=0:6, 1=1:10}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, S0=10. Assume a male was born at 10:35 a.m. on 27th Sept., A.D.1952 and the zone of `Soul' S=4. Find the zone of `Ziwei's Decade Bounds' (S0) in A.D.2007. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of September' which is at 1:14 a.m. on 8th Sept., A.D.1952. So, J1=8+(1+14/60)/24 days in September. J1=8.0513888 days in September. `Joint of Month' after the date of birth is `Joint of October' which is at 4:33 p.m. on 8th Oct., A.D.1952. So, J2=8+(16+33/60)/24 days in October. J2=8.6895833 days in October. Since the birthday is after `Joint of Year' which is at 4:54 a.m. on 5th Feb., A.D.1952, y=1952. The age of the person in A.D.2007 is a=2007-1952. a=55. Since the birthday at 10:35 a.m. on 27th Sept., A.D.1952 is after `Joint of Month' which is at 1:14 a.m. on 8th Sept., A.D.1952, the month of birth m=9 and d=27+(10+35/60)/24 days in September. d=27.440972 days in September. The time of birth reckoning on 24-hour base is h=10+35/60. h=10.5833333. `J2-d' is the day and time difference between `Joint of October' and the date and time of birth. J2-d=8+(16+33/60)/24+{30-[27+(10+35/60)/24]} days. J2-d=8.6895833+{30-27.440972} days. J2-d=11.248611 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of September'. d-J1=27+(10+35/60)/24-[8+(1+14/60)/24] days. d-J1=27.440972-8.0513888 days. d-J1=19.389584 days. The minimum age of `Ziwei's Decade Fortune' for people born in A.D. is e=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:A[(d-J1)/3]}. e=&C{R[(0+1952)/2]=0:A[11.248611/3], R[(0+1952)/2]=1:A[19.389584/3]}. e=&C{0=0:A[3.749537], 0=1:A[6.4631946]}. e=&C{0=0:4, 0=1:6}. Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, e=4. That is a>e. Apply the `Ziwei's Decade Bounds Formula' for people born in A.D.. If a>e or a=e, S0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:S+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y)/2]=1:S-I[(a-e)/10]} (Mod 12). The zone of `Ziwei's Decade Bounds' is S0=&C{R[(0+1952)/2]=0:4+I[(55-4)/10], R[(0+1952)/2]=1:4-I[(55-4)/10]} (Mod 12). S0=&C{R[1952/2]=0:4+I[51/10], R[1952/2]=1:4-I[51/10]} (Mod 12). S0=&C{0=0:4+I[5.1], 0=1:4-I[5.1]} (Mod 12). S0=&C{0=0:4+5, 0=1:4-5} (Mod 12). S0=&C{0=0:9, 0=1:-1} (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, S0=9 (Mod 12). S0=9. Assume a female was born at 12:23 p.m. on 20th Apr., A.D.1926 and the zone of `Soul' S=10. Find the zone of `Ziwei's Decade Bounds' (S0) in A.D.1997. From the given data, we know that the `Sex Code' (SC) is `f' and f=1. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of April' which is at 9:19 p.m. on 5th Apr., A.D.1926. So, J1=5+(21+19/60)/24] days in April. J1=5.8881944 days in April. `Joint of Month' after the date of birth is `Joint of May' which is at 3:09 p.m. on 6th May, A.D.1926. So, J2=6+(15+9/60)/24 days in May. J2=6.63125 days in May. Since the birthday is after `Joint of Year' which is at 9:39 p.m. on 4th Feb., A.D.1926, `Year of Birth' y=1926. The age of the person in A.D.1997 is a=1997-1926. a=71. Since the birthday at 12:23 p.m. on 20th Apr., A.D.1926 is after `Joint of Month' which is at 9:19 p.m. on 5th Apr., A.D.1926, the month of birth m=4 and d=20+(12+23/60)/24 days in April. d=20.515972 days in April. The time of birth reckoning on 24-hour base is h=12+23/60. h=12.383333 . `J2-d' is the day and time difference between `Joint of May' and the date and time of birth. J2-d=6+(15+9/60)/24+{30-[20+(12+23/60)/24]}. J2-d=6.63125+{30-20.515972}. J2-d=16.115278. `d-J1' is the day and time difference between the date and time of birth and `Joint of April'. d-J1=20+(12+23/60)/24-[5+(21+19/60)/24] days. d-J1=20.515972-5.8881944 days. d-J1=14.627778 days. The minimum age of `Decade Fortune' for people born in A.D. is e=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:A[(d-J1)/3]}. e=&C{R[(1+1926)/2]=0:A[16.115278/3], R[(1+1926)/2]=1:A[14.627778/3]}. e=&C{R[1927/2]=0:A[5.3717593], R[(1927/2]=1:A[4.875926]}. e=&C{1=0:5, 1=1:5}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, e=5. That is, a>e. Apply the `Ziwei's Decade Bounds Formula' for people born in A.D.. If a>e or a=e, S0=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:S+I[(a-e)/10], R[(&C[SC:m=0, f=1]+y)/2]=1:S-I[(a-e)/10]} (Mod 12). The zone of `Ziwei's Decade Bounds' is S0=&C{R[(1+1926)/2]=0:10+I[(71-5)/10], R[(1+1926)/2]=1:10-I[(71-5)/10]} (Mod 12). S0=&C{R[1927/2]=0:10+I[66/10], R[1927/2]=1:10-I[66/10]} (Mod 12). S0=&C{1=0:10+I[6.6], 1=1:10-I[6.6]} (Mod 12). S0=&C{1=0:10+6, 1=1:10-6} (Mod 12). S0=&C{1=0:16, 1=1:4} (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, S0=4 (Mod 12). S0=4.
Ziwei Doushu's Decade Bounds Age Formula: AG`Ziwei's Decade Bounds' revolves consecutively along the zones either clockwise or anti-clockwise for every ten years. Thus, the time interval of `Decade Bounds' is 10 years. In `PT&FM', the beginning of a year is not on 1st of January in Gregorian calendar. The beginning of a year is `Joint of February'. The critical value between two consecutive years is called `Joint of Year'. `Joint of February' is the boundary of two consecutive years. It always lies on from the 3rd to 5th day of February. In general, not for precise calculations, `Joint of February' can be regarded as the 4th day of February. If the date of birth is within the 3rd to 5th day of February, precise calculations should be carried out. That is, if the time of the date of birth is after `Joint of February', the year is `y'. If the time of the date of birth is before `Joint of February', the year is `y-1'. The time and date of `Joint of February' between two consecutive years in Gregorian calendar always change from year to year. `Joint of February' also varies according to the longitude and latitude of a place. The exact date and time of `Joint of February' of a year can be found in a Chinese lunar calendar. Let the zone of `Soul' be `S'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The year of birth is `y'. The date and time of birth reckoning in Gregorian calendar is `d' and the unit of `d' is day. The zone of `Decade Bounds' is `S0'. `AG' is the minimum age of `Decade Bounds'. `AG' is called the `Lower Bound Age' of the `Decade Bounds'. The `Upper Bound Age' is equal to `AG+9' because the time interval of `Decade Bounds' is 10 years. `J' is a conventional symbol to denote the day and time of `Joint of Month' before or after the date of birth such that `J1' is the day and time of `Joint of Month' before the date of birth and `J2' is the day and time of `Joint of Month' after the date of birth. The units of `J1' and `J2' are days. `J2-d' is the difference between the date and time of birth and the next `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. `d-J1' is the difference between the date and time of birth and previous `Joint of Month' in Gregorian calendar. The difference should be corrected to the nearest day. The `Ziwei's Decade Bounds Age Formula' for people born in A.D. is: AG=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{S0-S (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{S-S0 (Mod 12)}x10+A[(d-J1)/3]}. The `Ziwei's Decade Bounds Age Formula' for people born in B.C. is: AG=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{S0-S (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y-1)/2]=1:{S-S0 (Mod 12)}x10+A[(d-J1)/3]}. The `Ziwei's Decade Bounds Age Formula' can be simplified as follows. For `Clockwise Revolution Mode' (RM=0): AG={S0-S (Mod 12)}x10+A[(J2-d)/3]. For `Anti-clockwise Revolution Mode' (RM=1): AG={S-S0 (Mod 12)}x10+A[(d-J1)/3].`Ziwei Doushu's Decade Bounds' is called `Ziwei's Decade Bounds' in short. `Decade Bounds' is also named as `Large Bounds'. `Decade Bounds' is the focus of `Decade Fortune' because it shows the decade fortune in a zone of a person. The first `Decade Bounds' is called the `Initial Decade Bounds'. The first `Ziwei's Decade Bounds' is the same as the zone of `Soul', `S'. That is, the value of the first `Ziwei's Decade Bounds' is equal to `S'. `Ziwei's Decade Bounds' moves consecutively either clockwise or anti-clockwise according to the `Revolution Mode' (RM) along the zones every ten years. There are altogether twelve zones. The zones recur from 0 to 11. They are integers and usually assigned to variable `X'. The `Revolution Mode' (RM) of `Decade Bounds' is a mathematical expression that can show the revolving direction of `Decade Bounds' in its `Fortune Track' (FT). There are altogether two different types of `Revolution Modes', namely `Clockwise Revolution Mode' (CRM) and `Anti-clockwise Revolution Mode' (ARM). The `Decade Bounds' of human being is revolving either clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and the year of birth `y' in Gregorian calendar. For example, based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y)/2]' for people born in A.D. or based on the calculation of Revolution Mode Formula `RM=R[(&C[SC:m=0, f=1]+y-1)/2]' for people born in B.C., if RM=0 it means that the `Revolution Mode' is clockwise. If RM=1 it means that the `Revolution Mode' is anti-clockwise. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `AG=(Mod 12)' is a modulated function such that if AG>11 then `AG' becomes `AG-12' and if AG<0 then `AG' becomes `AG+12'. Thus, the value range of `AG=(Mod 12)' is from 0 to 11.Assume a male was born at 0:45 a.m. on 6th Oct., A.D.1952 and the zone of `Soul' S=9. Find the minimum age (AG) when the zone of `Decade Bounds' (S0) is 4. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of September' which is at 1:14 a.m. on 8th Sept., A.D.1952. So, J1=8+(1+14/60)/24 days in September. J1=8.0513888 days in September. `Joint of Month' after the date of birth is `Joint of October' which is at 4:33 p.m. on 8th Oct., A.D.1952. So, J2=8+(16+33/60)/24 days in October. J2=8.6895833 days in October. Since the birthday is after `Joint of Year' which is at 4:54 a.m. on 5th Feb., A.D.1952, y=1952. Since the time of birth is at 0:45 a.m. on 6th Oct., A.D.1952, d=6+45/60/24 days in October. d=6.03125 days in October. `J2-d' is the day and time difference between `Joint of October' and the date and time of birth. J2-d=8.6895833-6.03125 days. J2-d=2.6583333 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of September'. d-J1=6.03125+(30-8.0513888) days. d-J1=6.03125+21.948612 days. d-J1=27.979862 days. The zone of `Decade Bounds' S0=4 and the zone of `Soul' S=9. Apply the `Ziwei's Decade Bounds Age Formula' for people born in A.D.. AG=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{S0-S (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{S-S0 (Mod 12)}x10+A[(d-J1)/3]}. AG=&C{R[(0+1952)/2]=0:{4-9 (Mod 12)}x10+A[2.6583333/3], R[(0+1952)/2]=1:{9-4 (Mod 12)}x10+A[27.979862/3]}. AG=&C{R[1952/2]=0:{-5 (Mod 12)}x10+A[0.8861111], R[1952/2]=1:{5 (Mod 12)}x10+A[9.3266206]}. AG=&C{0=0:{12-5}x10+1, 0=1:5x10+9}. AG=&C{0=0:7x10+1, 0=1:50+9}. AG=&C{0=0:71, 0=1:59}. Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, AG=71. Hence, the minimum age of the client is 71 when the zone of `Decade Bounds' is 4 and it ends till an age of 80. Assume a female was born at 12:23 p.m. on 4th Feb., A.D.1925 and the zone of `Soul' S=7. Find the minimum age (AG) when the zone of `Decade Bounds' (S0) is 2. From the given data, we know that the `Sex Code' (SC) is `f' and f=1. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:54 a.m. on 6th Jan., A.D.1925. So, J1=6+(3+54/60)/24 days in January. J1=6.1625 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:37 p.m. on 4th Feb., A.D.1925. So, J2=4+(15+37/60)/24 days in February. J2=4.6506944 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:37 p.m. on 4th Feb., A.D.1925, it is regarded as previous year. That is, y=1924. Since the time of birth is at 12:23 p.m. on 4th Feb., A.D.1925, d=4+(12+23/60)/24 days in February. d=4.5159722 days in February. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=4.6506944-4.5159722 days. J2-d=0.1347222 day. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=4.5159722+(31-6.1625) days. d-J1=4.5159722+24.8375 days. d-J1=29.353472 days. The zone of `Decade Bounds' is S0=2 and the zone of `Soul' is S=7. Apply the `Ziwei's Decade Bounds Age Formula' for people born in A.D.. AG=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{S0-S (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{S-S0 (Mod 12)}x10+A[(d-J1)/3]}. AG=&C{R[(1+1924)/2]=0:{2-7 (Mod 12)}x10+A[0.1347222/3], R[(1+1924)/2]=1:{7-2 (Mod 12)}x10+A[29.353472/3]}. AG=&C{R[1925/2]=0:{-5 (Mod 12)}x10+A[0.0449074], R[1925/2]=1:{5 (Mod 12)}x10+A[9.7844906]}. AG=&C{1=0:{12-5}x10+0, 1=1:5x10+10}. AG=&C{1=0:7x10, 1=1:50+10}. AG=&C{1=0:70, 1=1:60}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, AG=60. Hence, the minimum age of the client is 60 when the zone of `Decade Bounds' is 2 and it ends till an age of 69. Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962 and the zone of `Soul' S=2. Find the minimum age (AG) when the zone of `Decade Bounds' (S0) is 10. From the given data, we know that the `Sex Code' (SC) is `m' and m=0. From Chinese lunar calendar, we know that `Joint of Month' before the date of birth is `Joint of January' which is at 3:35 a.m. on 6th Jan., A.D.1962. So, J1=6+(3+35/60)/24 days in January. J1=6.1493055 days in January. `Joint of Month' after the date of birth is `Joint of February' which is at 3:18 p.m. on 4th Feb., A.D.1962. So, J2=4+(15+18/60)/24 days in February. J2=4.6375 days in February. `Joint of February' is also `Joint of Year'. Since the birthday is before `Joint of Year' which is at 3:18 p.m. on 4th Feb., A.D.1962, it is regarded as previous year. That is, y=1961. Since the time of birth is at 10:00 p.m. on 16th Jan., A.D.1962, d=16+22/24 days in January. d=16.916666 days in January. `J2-d' is the day and time difference between `Joint of February' and the date and time of birth. J2-d=[31-(16+22/24)]+[4+(15+18/60)/24] days. J2-d=[31-16.916666]+[4+0.6375] days. J2-d=14.083334+4.6375 days. J2-d=18.720834 days. `d-J1' is the day and time difference between the date and time of birth and `Joint of January'. d-J1=[16+22/24]-[6+(3+35/60)/24] days. d-J1=16.916666-6.1493055 days. d-J1=10.767361 days. The zone of `Decade Bounds' S0=10 and the zone of `Soul' S=2. Apply the `Ziwei's Decade Bounds Age Formula' for people born in A.D.. AG=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{S0-S (Mod 12)}x10+A[(J2-d)/3], R[(&C[SC:m=0, f=1]+y)/2]=1:{S-S0 (Mod 12)}x10+A[(d-J1)/3]}. AG=&C{R[(0+1961)/2]=0:{10-2 (Mod 12)}x10+A[18.720834/3], R[(0+1961)/2]=1:{2-10 (Mod 12)}x10+A[10.767361/3]}. AG=&C{R[1961/2]=0:{8 (Mod 12)}x10+A[6.240278], R[1961/2]=1:{-8 (Mod 12)}x10+A[3.5891203]}. AG=&C{1=0:8x10+6, 1=1:{12-8}x10+4}. AG=&C{1=0:86, 1=1:4x10+4}. AG=&C{1=0:86, 1=1:44}. Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, AG=44. Hence, the minimum age of the client is 44 when the zone of `Decade Bounds' is 10 and it ends till an age of 53. An alternative method to calculate the minimum age (AG) of `Decade Bounds' is by the simplified `Decade Bounds Age Formula'. The first step is to find out the `Revolution Mode' (RM) of `Decade Fortune' of the client by the `Revolution Mode Formula'. Apply the `Revolution Mode Formula' for people born in A.D.. RM=R[(&C[SC:m=0, f=1]+y)/2]. RM=R[(0+1961)/2]. RM=R[1961/2]. RM=1. Hence, the `Revolution Mode' of `Decade Fortune' of the client is anti-clockwise. Then, apply the simplified `Ziwei's Decade Bounds Age Formula' for `Anti-clockwise Revolution Mode' (RM=1). AG={S-S0 (Mod 12)}x10+A[(d-J1)/3]. AG={2-10 (Mod 12)}x10+A[10.767361/3]. AG={-8 (Mod 12)}x10+A[3.5891203]. AG={-8 (Mod 12)}x10+A[3.5891203]. AG={12-8}x10+4. AG=4x10+4,AG=44. Hence, the minimum age of the client is 44 when the zone of `Decade Bounds' is 10 and it ends till an age of 53.
Year Fortune Origin Formula: UN1The critical value between two consecutive years is called `Joint of Year'. `Joint of February' is the boundary of two consecutive years. It always lies on from the 3rd to 5th day of February. In general, not for precise calculations, `Joint of February' can be regarded as the 4th day of February. If the date is within the 3rd to 5th day of February, precise calculations should be carried out. That is, if the time of a date is after `Joint of February', the year is `y'. If the time of a date is before `Joint of February', the year is `y-1'. The time and date of `Joint of February' between two consecutive solar years always change from year to year. `Joint of February' also varies according to the longitude and latitude of a place. The exact date and time of `Joint of February' can be found in a Chinese lunar calendar. Assume `y' is the number of a year reckoning in Gregorian calendar after `Joint of February' and the `Origin of Year Fortune Co-ordinates' is at (UN1,ZN1). The `Year Fortune Origin Formula' for people born in B.C. is `UN1=8-y (Mod 10) & ZN1=9-y (Mod 12)'. The `Year Fortune Origin Formula' for people born in A.D. is `UN1=7+y (Mod 10) & ZN1=8+y (Mod 12)'.The `Origin of Year Fortune Co-ordinates' is different from that of the `Origin of Small Fortune Co-ordinates'. The `Origin of Year Fortune Co-ordinates' (UN1,ZN1) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Year Code' of a person. The `Origin of Year Fortune Co-ordinates' (UN1,ZN1) is the starting point of one's `Year Fortune Co-ordinates' (G,C). No matter male or female, the `Year Fortune' of a person follows the order of `Fortune Co-ordinates' and it always moves to the next pair of co-ordinates in the next year clockwise. `y' is the number of a year reckoning in Gregorian calendar. `UN1=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If UN1>10 then `UN1' becomes `UN1-10' and if UN1<1 then `UN1' becomes `UN1+10'. Thus, the value range of `UN1=(Mod 10)' is from 1 to 10. `ZN1=(Mod 12)' is a modulated function such that if ZN1>11 then `ZN1' becomes `ZN1-12' and if ZN1<0 then `ZN1' becomes `ZN1+12'. Thus, the value range of `ZN1=(Mod 12)' is from 0 to 11.If the `Origin of Year Fortune Co-ordinates' is at (UN1,ZN1) and the year is A.D.1990, y=1990. Apply the Year Fortune Origin Formula for people born in A.D.. UN1=7+y (Mod 10) & ZN1=8+y (Mod 12). UN1=7+1990 (Mod 10). UN1=1997 (Mod 10). UN1=1997-199x10. UN1=1997-1990. UN1=7. ZN1=8+1990 (Mod 12). ZN1=1998 (Mod 12). ZN1=1998-166x12. ZN1=1998-1992. ZN1=6. Hence, the `Origin of Year Fortune Co-ordinates' (UN1,ZN1)=(7,6). The `Year Code' is `07', `G6', `7G', `GG' or `GEN-NGG'. If the `Origin of Year Fortune Co-ordinates' is at (UN1,ZN1) and the year is 26B.C., y=26. Apply the Year Fortune Origin Formula for people born in B.C.. UN1=8-y (Mod 10) & ZN1=9-y (Mod 12). UN1=8-26 (Mod 10). UN1=-18 (Mod 10). UN1=10x2-18. UN1=2. ZN1=9-26 (Mod 12). ZN1=-17 (Mod 12). ZN1=12x2-17. ZN1=7. Hence, the `Origin of Year Fortune Co-ordinates' (UN1,ZN1)=(2,7). The `Year Code' is `32', `B7', `2H', `BH' or `EUT-MEI'.
Year Fortune Formula: GC1The `Year Fortune Formula' is also named as `Annual Fortune Formula'. The `Year Fortune Co-ordinates' (G1,C1) of a person always start from `Origin of Year Fortune Co-ordinates' (UN1,ZN1) and shift to the next clowisely with increments of one's age `a' after `Joint of February'. The critical value between two consecutive years is called `Joint of Year'. `Joint of February' is the boundary of two consecutive years. It always lies on from the 3rd to 5th day of February. In general, not for precise calculations, `Joint of February' can be regarded as the 5th day of February. If the date is within the 3rd to 5th day of February, precise calculations should be carried out. That is, if the time of a date is after `Joint of February', the year is `y'. If the time of a date is before `Joint of February', the year is `y-1'. The time and date of `Joint of February' between two consecutive solar years always change from year to year. `Joint of February' also varies according to the longitude and latitude of a place. The exact date and time of `Joint of February' of a year can be found in a Chinese lunar calendar. If `y' is the solar year of a person's fortune in that year, the result calculated by the formula is called the `Year Fortune Co-ordinates' (G1,C1) of the person. All people are the same. The `Year Fortune Co-ordinates' (G1,C1) can also be calculated from the `Origin of Year Fortune Co-ordinates' (UN1,ZN1) by adding the age `a' of a person. The `Year Fortune Formula' for people in B.C. is `G1=8-y (Mod 10) & C1=9-y (Mod 12)' or `G1=UN1+a (Mod 10) & C1=ZN1+a (Mod 12)'. The `Year Fortune Formula' for people in A.D. is `G1=7+y (Mod 10) & C1=8+y (Mod 12)' or `G1=UN1+a (Mod 10) & C1=ZN1+a (Mod 12)'.The `Year Fortune' is also named as `Annual Fortune'. The `Year Fortune Co-ordinates' (G1,C1) of a person follow the order of `Sequence Code of Fortune Co-ordinates' moving to the next pair of co-ordinates in the next year. No matter male or female, the `Year Fortune' is spinning in one direction only. It always spins clockwise and repeats in 60 `Fortune Co-ordinates' (G1,C1), where `G1' and `C1' are integers. `y' is the number of year reckoning in Gregorian calendar. `a' is the age of a person after `Joint of February' in Gregorian calendar. `G1=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G1>10 then `G1' becomes `G1-10' and if G1<1 then `G1' becomes `G1+10'. Thus, the value range of `G1=(Mod 10)' is from 1 to 10. `C1=(Mod 12)' is a modulated function such that if C1>11 then `C1' becomes `C1-12' and if C1<0 then `C1' becomes `C1+12'. Thus, the value range of `C1=(Mod 12)' is from 0 to 11.If the `Year Fortune Co-ordinates' is at (G1,C1) and the year is A.D.1973, y=1973. Apply the Year Fortune Formula for people in A.D.. G1=7+y (Mod 10) & C1=8+y (Mod 12). G1=7+1973 (Mod 10). G1=1980 (Mod 10). G1=1980-197x10. G1=1980-1970. G1=10. C1=8+1973 (Mod 12). C1=1981 (Mod 12). C1=1981-165x12. C1=1981-1980. C1=1. Hence, the `Year Fortune Co-ordinates' (G1,C1)=(10,1). If the `Year Fortune Co-ordinates' is at (G1,C1) and the year is 73B.C., y=73. Apply the Year Fortune Formula for people in B.C.. G1=8-y (Mod 10) & C1=9-y (Mod 12). G1=8-73 (Mod 10), G1=-65 (Mod 10), G1=10x7-65, G1=5. C1=9-73 (Mod 12), C1=-64 (Mod 12), C1=12x6-64, C1=8. Hence, the `Year Fortune Co-ordinates' (G1,C1)=(5,8). The `Year Code' is `45', `E8', `5I', `EI' or `MOO-SAN'. If the `Origin of Year Fortune Co-ordinates' (UN1,ZN1) is (2,11) and the age of a person after `Joint of February' is 35, apply the Year Fortune Formula. G1=UN1+a (Mod 10) & C1=ZN1+a (Mod 12). G1=2+35 (Mod 10). G1=37 (Mod 10). G1=37-3x10. G1=37-30. G1=7. C1=11+35 (Mod 12). C1=46 (Mod 12). C1=46-3x12. C1=46-36. C1=10. Hence, the `Year Fortune Co-ordinates' (G1,C1)=(7,10). The `Year Code' is `47', `G10', `7K', `GK' or `GEN-SHT'.
Year Code Formula: YCThe `Year Fortune' is different from `Small Fortune'. The `Year Fortune Co-ordinates' (G,C) are the co-ordinates of `Year Fortune'. Assume `y' is the year in Gregorian calendar and let its `Year Co-ordinates' be (G,C) and the `Sequence Code of Year Co-ordinates' be `YC'. The values of `G' and `C' can determine the `Sequence Code of Year Fortune Co-ordinates' by the formula. On the contrary, the values of `G' and `C' can be read from the table of `Sequence Code of Year Fortune Co-ordinates'. The `Sequence Code of Year Fortune Co-ordinates' is also named as `Year Numerology' (N). Thus, N=YC. The `Year Code Formula' is also called `Year Numerology Formula'. The `Year Code Formula' for people in B.C. is `YC=58-y (Mod 60)' or `YC=G+5[G-C-1 (Mod 12)]'. The `Year Code Formula' for people in A.D. is `YC=57+y (Mod 60)' or `YC=G+5[G-C-1 (Mod 12)]'. The Stem (U) and Root (Z) of `Fortune Co-ordinates' can be found from the `Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12).There are two types of `Fortune Codes' of a person in a year. One is called the `Year Fortune Code'. It always moves clockwise following the number of year in Gregorian calendar after `Joint of Year'. `Joint of Year' is usually on 3-5th of February in Gregorian calendar. All people are the same. The other is named as the `Small Fortune Code'. It is a special `Fortune Code' of a person in a year. It can move clockwise or anti-clockwise. Normally, people have different `Small Fortune Codes' in a year. No matter male or female, the starting point of human `Year Fortune' is the `Year Code' of one's year of birth. Everybody's `Year Fortune' spins clockwise and shifts to the next according to the `Sequence Code of Fortune Co-ordinates' on a yearly base. The `Year Fortune' repeats in 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. `G' is the `Stem' of `Year Fortune' and `C' is the `Root' of `Year Fortune'. The `Year Fortune' of a person always starts from the `Origin of Year Fortune Co-ordinates' (UN1,ZN1) at birth. The `Year Fortune' of a person follows the order of `Fortune Co-ordinates' (G,C) and it always shifts to the next pair of co-ordinates in the next year. For `G' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `C' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all values in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Year Codes'. Usually, `Year Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Year Fortune Co-ordinates'. For example, `N=8' or `N=08' means the eighth entry in the table of `Sequence Code of Year Fortune Co-ordinates' and `N=56' means it is the 56th entry. For easier time strap comparison by computer, the `Year Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=283138' stands for `H3(year)A6(month)H1(day)'. The date is 15th June, 2011. `N=122522' stands for `B11E0B9'. The date is 20th Dec., 1995. A `Year Code' can be expressed in six different ways. The commonest form is to express the `Year Code' as `Year Fortune Co-ordinates', (G,C). `G' is a value on the X-axis of a `X-Y' plane and `C' is a value on the Y-axis of a `X-Y' plane. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `x=(Mod 12)' is a modulated function such that if `x' is greater than 11 then `x' becomes `x-12' and if `x' is less than 0 then `x' becomes `x+12'. Thus, the value range of `x=(Mod 12)' is from 0 to 11. `YC=(Mod 60)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 60. If `YC' is greater than 60 then `YC' becomes `YC-60' and if `YC' is less than 1 then `YC' becomes `YC+60'. Thus, the value range of `YC=(Mod 60)' is from 1 to 60.Assume the `Year Fortune Co-ordinates' are at (G,C) and the year is A.D.1990, find the values of `G', `C' and `Year Numerology' (N). Since the year is A.D.1990, y=1990. Apply the Year Code Formula for people in A.D.. YC=57+y (Mod 60). YC=57+1990 (Mod 60). YC=2047 (Mod 60). YC=2047-34x60. YC=2047-2040. YC=7. Thus, the `Sequence Code of Year Co-ordinates' of 1990 is `7' and `Year Numerology' is N=7. The `Year Co-ordinates' (G,C) read from the table of `Sequence Code of Year Co-ordinates' are (7,6). Hence, `G=7' and `C=6'. Besides the `Year Code' of 1990 can be expressed as `N=7', `YC=7' and `YC=(7,6)', the `Year Code' of 1990 can also be expressed as `YC=G6', `YC=7F', `YC=GF' or `YC=GEN-NGG'. If the `Numerology' is 21, N=21, find the Stem (U) and Root (Z) of the `Year Fortune Co-ordinates'. Apply the `Stem & Root Formulae'. U=21 (Mod 10) & Z=21-1 (Mod 12). U=21-10x2 & Z=20 (Mod 12). U=1 & Z=20-12. U=1 and Z=8. Thus, the Stem (U) of `Year Fortune Co-ordinates' is 1 and the Root (Z) of `Year Fortune Co-ordinates' is 8. The `Year Fortune Co-ordinates' are (1,8). Since the `Year Code' (YC) is same as `Year Numerology' (N), YC=21 and YC=(1,8). The `Year Code' (YC) can also be expressed as `YC=A8', `YC=1I', YC=AI' or `YC=GAP-SAN'.
Year Set Formula: YSThe `Year Set Formula' is used to find the set of sexagesimal years by a `Year Code'. If the `Year Code' (YC) is (U,Z) and `y' is the year after `Joint of February', roughly on 4th of February in Gregorian calendar, the set of sexagesimal years (y) are y=y+60n, where `n' is an integer. If the date is before `Joint of February', the solar year `y' is `y-1'. The Year Set Formula is: YS=U+5[U-Z-1 (Mod 12)]+3 (Mod 60)In the `Year Code' (U,Z), `U' is called the `Stem' of the `Year Code' and `Z' is called the `Root' of the `Year Code' in `Prediction Technology and Forensic Mathematics' (PT&FM). The value of `U' shows the alphabetical order of the letter that it represents. For example, U=10 means `J'. In `Prediction Technology and Forensic Mathematics' (PT&FM), the value of `Z' shows the location of the root of the year. It equals to the zone in the space of the universe. `x=(Mod 12)' is a modulated function such that if `x' is greater than 11 then `x' becomes `x-12' and if `x' is less than 0 then `x' becomes `x+12'. Thus, the value range of `x=(Mod 12)' is from 0 to 11. `YS=(Mod 60)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 60. If `YS' is greater than 60 then `YS' becomes `YS-60' and if `YS' is less than 1 then `YS' becomes `YS+60'. Thus, the value range of `YS=(Mod 60)' is from 1 to 60. The `Year Code' (YC) can be found from the table of `Sequence Code of Year Co-ordinates' by the `Year Co-ordinates' (U,Z).If the `Year Code' (YC) is `E10', find three recent years. `E' stands for the stem of year U=5 because `E' is the fifth letter in alphabetical order. The root of year is Z=10. Apply the `Year Set Formula'. YS=U+5[U-Z-1 (Mod 12)]+3 (Mod 60). YS=5+5[5-10-1 (Mod 12)]+3 (Mod 60). YS=5+5[-6 (Mod 12)]+3 (Mod 60). YS=5+5[12-6]+3 (Mod 60). YS=5+5x6+3 (Mod 60). YS=38 (Mod 60). Hence, y=38+60n, where `n' is an integer. If n=30, y=38+60x30. y=1838. If n=31, y=38+60x31. y=1898. If n=32, y=38+60x32. y=1958. So, the recent three years are 1838, 1898 and 1958.
Small Fortune Spin Mode Formula: SPINThe `Small Fortune Spin Modes' of human beings are classified as `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). The `Small Fortune' is either spinning clockwise or anti-clockwise in the `Fortune Track' (FT). It varies according to the `Sex Code' (SC) and age `a' of a person. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. The `Small Fortune Spin Mode Formula' is SM=&C[SC=m:+a, SC=f:-a]. If `SM' is `+a', it means that the `Small Fortune Spin Mode' is clockwise. If `SM' is `-a', it means that the `Small Fortune Spin Mode' is anti-clockwise. If the person is a baby within age one. The value of `a’ is 0. In this case, the baby does not have any `Small Fortune Spin Mode'. In fact, the `Small Fortune Spin Mode' of male is always clockwise because SC=m and `SM' is `+a'. The `Small Fortune Spin Mode' of female is always anti-clockwise because SC=f and `SM' is `-a'.There are two different types of `Spin Modes' (SM), namely `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). The destiny of human beings in a year is controlled by two `Fortune Tracks' (FT). They are `Annual Fortune Track' (AFT) and `Year Fortune Track' (YFT). The `Annual Fortune Track' (AFT) is usually called `Small Fortune Track' (SFT). The `Small Fortune Spin Mode' is a mathematical expression that can show the spinning direction of `Small Fortune' in the `Fortune Track' (FT). Note that `Small Fortune Spin Mode' is different from `Year Fortune Spin Mode'. The `Year Fortune Spin Mode' is always clockwise. There is no `Anti-clockwise Spin Mode' in `Year Fortune' but it really exists an `Anti-clockwise Spin Mode' in `Small Fortune' (Annual Fortune). Do not confuse them. The `Small Fortune Spin Mode' of female is anti-clockwise. The `Year Fortune Spin Mode Formula' of `SM' is `-a'. In numerology and astrology, conventionally the mathematical value of a clockwise spinning direction is regarded as positive and the value of an anti-clockwise spinning direction is regarded as negative. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.).Example I: If SC=m and a=0, apply the `Small Fortune Spin Mode Formula', SM=&C[SC=m:+a, SC=f:-a]. SM=&C[SC=m:+0, SC=f:-0]. SM=+0. SM=0. The fact that `SM' is `0' means that the person has no `Small Fortune Spin Mode' because he is a baby less than one year old. Example II: If SC=m and a=24, apply the `Small Fortune Spin Mode Formula', SM=&C[SC=m:+a, SC=f:-a]. SM=&C[SC=m:+24, SC=f:-24]. SM=+24. `SM' is `+24' means that the `Small Fortune Spin Mode' is clockwise. Example III: If SC=f and a=17, apply the `Small Fortune Spin Mode Formula', SM=&C[SC=m:+a, SC=f:-a]. SM=&C[SC=m:+17, SC=f:-17]. SM=-17. `SM' is `-17' means that the `Small Fortune Spin Mode' is anti-clockwise.
Small Fortune Origin Formula: UNY`Small Fortune' (SF) is a special type of annual fortune of a person. `Small Fortune' begins neither from the first day of year in Gregorian calendar nor the first day of the first month in Chinese lunar calendar. It begins from `Joint of February' and ends before `Joint of February' next year in Gregorian calendar. In general, the origin of `Small Fortune Co-ordinates' is expressed as (U1,Z1). Let the origin of `Small Fortune Co-ordinates' of male be `(MU1,MZ1)' and the origin of `Small Fortune Co-ordinates' of female be `(FU1,FZ1)'. The `Small Fortune Origin Formula of Male' for people in B.C. is `MU1=5-2x{R[(1-y)/10] (Mod 5)} (Mod 10) & MZ1=2'. The `Small Fortune Origin Formula of Female' for people in B.C. is `FU1=1-2x{R[(1-y)/10] (Mod 5)} (Mod 10) & FZ1=8'. The standard general form of `Small Fortune Origin Formula' for people in B.C. is `U1=&C{SC=m:5-2x{R[(1-y)/10] (Mod 5)}, SC=f:1-2x{R[(1-y)/10] (Mod 5)}} (Mod 10) & Z1=&C[SC=m:2, SC=f:8]'. The `Small Fortune Origin Formula of Male' for people in A.D. is `MU1=5+2x{R[y/10] (Mod 5)} (Mod 10) & MZ1=2'. The `Small Fortune Origin Formula of Female' for people in A.D. is `FU1=1+2x{R[y/10] (Mod 5)} (Mod 10) & FZ1=8'. The standard general form of `Small Fortune Origin Formula' for people in A.D. is `U1=&C{SC=m:5+2x{R[y/10] (Mod 5)}, SC=f:1+2x{R[y/10] (Mod 5)}} (Mod 10) & Z1=&C[SC=m:2, SC=f:8]'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `y' is the year of birth after `Joint of Year'. `Joint of Year' is same as `Joint of February'.The origin of `Small Fortune Co-ordinates' is at (U1,Z1). The origin of `Small Fortune' is the starting point of one's fortune from year to year. The `Small Fortune' of male is spinning clockwise but the `Small Fortune' of female is spinning anti-clockwise. It starts to move from the `Origin of Small Fortune' at (U1,Z1) to the next `Fortune Co-ordinates' on a yearly base. The values of `Z1' of male and female are constants such that the value of male always equals to `2' and the value of `Z1' of female is always equal to `8'. The `Small Fortune' repeats in 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' is a remainder function such that it takes the remainder of the solar year of birth, `y', divided by 10. `X=(Mod 5)' is a modulated function such that if X>4 then `X' becomes `X-5' and if X<0 then `X' becomes `X+5'. Thus, the value range of `X=(Mod 5)' is from 0 to 4. `U1=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U1>10 then `U1' becomes `U1-10' and if U1<1 then `U1' becomes `U1+10'. Thus, the value range of `U1=(Mod 10)' is from 1 to 10.For a male born in A.D.1987, y=1987. Apply the standard general form of `Small Fortune Origin Formula' for people in A.D.. U1=&C{SC=m:5+2x{R[y/10] (Mod 5)}, SC=f:1+2x{R[y/10] (Mod 5)}} (Mod 10) & Z1=&C[SC=m:2, SC=f:8]. U1=5+2x{R[1987/10] (Mod 5)} (Mod 10) & Z1=2. U1=5+2x{7 (Mod 5)} (Mod 10) & Z1=2. U1=5+2x{7-5} (Mod 10). U1=5+2x2 (Mod 10). U1=9 (Mod 10). U1=9. So, the origin of `Small Fortune Co-ordinates' is at (9,2). The `Small Fortune Code' is `39', `I2', `9C', `IC' or `YAM-YAN'. For a male born in A.D.2012, y=2012. Apply the `Small Fortune Origin Formula of Male' for people in A.D.. MU1=5+2x{R[y/10] (Mod 5)} (Mod 10) & MZ1=2. MU1=5+2x{R[2012/10] (Mod 5)} (Mod 10). MU1=5+2x{2 (Mod 5)} (Mod 10). MU1=5+2x{2} (Mod 10). MU1=5+4 (Mod 10). MU1=9 (Mod 10). MU1=9. MZ1=2. The origin of `Small Fortune Co-ordinates' is at (9,2). The `Small Fortune Code' is `39', `I2', `9C', `IC' or `YAM-YAN'. For a female born in A.D.1987, y=1987. Apply the `Small Fortune Origin Formula of Female' for people in A.D.. FU1=1+2x{R[y/10] (Mod 5)} (Mod 10) & FZ1=8. FU1=1+2x{R[1987/10] (Mod 5)} (Mod 10). FU1=1+2x{7 (Mod 5)} (Mod 10). FU1=1+2x{2} (Mod 10). FU1=1+4 (Mod 10). FU1=5 (Mod 10). FU1=5. FZ1=8. The origin of `Small Fortune Co-ordinates' is at (5,8). The `Small Fortune Code' is `45', `E8', `5I', `EI' or `MOO-SAN'.
Small Fortune Formula: GCY`Small Fortune' (SF) is a special type of annual fortune of a person. `Small Fortune' begins neither from the first day of year in Gregorian calendar nor the first day of the first month in Chinese lunar calendar. It begins from `Joint of February' and ends before `Joint of February' next year in Gregorian calendar. The standard general form of `Small Fortune Formula' for people in B.C. is G=&C{SC=m:5-2x{R[(1-y)/10] (Mod 5)}+a, SC=f:1-2x{R[(1-y)/10] (Mod 5)}-a} (Mod 10) & C=&C{SC=m:2+a (Mod 12), SC=f:8-a (Mod 12)}. The standard general form of `Small Fortune Formula' for people in A.D. is G=&C{SC=m:5+2x{R[y/10] (Mod 5)}+a, SC=f:1+2x{R[y/10] (Mod 5)}-a} (Mod 10) & C=&C{SC=m:2+a (Mod 12), SC=f:8-a (Mod 12)}. `y' is the year of birth after `Joint of Year'. `Joint of Year' is same as `Joint of February'. `a' is the age of a person in the current year. If the birthday is before `Joint of Year', usually on 4th February, the year of birth `y' is regarded as previous year. `Joint of Year' is same as `Joint of February'. The `Small Fortune Formula' is G=&C{SC=m:X+I[y/n], SC=f:X-I[y/n]} (Mod 10) & C=&C{SC=m:Y+I[y/n], SC=f:Y-I[y/n]} (Mod 12). The `Time Interval' between two consecutive `Small Fortune Co-ordinates' is 1 year, `n=1', where `n' is the `Time Interval' between two consecutive `Small Fortune Co-ordinates' in year. If the location of `Small Fortune Co-ordinates' is at (X,Y), then the position of `Small Fortune Co-ordinates' is at (G,C) after `y' years. The `Small Fortune Formula' can be simplified to G=&C[SC=m:X+y (Mod 10), SC=f:X-y (Mod 10)] & C=&C[SC=m:Y+y (Mod 12), SC=f:Y-y (Mod 12)]. It can be further simplified as follows: For male, G=X+y (Mod 10) & C=Y+y (Mod 12). For female, G=X-y (Mod 10) & C=Y-y (Mod 12).The origin of `Small Fortune Co-ordinates' is at (U1,Z1), where `U1' and `Z1' are integers. The origin of `Small Fortune' is the starting point of one's fortune from year to year. The `Small Fortune' of male is spinning clockwise but the `Small Fortune' of female is spinning anti-clockwise. It starts to move from the `Origin of Small Fortune' at (U1,Z1) to the next `Fortune Co-ordinates' on a yearly base. The `Small Fortune' repeats in 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. `y' is the number of years. In case of male, the `Small Fortune' spins clockwise according to the increment in value of `y'. In case of female, the `Small Fortune' spins anti-clockwise according to the increment in value of `y'. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `G=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G>10 then `G' becomes `G-10' and if G<1 then `G' becomes `G+10'. Thus, the value range of `G=(Mod 10)' is from 1 to 10. `C=(Mod 12)' is a modulated function such that if C>11 then `C' becomes `C-12' and if C<0 then `C' becomes `C+12'. Thus, the value range of `C=(Mod 12)' is from 0 to 11.Assume a male was born at 10:00 p.m. on 16th Jan., A.D.1962. Find the stem and root of his `Small Fortune' in A.D.2012. Since the birthday is before `Joint of Year', y=1961. The age is a=2012-1961. a=51. According to the standard general form of `Small Fortune Formula' for people in A.D., G=&C{SC=m:5+2x{R[y/10] (Mod 5)}+a (Mod 10), SC=f:1+2x{R[y/10] (Mod 5)}-a (Mod 10)} & C=&C{SC=m:2+a (Mod 12), SC=f:8-a (Mod 12)}, for male is G=5+2x{R[y/10] (Mod 5)}+a (Mod 10) & C=2+a (Mod 12), G=5+2x{R[1961/10] (Mod 5)}+(2012-1961) (Mod 10) & C=2+(2012-1961) (Mod 12). G=5+2x{1 (Mod 5)}+51 (Mod 10) & C=2+51 (Mod 12). G=5+2x1+51 (Mod 10) & C=53 (Mod 12). G=58 (Mod 10) & C=53-4x12. G=58-5x10 & C=5. G=8 & C=5. Thus, the `Stem' of `Small Fortune' in A.D.2012 is `H' because the 8th alphabet is `H' and the `Root' is `5'. The `Small Fortune Code' is `H5'. The `Small Fortune Co-ordinates' are (8,5). For female in A.D., SC=f. If the `Small Fortune Co-ordinates' (X,Y)=(5,8) and y=7, apply the simplified `Small Fortune Formula'. G=&C[SC=m:X+y, SC=f:X-y] (Mod 10) & C=&C[SC=m:Y+y, SC=f:Y-y] (Mod 12). The values of `G' and `C' of the new `Small Fortune Co-ordinates' (G,C) after `y' years are: G=5-7 (Mod 10) & C=8-7 (Mod 12). G=-2 (Mod 10) & C=1 (Mod 12). G=10-2 & C=1. G=8. Hence, after counting 7 years anti-clockwise, the `Small Fortune' will move from `Co-ordinates' (5,8) with a value of the `Sequence Code of Small Fortune Co-ordinates' of `45' to `Co-ordinates' (8,1) with a new value of the `Sequence Code of Small Fortune Co-ordinates' of `38'. Thus, the value of the `Sequence Code of Small Fortune Co-ordinates' is changed from `45' to `38'.
Small Bounds Formula: BOUNDS1The Year Birth Set Formula for people born in `y' B.C. is YB=1-y (Mod 4). The Year Birth Set Formula for people born in `y' A.D. is YB=y (Mod 4). `YB=(Mod 4)' is a modulated function such that if YB>3 then `YB' becomes `YB-4' and if YB<0 then `YB' becomes `YB+4'. Thus, the value range of `YB=(Mod 4)' is from 0 to 3. The Small Bounds Formula for people born in B.C. is S1=&C{SC=m:10+9x[1-y (Mod 4)]+a, SC=f:10+9x[1-y (Mod 4)]-a} (Mod 12). The Small Bounds Formula for people born in A.D. is S1=&C{SC=m:10+9x[y (Mod 4)]+a, SC=f:10+9x[y (Mod 4)]-a} (Mod 12). The formulae can be simplified as follows: For male born in B.C., S1=10+9x[1-y (Mod 4)]+a (Mod 12). For female born in B.C., S1=10+9x[1-y (Mod 4)]-a (Mod 12). For male born in A.D., S1=10+9x[y (Mod 4)]+a (Mod 12). For female born in A.D., S1=10+9x[y (Mod 4)]-a.`Small Bounds' is the focus of `Small Fortune' because it shows the fortune of one year by a zone of a person. The `Timeons' in the zone can reveal the fortune of a person in that year. The `Small Bounds' of male spin clockwise according to the sequence of zones. It moves to the next zone annually. For female, the `Small Bounds' spin anti-clockwise according to the reverse order of the zones. The `Small Bounds' of female also moves to the next zone in reverse order annually. The `Time Interval' of `Small Bounds' is one year. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. Assume `y' is the year of birth of a person after `Joint of Year' in Gregorian calendar. `Joint of Year' is same as `Joint of February' which is on a day from 3rd to 5th of February. The zone of `Small Bounds' of age `a' in a certain year is `S1', where `a’ is `Apparent Age’ because it is the age of the current year of a person, whether the date is before or after the birthday is not in consideration. In numerology and astrology, human beings can be divided into four main groups according to their year of birth. This is known as `Year Birth Set’ of people. The starting point of `Small Fortune’ of people having same `Year Birth Set’ is identical though the spin of male is clockwise and female is anti-clockwise. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `n=(Mod 4)' is a modulated function such that if n>3 then `n' becomes `n-4' and if n<0 then `n' becomes `n+4'. Thus, the value range of `n=(Mod 4)' is from 0 to 3. `S1=(Mod 12)' is a modulated function such that if S1>11 then `S1' becomes `S1-12' and if S1<0 then `S1' becomes `S1+12'. Thus, the value range of `S1=(Mod 12)' is from 0 to 11.Assume a female was born at 4:56 p.m. on 12th January of 1 B.C. in Gregorian calendar. Find the zone of her `Small Bounds' (S1) in A.D.34. From the given data, we know that the sex of the person is female. Thus, SC=f. Since the date of birth is before `Joint of Year' which is usually on a day from 3rd to 5th February of 1 B.C., she is regarded as she was born in the previous year (2 B.C.). Thus, y=2. The `Apparent Age’ of the woman is calculated in this way. From her year of birth which rgarded as in 2 B.C. to 1 B.C. is age 1. Counting from 2 B.C. to A.D.1 is age 2. Reckoning from 2 B.C. to A. D.34 is age 35. Thus, the `Apparent Age’ is a=1+34. a=35. Apply the `Small Bounds Formula' for people born in B.C., S1=&C{SC=m:10+9x[1-y (Mod 4)]+a, SC=f:10+9x[1-y (Mod 4)]-a} (Mod 12). Since the conditional `&C[SC=m]’ is false and `&C[SC=f]’ is true, the mathematical expression after `:’ is selected to operate. Thus, S1=10+9x[1-y (Mod 4)]-a (Mod 12). S1=10+9x[1-2 (Mod 4)]-35 (Mod 12). S1=-25+9x[-1 (Mod 4)] (Mod 12). S1=-25+9x[4-1] (Mod 12). S1=-25+9x3 (Mod 12). S1=2 (Mod 12). S1=2. The zone of `Small Bounds' is `Zone 2’ or `Root 2’. This means that the focus of `Small Fortune’ of the woman when her age is 35 is in `Zone 2'. Assume a man was born on 6th October of A.D.1952 in Gregorian calendar. Find the zone of his `Small Bounds' (S1) in A.D.2007. From the given data, we know that the sex of the person is male. Thus, SC=m. Since the date of birth is after `Joint of Year' which is at 4:54 a.m. on 5th Feb., A.D.1952, y=1952. The `Apparent Age’ is a=2007-1952. a=55. Apply the `Small Bounds Formula' for people born in A.D., S1=&C{SC=m:10+9x[y (Mod 4)]+a, SC=f:10+9x[y (Mod 4)]-a} (Mod 12). Since the conditional `&C[SC=m]’ is true and `&C[SC=f]’ is false, the mathematical expression after `:’ is selected to operate. Thus, S1=10+9x[y (Mod 4)]+a (Mod 12). S1=10+9x[1952 (Mod 4)]+55 (Mod 12). S1=10+9x[1952-488x4)]+55 (Mod 12). S1=10+9x0+55 (Mod 12). S1=65 (Mod 12). S1=65-12x5 (Mod 12). S1=65-60. S1=5. The zone of `Small Bounds' is `Zone 5’ or `Root 5’. This means that the focus of `Small Fortune’ of the man when his age is 55 is in `Zone 5'. Assume a woman was born on 26th January of A.D.1927 in Gregorian calendar. Find the zone of her `Small Bounds' (S1) in A.D.1997. From the given data, we know that the sex of the person is female. Thus, SC=f. Since the date of birth is before `Joint of Year' which is at 3:31 a.m. on 5th Feb., A.D.1927, y=1926. The `Apparent Age’ is a=1997-1926. a=71. Apply the `Small Bounds Formula' for people born in A.D., S1=&C{SC=m:10+9x[y (Mod 4)]+a, SC=f:10+9x[y (Mod 4)]-a} (Mod 12). Since the conditional `&C[SC=m]’ is false and `&C[SC=f]’ is true, the mathematical expression after `:’ is selected to operate. Thus, S1=10+9x[y (Mod 4)]-a (Mod 12). S1=10+9x[1926 (Mod 4)]-71 (Mod 12). S1=10+9x[1926-481x4)]-71 (Mod 12). S1=10+9x[1926-1926)]-71 (Mod 12). S1=10+9x2-71 (Mod 12). S1=-43 (Mod 12). S1=12x4-43. S1=48-43. S1=5. The zone of `Small Bounds' is `Zone 5’ or `Root 5’. This means that the focus of `Small Fortune' of the woman when her age is 71 is in `Zone 5'.
Wong's Small Fortune Spin Mode Formula: SPINWWong's Small Fortune of human beings spins clockwise or anti-clockwise in the order of `Fortune Co-ordinates'. There are altogether two different types of Wong's Small Fortune Spin Mode (SM). They are `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). It varies according to the `Sex Code' (SC) and the year (y) after `Joint of Frebruary' in Gregorian calendar when a person was born. Wong's Small Fortune Spin Mode Formula for people born in B.C. is SM=R[(&C[SC:m=0, f=1]+y-1)/2]. Wong's Small Fortune Spin Mode Formula for people born in A.D. is SM=R[(&C[SC:m=0, f=1]+y)/2]. No matter a person was born in B.C. or A.D., if SM=0, it means that Wong's Small Fortune Spin Mode is clockwise. If SM=1, it means that Wong's Small Fortune Spin Mode is anti-clockwise.There are two different types of `Spin Modes' (SM), namely `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). The destiny of human beings in a year is controlled by two `Fortune Tracks' (FT). They are `Annual Fortune Track' (AFT) and `Year Fortune Track' (YFT). The `Annual Fortune Track' (AFT) is `Wong's Small Fortune Track' (WFT). Wong's Small Fortune of people is either spinning clockwise or anti-clockwise in the `Fortune Track' (FT). Wong's Small Fortune Spin Mode is a mathematical expression that can show the spinning direction of `Small Fortune' in the `Fortune Track' (FT). Note that `Small Fortune Spin Mode' is different from `Year Fortune Spin Mode'. The `Year Fortune Spin Mode' is always clockwise. There is no `Anti-clockwise Spin Mode' in `Year Fortune' but it really exists `Anti-clockwise Spin Mode' in `Small Fortune' (Annual Fortune). Do not confused by them. If `a' is the exact age of a person and Wong's Small Fortune Spin Mode is `SM=0', Wong's Small Fortune is `+a'. If `SM=1', Wong's Small Fortune is `-a'. But, the `Year Fortune Spin Mode' of people, no matter male or female, is always `+a'. In `PT&FM', conventionally the mathematical value of a clockwise spinning direction is regarded as positive and the value of an anti-clockwise spinning direction is regarded as negative. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number.If SC=m and y=A.D.2004, apply Wong's Small Fortune Spin Mode Formula for people born in A.D.. SM=R[(&C[SC:m=0, f=1]+y)/2]. SM=R[(0+2004)/2]. SM=R[2004/2]. SM=0. `SM=0' means that Wong's Small Fortune Spin Mode is clockwise. If SC=m and y=A.D.1997, apply Wong's Small Fortune Spin Mode Formula for people born in A.D.. SM=R[(&C[SC:m=0, f=1]+y)/2]. SM=R[(0+1997)/2]. SM=R[1997/2]. SM=1. `SM=1' means that Wong's Small Fortune Spin Mode is anti-clockwise. If SC=f and y=A.D.1996, apply Wong's Small Fortune Spin Mode Formula for people born in A.D.. SM=R[(&C[SC:m=0, f=1]+y)/2]. SM=R[(1+1996)/2]. SM=R[1997/2]. SM=1. `SM=1' means that Wong's Small Fortune Spin Mode is anti-clockwise. If SC=f and y=A.D.1999, apply Wong's Small Fortune Spin Mode Formula for people born in A.D.. SM=R[(&C[SC:m=0, f=1]+y)/2]. SM=R[(1+1999)/2]. SM=R[2000/2]. SM=0. `SM=0' means that Wong's Small Fortune Spin Mode is clockwise. If SC=m and y=7 B.C., apply Wong's Small Fortune Spin Mode Formula for people born in B.C.. SM=R[(&C[SC:m=0, f=1]+y-1)/2]. SM=R[(0+7-1)/2]. SM=R[6/2]. SM=0. `SM=0' means that Wong's Small Fortune Spin Mode is clockwise.
Wong's Small Fortune Origin Formula: UNYWWong's Small Fortune is a special type of annual fortune of a person. It is different from `Year Fortune' (YF). Wong's Small Fortune begins neither from the first day of year in Gregorian calendar nor the first day of the first month in Chinese lunar calendar. It begins from `Joint of February' and ends before `Joint of February' next year in Gregorian calendar. Normally, different people have different `Small Fortunes' in a year. In general, the origin of Wong's Small Fortune Co-ordinates is expressed as (U,Z). `U' is called the `Stem' of Wong's Small Fortune Origin and `Z' is called the `Root' of Wong's Small Fortune Origin. Despite of people born in B.C. or A.D., Wong's Small Fortune Origin Formula is `U=Z-1+2x{UD &C{A[h/2]=12:+1}} (Mod 10) & Z=A[h/2] (Mod 12)'. `UD' is the stem of the day and `h' is the time counting in hours in 24-hour system when a person was born. The value of `Z' can be calculated directly from time `h' expressed in 24-hour system. But, for finding out the value `U' of Wong's Small Fortune Origin, the value `UD' of `Day Fortune Co-ordinates' (UD,ZD) of the day at birth must be calculated by `Day Fortune Origin Formula' first.The origin of Wong's Small Fortune Co-ordinates is at (U,Z). The origin of `Small Fortune' is the starting point of one's fortune from year to year. Wong's Small Fortune of people is either spinning clockwise or anti-clockwise according to Wong's Small Fortune Spin Mode (SM) in the order of `Fortune Co-ordinates'. `Spin Mode' (SM) is a mathematical expression that can show the spinning direction of `Small Fortune' (SF) in the `Small Fortune Track' (SFT). There are altogether two different types of Wong's Small Fortune Spin Modes, namely `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). The `Wong's Small Fortune' (WSF) is either spinning clockwise or anti-clockwise in the `Small Fortune Track' (SFT). It varies according to the `Sex Code' (SC) of a person and the year of birth `y' after `Joint of February' in Gregorian calendar. Wong's Small Fortune Spin Mode Formula for people born in B.C. is SM=R[(&C[SC:m=0, f=1]+y-1)/2]. Wong's Small Fortune Spin Mode Formula for people born in A.D. is SM=R[(&C[SC:m=0, f=1]+y)/2]. Despite of people born in A.D. or B.C. and based on calculation of Wong's Small Fortune Spin Mode Formula, SM=0 means the spin mode is clockwise. If SM=1, it means the spin mode is anti-clockwise. Wong's Small Fortune recurs in 60 `Fortune Co-ordinates' expressed as `(G,C)' where `G' and `C' are integers. It starts to move from the origin of Wong's Small Fortune at (U,Z) to the next `Fortune Co-ordinates' on a yearly base. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11.Assume a female was born at 2:57 p.m. on 17th April of 1997. Find Wong's Small Fortune Origin (U,Z). Firstly, find out the stem of day (UD) by applying the `Day Fortune Origin Formula' and UD=6. Next, calculate the value of `h'. h=14+57/60, h=14.95 . Then, apply Wong's Small Fortune Origin Formula `U=Z-1+2x{UD &C{A[h/2]=12:+1}} (Mod 10) & Z=A[h/2] (Mod 12)' to find the value of `Z'. Z=A[14.95/2] (Mod 12). Z=A[7.475] (Mod 12). Z=7. U=7-1+2x{6 &C{A[14.95/2]=12:+1}} (Mod 10). U=6+2x{6 &C{A[7.475]=12:+1}} (Mod 10). U=6+2x{6 &C{7=12:+1}} (Mod 10). U=6+2x6 (Mod 10). U=6+12 (Mod 10). U=18 (Mod 10). U=18-10. U=8. Hence, Wong's Small Fortune Origin (U,Z) of a person born at 2:57 p.m. on 17th April of 1997 is (8,7). Wong's Small Fortune Origin Code is `08', `H7', `8H', `HH' or `SUN-MEI'. If a male was born at 11:55 p.m. on 21st November of 1990, find Wong's Small Fortune Origin (U,Z). Firstly, find out the stem of day (UD) by applying the `Day Fortune Origin Formula' and UD=7. Next, calculate the value of `h'. h=23+55/60. h=23.92 . Then, apply Wong's Small Fortune Origin Formula `U=Z-1+2x{UD &C{A[h/2]=12:+1}} (Mod 10) & Z=A[h/2] (Mod 12)' to find the value of `Z'. Z=A[23.92/2] (Mod 12). Z=A[11.96] (Mod 12). Z=12 (Mod 12). Z=12-12. Z=0. Then, U=0-1+2x{7 &C{A[23.92/2]=12:+1}} (Mod 10). U=-1+2x{7 &C{A[11.96]=12:+1}} (Mod 10). U=-1+2x{7 &C{12=12:+1}} (Mod 10). U=-1+2x{7+1} (Mod 10). U=-1+2x8 (Mod 10). U=-1+16 (Mod 10). U=15 (Mod 10). U=15-10. U=5. Hence, Wong's Small Fortune Origin (U,Z) of a person born at 11:55 p.m. on 21st November of 1990 is (5,0). Wong's Small Fortune Origin Code is `25', `E0', `5A', `EA' or `MOO-CHI'. If a female was born at 1:30 p.m. on 21st June of 1987, find Wong's Small Fortune Origin (U,Z). Firstly, find out the stem of day (UD) by applying the `Day Fortune Origin Formula' and UD=8. Next, calculate the value of `h'. h=13+30/60. h=13.5 . Then, apply Wong's Small Fortune Origin Formula `U=Z-1+2x{UD &C{A[h/2]=12:+1}} (Mod 10) & Z=A[h/2] (Mod 12)' to find the value of `Z'. Z=A[13.5/2] (Mod 12). Z=A[6.75] (Mod 12). Z=7 (Mod 12). Z=7. Then, U=7-1+2x{8 &C{A[13.5/2]=12:+1}} (Mod 10), U=6+2x{8 &C{A[6.75]=12:+1}} (Mod 10). U=6+2x{8 &C{7=12:+1}} (Mod 10). U=6+2x8 (Mod 10). U=22 (Mod 10). U=22-10x2. U=2. Hence, Wong's Small Fortune Origin (U,Z) of a person born at 1:30 p.m. on 21st June of 1987 is (2,7). Wong's Small Fortune Origin Code is `32', `B7', `2H', `BH' or `EUT-MEI'.
Wong's Small Fortune Formula: GCYWWong's Small Fortune (WSF) is a special type of annual fortune of a person. It is different from `Year Fortune' (YF). Wong's Small Fortune begins neither from the first day of year in Gregorian calendar nor the first day of the first month in Chinese lunar calendar. It begins from `Joint of February' and ends before `Joint of February' next year in Gregorian calendar. Normally, different people have different `Small Fortunes' in a year. In general, Wong's Small Fortune Co-ordinates are expressed as (U,Z). `U' is called the `Stem' of Wong's Small Fortune and `Z' is called the `Root' of Wong's Small Fortune. The standard general form of `Wong's Small Fortune Formula' for people in B.C. is U=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}+a, R[(&C[SC:m=0, f=1]+y-1)/2]=1:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}-a} (Mod 10) & Z=&C{R[(&C[SC:m=0, f=1]+y-1)/2]=0:A[h/2]+a, R[(&C[SC:m=0, f=1]+y-1)/2]=1:A[h/2]-a} (Mod 12). The standard general form of `Small Fortune Formula' for people in A.D. is U=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}+a, R[(&C[SC:m=0, f=1]+y)/2]=1:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}-a} (Mod 10) & Z=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[h/2]+a, R[(&C[SC:m=0, f=1]+y)/2]=1:A[h/2]-a} (Mod 12). `y' is the year of birth after `Joint of Year'. If the birthday is before `Joint of Year', the year of birth `y' is regarded as previous year. `Joint of Year' is same as `Joint of February'. Usually, it is on 4th February. `a' is the age of a person in the current year. `UD' is the stem of the day and `h' is the time counting in hours in 24-hour system when a person was born. The value of `Z' can be calculated directly from time `h' expressed in 24-hour system. But, for finding out the value `U' of Wong's Small Fortune, the value `UD' of `Day Fortune Co-ordinates' (UD,ZD) of the day at birth must be calculated by `Day Fortune Origin Formula' first. `Wong's Small Fortune Spin Mode' is denoted by `SM'. `SM=0' means `Wong's Small Fortune' spins clockwise. `SM=1' means `Wong's Small Fortune' spins anti-clockwise. Regarding to different spin modes, `Wong's Small Fortune Formula' can be simplified as follows. If SM=0, then U={A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}+a (Mod 10) & Z=A[h/2]+a (Mod 12). If SM=1, then U={A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}-a (Mod 10) & Z=A[h/2]-a (Mod 12). The `Time Interval' between two consecutive `Wong's Small Fortune Co-ordinates' is 1 year. If the location of `Wong's Small Fortune Co-ordinates' is at (X,Y), the position of `Wong's Small Fortune Co-ordinates' is at (U,Z) after `y' years. `Wong's Small Fortune Formula' can be further simplified as follows. U=&C[SM=0:X+y, SM=1:X-y] (Mod 10) & Z=&C[SM=0:Y+y, SM=1:Y-y] (Mod 12).Asume the origin of `Wong's Small Fortune Co-ordinates' is at (Uo,Zo), where `Uo' and `Zo' are integers. The origin of `Wong's Small Fortune' is the starting point of one's fortune from year to year. `Wong's Small Fortune' of people is either spinning clockwise or anti-clockwise based on `Wong's Small Fortune Spin Mode' following the order of `Fortune Co-ordinates'. It starts to move from `Wong's Small Fortune Origin' at (Uo,Zo) to the next `Fortune Co-ordinates' on a yearly base. The destiny of human beings in a year is controlled by two `Fortune Tracks' (FT). They are `Annual Fortune Track' (AFT) and `Year Fortune Track' (YFT). The `Annual Fortune Track' (AFT) is usually called `Small Fortune Track' (SFT). `Wong's Small Fortune Spin Mode' (SM) is a mathematical expression that can show the spinning direction of `Wong's Small Fortune' in `Small Fortune Track' (SFT). Note that `Small Fortune Spin Mode' is different from `Year Fortune Spin Mode'. The `Year Fortune Spin Mode' is always clockwise. There is no `Anti-clockwise Spin Mode' for `Year Fortune' but there does exist `Anti-clockwise Spin Mode' for `Small Fortune' (Annual Fortune). Do not confused by them. There are altogether two different types of `Spin Modes' (SM), namely `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). It varies according to the `Sex Code' (SC) of a person and the year of birth `y' in Gregorian calendar. Wong's Small Fortune Spin Mode Formula for people born in B.C. is SM=R[(&C[SC:m=0, f=1]+y-1)/2]. Wong's Small Fortune Spin Mode Formula for people born in A.D. is SM=R[(&C[SC:m=0, f=1]+y)/2]. Despite of people born in A.D. or B.C. and based on calculation of Wong's Small Fortune Spin Mode Formula, SM=0 means the spin mode is clockwise. If SM=1, it means the spin mode is anti-clockwise. Wong's Small Fortune recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. It starts to move from Wong's Small Fortune Origin (Uo,Zo) to next `Fortune Co-ordinates' (U,Z) on a yearly base. People who are classified as `SM=0' will increase the value of `Fortune Co-ordinates' clockwise and people who are classified as `SM=1' will decrease the value of `Fortune Co-ordinates' anti-clockwise. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11.Assume a male was born at 0:45 a.m. on 6th October of 1952. Find the Stem (U) and Root (Z) of Wong's Small Fortune (U,Z) at 10:45 a.m. on 17th August of 1986. Also, find the `Fortune Co-ordinates' and Wong's Small Fortune Code. The `Sex Code' of male is `m' and m=0. Since the birthday is after `Joint of Year' which is at 4:54 a.m. on 5th February of 1952, y=1952. The exact age is a=1985-1952 and a=33 because the day of event which is at 10:45 a.m. on 17th August of 1986 is before the birthday in 1986. Firstly, find out the stem of day (UD) by applying the `Day Fortune Origin Formula' and UD=2. Next, calculate the value of `h'. h=0+45/60. h=0.75 . Then, apply Wong's Small Fortune Formula for people born in A.D., `U=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}+a, R[(&C[SC:m=0, f=1]+y)/2]=1:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}-a} (Mod 10) & Z=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[h/2]+a, R[(&C[SC:m=0, f=1]+y)/2]=1:A[h/2]-a} (Mod 12)' to find the value of `Z'. Z=&C{R[(0+1952)/2]=0:A[0.75/2]+33, R[(0+1952)/2]=1:A[0.75/2]-33} (Mod 12). Z=&C{R[1952/2]=0:A[0.375]+33, R[1952/2]=1:A[0.375]-33} (Mod 12). Z=&C{0=0:0+33, 0=1:0-33} (Mod 12). Z=&C{0=0:33, 0=1:-33} (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, Z=33 (Mod 12). Z=33-12x2. Z=9. Hence, U=&C{R[(0+1952)/2]=0:{A[0.75/2] (Mod 12)}-1+2x{2 &C{A[0.75/2]=12:+1}}+33, R[(0+1952)/2]=1:{A[0.75/2] (Mod 12)}-1+2x{2 &C{A[0.75/2]=12:+1}}-33} (Mod 10). U=&C{R[1952/2]=0:{A[0.375] (Mod 12)}-1+2x{2 &C{A[0.375]=12:+1}}+33, R[1952/2]=1:{A[0.375] (Mod 12)}-1+2x{2 &C{A[0.375]=12:+1}}-33} (Mod 10). U=&C{0=0:{0 (Mod 12)}-1+2x{2 &C{0=12:+1}}+33, 0=1:{0 (Mod 12)}-1+2x{2 &C{0=12:+1}}-33} (Mod 10). U=&C{0=0:0-1+2x{2 &C{0=12:+1}}+33, 0=1:0-1+2x{2 &C{0=12:+1}}-33} (Mod 10). U=&C{0=0:-1+2x{2 &C{0=12:+1}}+33, 0=1:-1+2x{2 &C{0=12:+1}}-33} (Mod 10). Since the truth value of `&C[0=12]' is false, the mathematical expression `+1' after the sign `:' is not operated. U=&C{0=0:-1+2x2+33, 0=1:-1+2x2-33} (Mod 10). U=&C{0=0:36, 0=1:-30} (Mod 10). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, U=36 (Mod 10). U=36-10x3. U=6. The Stem (U) of Wong's Small Fortune (U,Z) of the client at 10:45 a.m. on 17th August of 1986 is `F' because `F' is the sixth alphabet and the `Root' is 9. So, Wong's Small Fortune Co-ordinates are (6,9). Wong's Small Fortune Code is `46', `F9', `6J', `FJ' or `GAI-YAU'. Assume a female was born at 1:06 a.m. on 12th August of 1959 in Hong Kong. Find the Stem (U) and Root (Z) of Wong's Small Fortune (U,Z) at 10:45 a.m. on 17th August of 1986. Also, find the `Fortune Co-ordinates' and Wong's Small Fortune Code. The `Sex Code' of female is `f' and f=1. The place of birth of the client in Hong Kong is 114 degrees 10 minutes east of longitude. The time is delayed by 23 minutes and 30 seconds from its standard time zone which is the time of 120 degrees east of longitude. Thus, the real time when the client was born is at 0:42:30 on 12th August of 1959. Since the birthday is after `Joint of Year' which is at 9:43 p.m. on 4th February of 1959, y=1959. The exact age is a=1986-1959 and a=27 because the day of event which is at 10:45 a.m. on 17th August of 1986 is after the birthday in 1986. Firstly, find out the stem of day (UD) by applying the `Day Fortune Origin Formula' and UD=3. Next, calculate the value of `h'. h=0+42/60+30/3600. h=0.7+0.00833 . h=0.70833 . Then, apply Wong's Small Fortune Formula for people born in A.D., `U=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}+a, R[(&C[SC:m=0, f=1]+y)/2]=1:{A[h/2] (Mod 12)}-1+2x{UD &C{A[h/2]=12:+1}}-a} (Mod 10) & Z=&C{R[(&C[SC:m=0, f=1]+y)/2]=0:A[h/2]+a, R[(&C[SC:m=0, f=1]+y)/2]=1:A[h/2]-a} (Mod 12)' to find the value of `Z'. Z=&C{R[(1+1959)/2]=0:A[0.70833/2]+27, R[(1+1959)/2]=1:A[0.70833/2]-27} (Mod 12). Z=&C{R[1960/2]=0:A[0.374165]+27, R[1960/2]=1:A[0.374165]-27} (Mod 12). Z=&C{0=0:0+27, 0=1:0-27} (Mod 12). Z=&C{0=0:27, 0=1:-27} (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, Z=27 (Mod 12). Z=27-12x2. Z=3. Hence, U=&C{R[(1+1959)/2]=0:{A[0.70833/2] (Mod 12)}-1+2x{3 &C{A[0.70833/2]=12:+1}}+27, R[(1+1959)/2]=1:{A[0.70833/2] (Mod 12)}-1+2x{3 &C{A[0.70833/2]=12:+1}}-27} (Mod 10). U=&C{R[1960/2]=0:{A[0.374165] (Mod 12)}-1+2x{3 &C{A[0.374165]=12:+1}}+27, R[1960/2]=1:{A[0.374165] (Mod 12)}-1+2x{3 &C{A[0.374165]=12:+1}}-27} (Mod 10). U=&C{0=0:{0 (Mod 12)}-1+2x{3 &C{0=12:+1}}+27, 0=1:{0 (Mod 12)}-1+2x{3 &C{0=12:+1}}-27} (Mod 10). U=&C{0=0:0-1+2x{3 &C{0=12:+1}}+27, 0=1:0-1+2x{3 &C{0=12:+1}}-27} (Mod 10). U=&C{0=0:-1+2x{3 &C{0=12:+1}}+27, 0=1:-1+2x{3 &C{0=12:+1}}-27} (Mod 10). Since the truth value of `&C[0=12]' is false, the mathematical expression `+1' after the sign `:' is not operated. U=&C{0=0:-1+2x3+27, 0=1:-1+2x3-27} (Mod 10). U=&C{0=0:32, 0=1:-22} (Mod 10). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, U=32 (Mod 10). U=32-10x3. U=2. The Stem (U) of Wong's Small Fortune (U,Z) of the client at 10:45 a.m. on 17th August of 1986 is `B' because `B' is second alphabet and the `Root' is 3. So, Wong's Small Fortune Co-ordinates are (2,3). Wong's Small Fortune Code is `52', `B3', `2D', `BD' or `EUT-MOU'.
Wong's Small Fortune Code Formula: YCWWong's Small Fortune (WSF) is a special type of annual fortune of a person. It is different from `Year Fortune' (YF). Wong's Small Fortune begins neither from the first day of year in Gregorian calendar nor the first day of the first month in Chinese lunar calendar. It begins from `Joint of February' and ends before `Joint of February' next year in Gregorian calendar. Normally, different people have different `Small Fortunes' in a year. In general, Wong's Small Fortune Co-ordinates are expressed as (U,Z). `U' is called the `Stem' of Wong's Small Fortune and `Z' is called the `Root' of Wong's Small Fortune. Let the `Sequence Code of Wong's Small Fortune Co-ordinates' be `SFC'. The values of `U' and `Z' can determine the `Sequence Code of Wong's Small Fortune Co-ordinates' by formula. On the contrary, the values of `U' and `Z' can be read from the table of `Sequence Code of Wong's Small Fortune Co-ordinates'. The `Sequence Code of Wong's Small Fortune Co-ordinates' (SFC) is also named as `Wong's Small Fortune Numerology' (N). Thus, N=SFC. `Wong's Small Fortune Code Formula' is also called `Wong's Small Fortune Numerology Formula'. `Wong's Small Fortune Code Formula' for people born in B.C. and A.D. is SFC=U+5[U-Z-1 (Mod 12)]. The Stem (U) and Root (Z) of `Wong's Small Fortune Co-ordinates' can be found from `Wong's Small Fortune Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12). In other words, The `Stem Formula' is U=N (Mod 10) and the `Root Formula' is Z=N-1 (Mod 12).There are two types of `Fortune Codes' of a person in a year. One is called the `Year Fortune Code'. It always moves clockwise following the number of year in Gregorian calendar after `Joint of Year'. `Joint of Year' is usually on 3-5th of February in Gregorian calendar. All people are same. The other one is `Wong's Small Fortune Code'. It is a special `Fortune Code' of a person in a year. It can move clockwise or anti-clockwise. Normally, people have different `Wong's Small Fortune Code' in a year. Asume the origin of `Wong's Small Fortune Co-ordinates' is at (Uo,Zo), where `Uo' and `Zo' are integers. `Wong's Small Fortune' of people is either spinning clockwise or anti-clockwise based on `Wong's Small Fortune Spin Mode' following the order of `Fortune Co-ordinates'. It starts to move from `Wong's Small Fortune Origin' at (Uo,Zo) to the next `Fortune Co-ordinates' on a yearly base. There are altogether two different types of `Wong's Small Fortune Spin Modes' (SM), namely `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). It varies according to the `Sex Code' (SC) of a person and the year of birth `y' in Gregorian calendar. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. Wong's Small Fortune Spin Mode Formula for people born in B.C. is SM=R[(&C[SC:m=0, f=1]+y-1)/2]. Wong's Small Fortune Spin Mode Formula for people born in A.D. is SM=R[(&C[SC:m=0, f=1]+y)/2]. Despite of people born in A.D. or B.C. and based on calculation of Wong's Small Fortune Spin Mode Formula, SM=0 means the spin mode is clockwise. If SM=1, it means the spin mode is anti-clockwise. Wong's Small Fortune recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. It starts to move from Wong's Small Fortune Origin (Uo,Zo) to next `Fortune Co-ordinates' (U,Z) on a yearly base. People who are classified as `SM=0' will increase the value of `Fortune Co-ordinates' clockwise and people who are classified as `SM=1' will decrease the value of `Fortune Co-ordinates' anti-clockwise. For `U' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all values in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Wong's Small Fortune Code'. Usually, `Wong's Small Fortune Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Wong's Small Fortune Co-ordinates'. For example, `N=3' or `N=03' means the third entry in the table of `Sequence Code of Wong's Small Fortune Co-ordinates' and `N=49' means it is the 49th entry. For easier time strap comparison by computer, `Wong's Small Fortune Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, the `Time Code' (TC) of 4:45 p.m. on 6th April of 1892 expressed in `Numerology' is `N=29410557' because the `Year Code' (YC) of 1892 is `I4' and N=29. The `Month Code' (MC) is `A4' and N=41. The `Day Code' (DC) is `E4' and N=5. The `Hour Code' (HC) is `G8' and N=57. In special cases, `Decade Fortune Code' (DeFC) and `Wong's Small Fortune Code' (SFC) could be added in front of a time code to show the fortune of a person. For example, the `Decade Fortune Code' (DeFC) of a person is `B1' and N=2. `Wong's Small Fortune Code' (SFC) of the person is `I2' and N=39. The `Time Code' of 6:35 p.m. on 27th August of 2015 is YC=B7 and N=32. MC=A8 and N=21. DC=B11 and N=12. HC=B9 and N=22. The `Fortune Code' (FC) is `N=023932211222'. Wong's Small Fortune Code can be expressed in six different ways. The commonest form of `Wong's Small Fortune Code' is to express as co-ordinates in (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11.Assume `Wong's Small Fortune Co-ordinates' are (U,Z) and (U,Z)=(6,1), find `Wong's Small Fortune Numerology' (N). `U=6' and `Z=1'. Applying Wong's Small Fortune Code Formula, `SFC=U+5[U-Z-1 (Mod 12)]', SFC=6+5[6-1-1 (Mod 12)]. SFC=6+5[4 (Mod 12)]. SFC=6+5x4. SFC=26. Since N=SFC, N=26. Thus, the `Sequence Code of Wong's Small Fortune Co-ordinates' (SFC) is 26 and `Wong's Small Fortune Numerology' (N) is 26. Besides Wong's Small Fortune Code can be expressed by SFC=(6,1), it can also be expressed as `SFC=F1', `SFC=6B', `SFC=FB' or `SFC=GAI-CHO'. Asume `Wong's Small Fortune Numerology' (N) is `07', find the Stem (U) and Root (Z) of `Wong's Small Fortune Co-ordinates' (U,Z). `N=07' means N=7. Applying the Stem and Root Formula, `U=N (Mod 10) & Z=N-1 (Mod 12)', U=7 (Mod 10) & Z=7-1 (Mod 12). U=7 & Z=6 (Mod 12). U=7 & Z=6. Hence, the Stem (U) of `Wong's Small Fortune Co-ordinates' is U=7 and the Root (Z) is Z=6. `Wong's Small Fortune Co-ordinates' are (7,6). Wong's Small Fortune Code (SFC) is `SFC=7'. `SFC=(7,6)' can also be expressed as `SFC=G6', `SFC=7G', `SFC=GG' or `SFC=GEN-NGG'. Asume `Wong's Small Fortune Numerology' (N) is `56', find the Stem (U) and Root (Z) of `Wong's Small Fortune Co-ordinates' (U,Z). N=56. Applying the Stem and Root Formula, `U=N (Mod 10) & Z=N-1 (Mod 12)', U=56 (Mod 10) & Z=56-1 (Mod 12). U=56-10x5 & Z=55 (Mod 12). U=6 & Z=55-12x4. U=6 & Z=7. Hence, the Stem (U) of `Wong's Small Fortune Co-ordinates' is U=6 and the Root (Z) is Z=7. `Wong's Small Fortune Co-ordinates' are (6,7). Wong's Small Fortune Code (SFC) is `SFC=56'. `SFC=(6,7)' can also be expressed as `SFC=F7', `SFC=6H', `SFC=FH' and `SFC=GAI-MEI'.
Wong's Small Fortune Set Formula: YSWWong's Small Fortune (WSF) is a special type of annual fortune of a person. It is different from `Year Fortune' (YF). Wong's Small Fortune begins neither from the first day of year in Gregorian calendar nor the first day of the first month in Chinese lunar calendar. It begins from `Joint of February' and ends before `Joint of February' next year in Gregorian calendar. Normally, different people have different `Small Fortunes' in a year. In general, Wong's Small Fortune Co-ordinates are expressed as (U,Z). `U' is called the `Stem' of Wong's Small Fortune and `Z' is called the `Root' of Wong's Small Fortune. `Small Fortune Code' recurs sexagesimally. `Small Fortune Codes' in modules of 60 with similar characteristics are grouped to form six groups. Each group is called a `Set'. There are altogether six `Small Fortune Sets'. Ten elements in the `Set' always bring disasters in two fixed directions and locations continually for ten years. `Small Fortune Set' is very special. The `Small Fortune Set Formula' can show the `Zone Numbers' of the hazardous locations. The damage is caused by a pair of `Yearon' twins, namely `Chn' and `Chn2'. The damage is very great and it lasts for ten years. Assume the age of a person is `a' and `n' is a non-negative integer, e.g. n=n=0,1,2,3,....... The actual age `A' in modules of 60 is A=a+60n. In other words, the difference of two ages must be a multiple of sixty. The `Sexagesimal Age Formula' is: A=a+60n. `Wong's Small Fortune Set Formula' is: YSW=10-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) & YSW2=11-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or YSW2=YSW+1 (Mod 12).`Wong's Small Fortune' of people is either spinning clockwise or anti-clockwise based on `Wong's Small Fortune Spin Mode' following the order of `Fortune Co-ordinates'. It starts to move from `Wong's Small Fortune Origin' at (Uo,Zo) to the next `Fortune Co-ordinates' on a yearly base. There are altogether two different types of `Wong's Small Fortune Spin Modes' (SM), namely `Clockwise Spin Mode' (CSM) and `Anti-clockwise Spin Mode' (ASM). It varies according to the `Sex Code' (SC) of a person and the year of birth `y' in Gregorian calendar. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. Wong's Small Fortune Spin Mode Formula for people born in B.C. is SM=R[(&C[SC:m=0, f=1]+y-1)/2]. Wong's Small Fortune Spin Mode Formula for people born in A.D. is SM=R[(&C[SC:m=0, f=1]+y)/2]. Despite of people born in A.D. or B.C. and based on calculation of Wong's Small Fortune Spin Mode Formula, SM=0 means the spin mode is clockwise. If SM=1, it means the spin mode is anti-clockwise. Wong's Small Fortune recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. It starts to move from Wong's Small Fortune Origin (Uo,Zo) to next `Fortune Co-ordinates' (U,Z) on a yearly base. People who are classified as `SM=0' will increase the value of `Fortune Co-ordinates' clockwise and people who are classified as `SM=1' will decrease the value of `Fortune Co-ordinates' anti-clockwise. For `U' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all values in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Wong's Small Fortune Code'. `R[y/n]' is a remainder function such that it takes the remainder of `y' divided by `n'. `n' is a natural number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11.Assume a male was born at 0:45 a.m. on 6th October of 1952, `Wong's Small Fortune Origin Code' is `C0'. Find `Wong's Small Fortune Set' (YSW) when his `Wong's Small Fortune Code' (SFC) is `F3' at 12:30 p.m. on 7th February of 1956 and the next sexagesimal actual age, `A'. Since `Wong's Small Fortune Code' (SFC) is `F3', `Wong's Small Fortune Co-ordinates' (U,Z) is (6,3) because `F' is the sixth alphabet. U=6 and Z=3. Applying `Wong's Small Fortune Set Formula', `YSW=10-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) & YSW2=11-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or YSW2=YSW+1 (Mod 12)', YSW=10-2xI[{6+5x[6-3-1 (Mod 12)]-1}/10] (Mod 12). YSW=10-2xI[{6+5x[2 (Mod 12)]-1}/10] (Mod 12). YSW=10-2xI[{6+5x2-1}/10] (Mod 12). YSW=10-2xI[15/10] (Mod 12). YSW=10-2xI[1.5] (Mod 12). YSW=10-2x1 (Mod 12). YSW=8 (Mod 12). YSW=8. YSW2=YSW+1 (Mod 12). YSW2=8+1 (Mod 12). YSW2=9 (Mod 12). YSW2=9. Since 12:30 p.m. on 7th February of 1956 is before birthday, the year is regarded as previous year. a=1955-1952. a=3. Apply the `Sexagesimal Age Formula', A=a+60n. If n=1, A=3+60x1. A=3+60. A=63. Hence, when age is 63, his `Wong's Small Fortune Set' (YSW) is same as 12:30 p.m. on 7th February of 1956. Assume a female was born at 1:06 a.m. on 12th August of 1959, `Wong's Small Fortune Origin Code' is `E0'. Find `Wong's Small Fortune Set' (YSW) when her `Wong's Small Fortune Code' (SFC) is `H9' at 4:20 a.m. on 26th July of 1993 and the next sexagesimal actual age, `A'. Since `Wong's Small Fortune Code' (SFC) is `H9', `Wong's Small Fortune Co-ordinates' (U,Z) is (8,9) because `H' is the eighth alphabet. U=8 and Z=9. Applying `Wong's Small Fortune Set Formula', `YSW=10-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) & YSW2=11-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or YSW2=YSW+1 (Mod 12)', YSW=10-2xI[{8+5x[8-9-1 (Mod 12)]-1}/10] (Mod 12). YSW=10-2xI[{8+5x[-2 (Mod 12)]-1}/10] (Mod 12). YSW=10-2xI[{8+5x[12-2]-1}/10] (Mod 12). YSW=10-2xI[{8+5x10-1}/10] (Mod 12). YSW=10-2xI[57/10] (Mod 12). YSW=10-2xI[5.7] (Mod 12). YSW=10-2x5 (Mod 12). YSW=0 (Mod 12). YSW=0. YSW2=YSW+1 (Mod 12). YSW2=0+1 (Mod 12). YSW2=1 (Mod 12). YSW2=1. Since 4:20 a.m. on 26th July of 1993 is before birthday, the year is regarded as previous year. a=1992-1959. a=33. Apply the `Sexagesimal Age Formula', A=a+60n. If n=1, A=33+60x1. A=33+60. A=93. Hence, when age is 93, her `Wong's Small Fortune Set' (YSW) is same as 4:20 a.m. on 26th July of 1993.
Wong's Small Bounds Formula: BOUNDS1WAssume the zone of `Wong's Small Bounds' is `S1'. The `Sex Code' of a person is `SC'. `m' stands for male and `f' stands for female. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `y1' is the year of birth of a person after `Joint of Year' in Gregorian calendar. `Joint of Year' is same as `Joint of February' which is on a date from 3rd to 5th of February. If the date of birth is before `Joint of Year', it is regarded as previous year. `y2' is the year of `Wong's Small Bounds' of a person after `Joint of Year' in Gregorian calendar. If the date of an event is before `Joint of Year', it is regarded as previous year. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `h' is the time of birth of a person reckoning on a 24-hour base. `a' is tha age of a person such that a=y2-y1. The `Wong's Small Bounds Formula' is S1=&C{SC=m:m-A[h/2]+a, SC=f:m-A[h/2]-a} (Mod 12). Since the zone of the `Soul' (S) of a person is `S=m-A[h/2] (Mod 12)' , `Wong's Small Bounds Formula' can be simplified as S1=&C{SC=m:S+a, SC=f:S-a} (Mod 12) where S=m-A[h/2] (Mod 12).`Wong's Small Bounds' is the focus of `Small Fortune' because it shows the fortune of one year by a zone of a person. The `Lower Bound' of `Wong's Small Bounds' is regarded as the first day of the year in `Prediction Technology and Forensic Mathematics' (PT&FM). It always begins at `Joint of Year', usually on 3-5th of February. The `Upper Bound' of `Wong's Small Bounds' is the last minute on the last day just before next `Joint of Year'. Thus, the duration of human fortune in `Wong's Small Bounds' is one year. The `Timeons' in the zone can reveal the fortune of a person in that year. No matter male or female, `Wong's Small Bounds' of a baby before age one always coincides with the zone of `Soul'. Thus, the fortune of a baby before age one is very crucial because it is closely related to `Soul'. For male, `Wong's Small Bounds' always spins clockwise according to the order of the zones starting from his `Soul'. `Wong's Small Bounds' moves to the next zone annually. For female, `Wong's Small Bounds' always spins anti-clockwise according to the reverse order of the zones starting from her `Soul'. `Wong's Small Bounds' moves to the next zone in reverse order annually. The `Time Interval' of a zone is one year. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `S1=(Mod 12)' is a modulated function such that if S1>11 then `S1' becomes `S1-12' and if S1<0 then `S1' becomes `S1+12'. Thus, the value range of `S1=(Mod 12)' is from 0 to 11.Assume a male was born at 0:45 a.m. on 6th Oct., A.D.1952. Find the zone of `Wong's Small Bounds' of him at 12:30 p.m. on 7th Feb., A.D.1956. From the given data, the client is male. So, `Sex Code' is SC=m. Since the date of event at 12:30 p.m. on 7th Feb.,1956 is after `Joint of Year' at 4:13 a.m. on 5th Feb.,1956, the year number is current year. y2=1956. Since the date of birth of the client at 0:45 a.m. on 6th Oct.,1952 is after `Joint of Year' at 4:53 a.m. on 5th Feb.,1952, the year number is current year. y1=1952. His age is a=y2-y1. a=1956-1952. a=4. Since `Joint of October' is at 4:33 p.m. on 8th Oct., A.D.1952, the birthday of the client is before `Joint of October'. It is regarded as previous month. Hence, m=9. h=0+45/60, h=0.75. Apply `Wong's Small Bounds Formula', S1=&C{SC=m:m-A[h/2]+a, SC=f:m-A[h/2]-a} (Mod 12). The zone of `Wong's Small Bounds' is S1=m-A[h/2]+a (Mod 12). S1=9-A[0.75/2]+4 (Mod 12). S1=9-A[0.375]+4 (Mod 12). S1=9-0+4 (Mod 12). S1=13 (Mod 12). S1=13-12. S1=1. If a female was born at 8:45 p.m. on 26th Jan., A.D.1997. Find the zone of `Wong's Small Bounds' of her at 7:15 a.m. on 3rd Jan., A.D.2020. From the given data, the client is female. So, `Sex Code' is SC=f. Since the date of event at 7:15 a.m. on 3rd Jan.,2020 is before `Joint of Year' at 5:18 p.m. on 4th Feb.,2020, the year is regarded as previous year. y2=2019. Since the date of birth of the client at 8:45 p.m. on 26th Jan.,1997 is before `Joint of Year' at 3:04 a.m. on 4th Feb.,1997, the year is regarded as previous year. y1=1996. Her age is a=y2-y1. a=2019-1996. a=23. Since `Joint of January' is at 3:22 p.m. on 5th Jan., A.D.1997, the birthday of the client is after `Joint of January'. It is regarded as current month. Hence, m=1. h=20+45/60, h=20.75. Apply `Wong's Small Bounds Formula', S1=&C{SC=m:m-A[h/2]+a, SC=f:m-A[h/2]-a} (Mod 12). The zone of `Wong's Small Bounds' is S1=m-A[h/2]-a (Mod 12). S1=1-A[20.75/2]-23 (Mod 12). S1=1-A[10.375]-23 (Mod 12). S1=1-10-23 (Mod 12). S1=-32 (Mod 12). S1=12x3-32. S1=4.
Month Fortune Origin Formula: UN2The `Month Fortune Origin Formula' for people born in B.C. is `UN2=3+m+12(1-y) (Mod 10) & ZN2=m (Mod 12)'. The `Month Fortune Origin Formula' for people born in A.D. is `UN2=3+m+12y (Mod 10) & ZN2=m (Mod 12)'. If `y' is the year and `m' is the month of a person born in Gregorian calendar, the `Month Fortune Co-ordinates' (G,C) calculated are called the `Origin of Month Fortune Co-ordinates'. The origin of `Month Fortune Co-ordinates' are at (UN2,ZN2), where the value of `ZN2' is approximately equal to the solar month, `m', but the beginning of a new month for `ZN2' is not exactly on the first day of a solar month. The critical value between two consecutive months for `ZN2' is called `Joint of Month'. `Joint of Month' is the boundary of two consecutive months. It always lies on from the 3rd to 8th day of a solar month. In general, not for precise calculations, `Joint of Month' can be regarded as the 6th day of a month. If the date is within the 3rd to 8th day of a solar month, precise calculations should be carried out. That is, if the time of a date is after `Joint of Month', the month is `m'. If the time of a date is before `Joint of Month', the month is `m-1 (Mod 12)'. The time and date of `Joint of Month' between two consecutive solar months always change from month to month. `Joint of Month' also varies according to the longitude and latitude of a place. The exact date and time of a `Joint of Month' can be found in a Chinese lunar calendar.The `Origin of Month Fortune Co-ordinates' (UN2,ZN2) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Month Code' of a person. The `Origin of Month Fortune Co-ordinates' (UN2,ZN2) is the starting point of one's `Month Fortune Co-ordinates' (G,C). No matter male or female, the `Month Fortune' of a person follows the order of `Fortune Co-ordinates' and it always moves to the next pair of co-ordinates in the next month clockwise. For `UN2' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `ZN2' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of a month is called the `Month Fortune Code' or `Month Code'. `UN2=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If UN2>10 then `UN2' becomes `UN2-10' and if UN2<1 then `UN2' becomes `UN2+10'. Thus, the value range of `UN2=(Mod 10)' is from 1 to 10. `ZN2=(Mod 12)' is a modulated function such that if ZN2>11 then `ZN2' becomes `ZN2-12' and if ZN2<0 then `ZN2' becomes `ZN2+12'. Thus, the value range of `ZN2=(Mod 12)' is from 0 to 11.Assume a person was born on 9th Dec., A.D.2008. Then, y=2008 and m=12. Apply the `Month Fortune Origin Formula'. UN2=3+12+12x2008 (Mod 10). UN2=24111 (Mod 10). UN2=24111-2411x10. UN2=1. ZN0=m (Mod 12). ZN2=12 (Mod 12). ZN2=12-12. ZN2=0. Hence, the `Origin of Month Fortune Co-ordinates' (UN2,ZN2) are (1,0). The `Month Code' is `01', `A1', `1A', `AA' or `GAP-CHI'.
Month Fortune Formula: GC2The Month Fortune Formula for people born in B.C. is `G2=3+m+12(1-y) (Mod 10) & C2=m (Mod 12)'. The Month Fortune Formula for people born in A.D. is `G2=3+m+12y (Mod 10) & C2=m (Mod 12)'. If `y' is the year and `m' is the month of a person's fortune in Gregorian calendar, the result calculated by the formula is called the `Month Fortune Co-ordinates' of the person. The `Month Fortune Co-ordinates' are expressed as (G2,C2), where the value of `C2' is approximately equal to the solar month, `m', but the beginning of a new month is not the first day of the month. The critical value between two consecutive months is called `Joint of Month'. `Joint of Month' is the boundary of two consecutive months. It always lies on from the 3rd to 8th day of a solar month. In general, not for precise calculations, `Joint of Month' can be regarded as the 6th day of a month. If the date is within the 3rd to 8th day of a solar month, precise calculations should be carried out. That is, if the time of a date is after `Joint of Month', the month is `m'. If the time of a date is before `Joint of Month', the month is `m-1 (Mod 12)'. The time and date of `Joint of Month' between two consecutive solar months always change from month to month. `Joint of Month' also varies according to the longitude and latitude of a place. The exact date and time of a `Joint of Month' can be found in a Chinese lunar calendar.If `y' is the year and `m' is the month of a person born in Gregorian calendar, the `Month Fortune Co-ordinates' calculated are called the `Origin of Month Fortune Co-ordinates', (UN2,ZN2). The origin of `Month Fortune Co-ordinates' is the starting point of one's `Month Fortune Co-ordinates'. The `Month Fortune' of a person follows the order of `Fortune Co-ordinates' and it moves to the next pair of co-ordinates in next month. The `Month Fortune' is revolving around in one direction only. It always revolves clockwise and repeats in 60 `Fortune Co-ordinates' (G2,C2), where `G2' and `C2' are integers. When the `Month Fortune' of a person starts to move from the origin of `Month Fortune Co-ordinates' (UN2,ZN2) and it comes across `Joint of Month' of two consecutive months, it shifts to the next `Month Fortune Co-ordinates'. `G2=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G2>10 then `G2' becomes `G2-10' and if G2<1 then `G2' becomes `G2+10'. Thus, the value range of `G2=(Mod 10)' is from 1 to 10. `C2=(Mod 12)' is a modulated function such that if C2>11 then `C2' becomes `C2-12' and if C2<0 then `C2' becomes `C2+12'. Thus, the value range of `C2=(Mod 12)' is from 0 to 11.Assume to find the month code of 15th Jan., A.D.1994. Since the date is after `Joint of January' on 5th Jan., A.D.1994, the month is January. m=1 and y=1994. Apply the `Month Fortune Formula'. G2=3+1+12x1994 (Mod 10). G2=23932 (Mod 10). G2=23932-2393x10. G2=2. C2=m (Mod 12). C2=1 (Mod 12). C2=1. Hence, the `Month Fortune Co-ordinates' (G2,C2) are (2,1). The `Month Code' is `02', `B1', `2B', `BB' or `EUT-CHO'.
Month Code Formula: MCAssume the `Month Fortune Co-ordinates' are (U,Z) and the `Sequence Code of Month Fortune Co-ordinates' is `MC'. The `Sequence Code of Fortune Co-ordinates' is also named as the `Numerology'. `U' is called the `Stem' of month and `Z' is called the `Root' of month. The values of `U' and `Z' can determine the `Sequence Code of Month Fortune Co-ordinates' by formula. On the contrary, the values of Stem (U) and Root (Z) can be read from the table of `Sequence Code of Month Fortune Co-ordinates'. The `Sequence Code of Month Fortune Co-ordinates' is also named as `Month Numerology' (N). Thus, N=MC. The `Month Code Formula' is also called `Month Numerology Formula'. The `Month Code Formula' is `MC=5x{11-[(Z-U) (Mod 12)]}+U'. If the `Numerology' of `Month Code' (MC) is `N' and N=MC, the Stem (U) and Root (Z) Formulae of Month is `U=N (Mod 10) & Z=N-1 (Mod 12)'.No matter male or female, the monthly fortune of a person always starts from the `Month Fortune Co-ordinates' at birth (UN2,ZN2). The monthly fortune of a person follows the order of `Fortune Co-ordinates' (U,Z) and it always moves to the next pair of co-ordinates in the next month. Everybody's `Month Fortune' revolves clockwise and shifts to the next after `Joint of Month' of each month of a place according to the `Sequence Code of Fortune Co-ordinates' on a monthly base. The `Month Fortune' repeats in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. For `U' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Month Codes'. Usually, `Month Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Month Fortune Co-ordinates'. For example, `N=2' or `N=02' means the second entry in the table of `Sequence Code of Month Fortune Co-ordinates' and `N=55' means it is the 55th entry. For easier time strap comparison by computer, the `Month Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=2831' stands for `H3(year)A6(month)'. The month is June, 2011. `N=1225' stands for `B11E0'. The month is Dec., 1995. A `Month Code' can be expressed in six different ways. The commonest form is to express the `Month Code' as `Month Fortune Co-ordinates', (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `(Z-U)=(Mod 12)' is a modulated function such that if (Z-U)>11 then `(Z-U)' becomes `(Z-U)-12' and if (Z-U)<0 then `(Z-U)' becomes `(Z-U)+12'. Thus, the value range of `(Z-U)=(Mod 12)' is from 0 to 11.If the `Month Fortune Co-ordinates' are (6,1), apply the `Month Code Formula'. MC=5x{11-[(Z-U) (Mod 12)]}+U. MC=5x{11-[(1-6) (Mod 12)]}+6. MC=5x{11-[12+1-6]}+6. MC=5x{11-7}+6. MC=20+6. MC=26. Thus, the `Sequence Code of Month Co-ordinates' of (6,1) is `26'. Besides, the `Month Code' of `MC=26' can also be expressed as `MC=(6,1)', `MC=F1', `MC=6B', `MC=FB' and `MC=GAI-CHO'. If the `Numerology' (N) of `Month Code' (MC) is 35, find the Stem (U) and Root (Z) of `Month Fortune'. Apply the Stem (U) and Root (Z) Formulae of Month. U=N (Mod 10) & Z=N-1 (Mod 12). U=35 (Mod 10) & Z=35-1 (Mod 12). U=35-10x3 & Z=34 (Mod 12). U=5 & Z=12x3-34. U=5 & Z=2. Thus, the Stem (U) of `Month Fortune' is `E'. The Root (Z) of `Month Fortune' is 2. The `Month Co-ordinates' are (5,2). The `Month Code' (MC) can also be expressed as `MC=E2',`MC=5C',`MC=EC' and `MC=MOO-YAN'.
Month Set Formula: MSThe `Month Set Formula' is used to find the set of sexagesimal months by a `Month Code' in a set of sexagesimal years with same `Year Code' in Gregorian calendar. `y' is the solar year after `Joint of February', roughly on 4th of February in Gregorian calendar, and `m' is the solar month after `Joint of Month'. If the date is before `Joint of Month', the value of `m' is equal to previous month. Assume the `Month Code' (MC) is (U,Z). The Month Set Formula is: m=Z (Mod 12)In the `Month Code' (U,Z), `U' is called the `Stem' of the `Month Code' and `Z' is called the `Root' of the `Month Code'. The value of `U' shows the alphabetical order of the letter that it represents. For example, U=6 means `F'. In `Prediction Technology and Forensic Mathematics' (PT&FM), the value of `Z' is the solar month. It shows the location and direction of the root of the month. It relates to the weather conditions in four seasons of a year. The location and direction of the root of the month equal to the zone in the space of the universe. `m=(Mod 12)' is a modulated function such that if m>12 then `m' becomes `m-12' and if m<1 then `m' becomes `m+12'. Thus, the value range of `m=(Mod 12)' is from 1 to 12. The `Month Code' (MC) can be found from the table of `Sequence Code of Month Co-ordinates' by the `Month Co-ordinates' (U,Z).If the codes of a time strap of a month in a specified year y=1958 is `E10F7', find the month in Gregorian calendar. The year code YC=E10 and it can represent y=1958. The `Month Code' (MC) is `F7' and `F' stands for the stem (U) of month U=6 because `F' is the sixth letter in alphabetical order. The root (Z) of month is Z=7. Apply the formula m=Z (Mod 12). m=7 (Mod 12). m=7. It means the seventh month in the solar year. It is July. If the codes of a time strap of a month in a specified year y=2004 is `A8C0', find the month in Gregorian calendar. The year code YC=A8 and it can represent y=2004. The `Month Code' (MC) is `C0' and `C' stands for the stem (U) of month U=3 because `C' is the third letter in alphabetical order. The root (Z) of month is Z=0. Apply the formula m=Z (Mod 12). m=0 (Mod 12). m=0+12. m=12. It means the twelfth month in the solar year. The month is December.
Day Fortune Origin Formula: UN3In general, the `Origin of Day Fortune Co-ordinates' is expressed as (UN3,ZN3). No matter male or female, the origin of `Day Fortune' of a person is the `Day Fortune Co-ordinates' of birthday. As the value of `UN3' always repeats in every 10 days and the value of `ZN3' always repeats in every 12 days, the value of `UN3' can be determined by using a modulated function of 10 and the value of `ZN3' can be determined by using a modulated function of 12, reckoning in the Gregorian calendar from 1st January of 1. A year of Gregorian calendar, also known as Gregorian calendar, is based on the Earth's orbit revolving around the Sun once for 365.24219 days. It is about 365 and one quarter days for one year. So, in Gregorian calendar there are 365 days in 3 ordinary years and 366 days in the fourth year which is called a leap year. Compared with the tropical years, there is only 1 day of deviation for every 400 years in the Gregorian calendar. Therefore, there is no leap year in every century except those divisible by 400. This makes the average of 365.2425 days in a year of the Gregorian calendar and it deviates only 1 day for 3225.8 years when comparing with the tropical years. Assume `y' is the number of years reckoning in Gregorian calendar and `d' is the number of days reckoning from 1st January in the year of a person's birthday in Gregorian calendar. The `Day Fortune Origin Formula' is `UN3=5+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 10) & ZN3=2+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 12)'. [Remarks: The `Day Fortune Co-ordinates' of 1st January of 1898, 1921, 1944, 2001 & 2024 are (1,0).]The `Origin of Day Fortune Co-ordinates' (UN3,ZN3) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Day Code' of a person. No matter male or female, the `Day Fortune Co-ordinates' (G,C) always spin clockwise. It starts to move from the origin at (UN3,ZN3) to the next `Day Fortune Co-ordinates' (G,C) on a daily base. For `UN3' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `ZN3' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. If the number of days calculated by the formula is divisible by 10, then UN3=10 and `UN3' is `J' because `UN3=10' stands for `J' in the `Fortune Code'. If it is divisible by 12, then ZN3=0 and `ZN3' is `A' because `ZN3=0' stands for `A' in the `Fortune Code'. The `Fortune Code' of a day is called the `Day Fortune Code' or `Day Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `UN3=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If UN3>10 then `UN3' becomes `UN3-10' and if UN3<1 then `UN3' becomes `UN3+10'. Thus, the value range of `UN3=(Mod 10)' is from 1 to 10. `ZN3=(Mod 12)' is a modulated function such that if ZN3>11 then `ZN3' becomes `ZN3-12' and if ZN3<0 then `ZN3' becomes `ZN3+12'. Thus, the value range of `ZN3=(Mod 12)' is from 0 to 11.Assume a person was born on 1st January of 1898. Find the `Origin of Day Fortune Co-ordinates' (UN3,ZN3). As y=1898 and d=1, apply the `Day Fortune Origin Formula'. UN3=5+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 10) & ZN3=2+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 12). UN3=5+365(1898-1)+I[(1898-1)/4]-I[(1898-1)/100]+I[(1898-1)/400]-I[(1898-1)/3225]+1 (Mod 10). UN3=5+692405+I[474.25]-I[18.97]+I[4.7425]-I[0.5882]+1 (Mod 10). UN3=5+692405+474-18+4-0+1 (Mod 10). UN3=692871 (Mod 10). UN3=1. ZN3=2+365(1898-1)+I[(1898-1)/4]-I[(1898-1)/100]+I[(1898-1)/400]-I[(1898-1)/3225]+1 (Mod 12). ZN3=2+692405+I[474.25]-I[18.97]+I[4.7425]-I[0.5882]+1 (Mod 12). ZN3=2+692405+474-18+4-0+1 (Mod 12). ZN3=692868 (Mod 12). ZN3=0. Hence, the `Origin of Day Fortune Co-ordinates' of a person born on 1st January of 1898 is (1,0). The `Day Code' is `01', `A0', `1A', `AA' or `GAP-CHI'. Assume a person was born on 25th May of 2010. Find the `Origin of Day Fortune Co-ordinates' (UN3,ZN3). As y=2010 and d=31+28+31+30+25, d=145, apply the `Day Fortune Origin Formula'. UN3=5+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 10) & ZN3=2+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 12). UN3=5+365(2010-1)+I[(2010-1)/4]-I[(2010-1)/100]+I[(2010-1)/400]-I[(2010-1)/3225]+145 (Mod 10). UN3=5+733285+I[502.25]-I[20.09]+I[5.0225]-I[0.6229]+145 (Mod 10). UN3=5+733285+502-20+5-0+145 (Mod 10). UN3=733922 (Mod 10). UN3=2. ZN3=2+365(2010-1)+I[(2010-1)/4]-I[(2010-1)/100]+I[(2010-1)/400]-I[(2010-1)/3225]+145 (Mod 12). ZN3=2+733285+I[502.25]-I[20.09]+I[5.0225]-I[0.5882]+145 (Mod 12). ZN3=2+733285+502-20+5-0+145 (Mod 12). ZN3=733919 (Mod 12). ZN3=11. Hence, the `Origin of Day Fortune Co-ordinates' of a person born on 25th May of 2010 is (2,11). The `Day Code' is `12', `B11', `2L', `BL' or `EUT-HOI'.
Day Fortune Formula: GC3In general, the `Day Fortune Co-ordinates' are expressed as (G3,C3), where `G3' and `C3' are integers. Since, `G3' always oscillates in a loop of 10 and `C3' always oscillates in a loop of 12, the `Day Fortune Co-ordinates' reckoning from 1st January of 1 can be determined mathematically by modulated functions of 10 and 12 with some constants as adjustments. That is `G3=(Mod 10)' and `C3=(Mod 12)'. For `G3' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. If the number of days calculated by the formula is divisible by 10, then G3=10 and `G3' is `J' because `G3=10' stands for `J' in the `Fortune Code'. For `C3' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. If it is divisible by 12, then C3=0 and `C3' is `A' because `C3=0' stands for `A' in the `Fortune Code'. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are known as `Day Fortune Codes' or `Day Codes'. The `Day Fortune Code' is the `Fortune Code' of a day. Assume `y' be the number of years reckoning in Gregorian calendar of a date and `d' be the number of days reckoning from 1st January of that year in Gregorian calendar. The `Day Fortune Formula' is `G3=5+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 10) & C3=2+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 12)'. [Remarks: The `Day Fortune Co-ordinates' of 1st January of 1898, 1921, 1944, 2001 & 2024 are (1,0). ]If the result is calculated from the birthday of a person, the `Day Fortune Co-ordinates' (G3,C3) are exactly the same as the `Origin of Day Fortune Co-ordinates' (UN3,ZN3). The daily fortune of a person starts to shift from the `Origin of Day Fortune Co-ordinates' at (UN3,ZN3) to the next `Day Fortune Co-ordinates' after the midnight at the location of the person. It always spins clockwise on a daily base. The `Day Fortune Co-ordinates' oscillate in a loop of 60. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `G3=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G3>10 then `G3' becomes `G3-10' and if G3<1 then `G3' becomes `G3+10'. Thus, the value range of `G3=(Mod 10)' is from 1 to 10. `C3=(Mod 12)' is a modulated function such that if C3>11 then `C3' becomes `C3-12' and if C3<0 then `C3' becomes `C3+12'. Thus, the value range of `C3=(Mod 12)' is from 0 to 11.Assume to find the `Day Fortune Co-ordinates' (G3,C3) of 6th October, 1952. Then y=1952 and d=31+29+31+30+31+30+31+31+30+6. d=280. Apply the `Day Fortune Formula'. G3=5+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 10) & C3=2+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 12). G3=5+365(1952-1)+I[(1952-1)/4]-I[(1952-1)/100]+I[(1952-1)/400]-I[(1952-1)/3225]+280 (Mod 10). G3=5+712115+I[487.75]-I[19.51]+I[4.8775]-I[0.605]+280 (Mod 10). G3=5+712115+487-19+4-0+280 (Mod 10). G3=712872 (Mod 10). G3=2. C3=2+365(1952-1)+I[(1952-1)/4]-I[(1952-1)/100]+I[(1952-1)/400]-I[(1952-1)/3225]+280 (Mod 12). C3=2+712115+I[487.75]-I[19.51]+I[4.8775]-I[0.605]+280 (Mod 12). C3=2+712115+487-19+4-0+280 (Mod 12). C3=712869 (Mod 12). C3=9. Hence, the `Day Fortune Co-ordinates' (G3,C3) of 6th October of 1952 is (2,9). The `Day Code' of 6th October of 1952 is `22', `B9', `2J', `BJ' or `EUT-YAU'.
Day Code Formula: DCAssume the `Day Fortune Co-ordinates' are (U,Z) and the `Sequence Code of Day Fortune Co-ordinates' is `DC'. The values of `U' and `Z' can determine the `Sequence Code of Day Fortune Co-ordinates' by the formula. On the contrary, the values of `U' and `Z' can be read from the table of `Sequence Code of Day Fortune Co-ordinates'. The `Sequence Code of Day Fortune Co-ordinates' is also named as `Day Numerology' (N). Thus, N=DC. The `Day Code Formula' is also called `Day Numerology Formula'. If `y' is the number of years reckoning in Gregorian calendar and `d' is the number of days reckoning from 1st January of that year in Gregorian calendar, the `Sequence Code of Day Fortune Co-ordinates' (DC) can be calculated directly from a given date. The `Day Code Formula' is `DC=5x{11-[(Z-U) (Mod 12)]}+U' or `DC=15+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 60)'. The Stem (U) and Root (Z) of `Fortune Co-ordinates' can be found from the `Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12).No matter male or female, the daily fortune of a person always starts from the `Day Fortune Co-ordinates' at birth (UN3,ZN3). The daily fortune of a person follows the order of `Fortune Co-ordinates' (U,Z) and it always moves to the next pair of co-ordinates in the next day. Everybody's `Day Fortune' spins clockwise and shifts to the next after passing the midnight of a place according to the `Sequence Code of Fortune Co-ordinates' on a daily base. The `Day Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. For `U' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Day Codes'. Usually, `Day Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Day Fortune Co-ordinates'. For example, `N=7' or `N=07' means the seventh entry in the table of `Sequence Code of Day Fortune Co-ordinates' and `N=13' means it is the 13th entry. For easier time strap comparison by computer, the `Day Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=283138' stands for `H3(year)A6(month)H1(day)'. The date is 15th June, 2011. `N=122522' stands for `B11E0B9'. The date is 20th Dec., 1995. A `Day Code' can be expressed in six different ways. The commonest form is to express the `Day Code' as `Day Fortune Co-ordinates', (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `(Z-U)=(Mod 12)' is a modulated function such that if (Z-U)>11 then `(Z-U)' becomes `(Z-U)-12' and if (Z-U)<0 then `(Z-U)' becomes `(Z-U)+12'. Thus, the value range of `(Z-U)=(Mod 12)' is from 0 to 11. `DC=(Mod 60)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 60. If DC>60 then `DC' becomes `DC-60' and if DC<1 then `DC' becomes `DC+60'. Thus, the value range of `DC=(Mod 60)' is from 1 to 60. If the `Day Fortune Co-ordinates' are (10,5), apply the `Day Code Formula'. DC=5x{11-[(Z-U) (Mod 12)]}+U. DC=5x{11-[(5-10) (Mod 12)]}+10. DC=5x{11-[12+5-10]}+10. DC=5x{11-7}+10. DC=20+10. DC=30. Thus, the `Sequence Code of Day Fortune Co-ordinates' of (10,5) is `30'. Besides, the `Day Code' of `DC=30' can also be expressed as `DC=(10,5)', `DC=J5', `DC=10F', `DC=JF' and `DC=QUI-CHJ'. Assume to find the `Sequence Code of Day Fortune Co-ordinates' of 12th May, 2011. Given that y=2011 and d=31+28+31+30+12, d=132. Apply the `Day Code Formula'. DC=15+365(y-1)+I[(y-1)/4]-I[(y-1)/100]+I[(y-1)/400]-I[(y-1)/3225]+d (Mod 60). DC=15+365(2011-1)+I[(2011-1)/4]-I[(2011-1)/100]+I[(2011-1)/400]-I[(2011-1)/3225]+132 (Mod 60). DC=15+733650+I[502.5]-I[20.1]+I[5.025]-I[0.6233]+132 (Mod 60). DC=15+733650+502-20+5-0+132 (Mod 60). DC=734284 (Mod 60). DC=4. Hence, the `Sequence Code of Day Fortune Co-ordinates' of 12th May, 2011, is 4. The `Day Fortune Co-ordinates' are (4,3). The `Day Code' can also be expressed as `DC=D3', `DC=4D', `DC=DD' and `DC=DIM-MOU'. If the `Numerology' is 17, N=17, find the Stem (U) and Root (Z) of the `Day Fortune Co-ordinates'. Apply the `Stem & Root Formulae'. U=17 (Mod 10) & Z=17-1 (Mod 12). U=17-10 & Z=16 (Mod 12). U=7 & Z=16-12. U=7 and Z=4. Thus, the Stem (U) of `Day Fortune Co-ordinates' is 7 and the Root (Z) of `Day Fortune Co-ordinates' is 4. The `Day Fortune Co-ordinates' are (7,4). Since the Day Code (DC) is same as `Sequence of Day Numerology' (N), DC=17 and DC=(7,4). The Day Code (DC) can also be expressed as `DC=G4', `DC=7E', `DC=GE' or `DC=GEN-SEN'.
Day Set Formulae: DSThe `Day Set Formulae' are used to find the set of sexagesimal days by a `Day Code' in a set of sexagesimal years with same `Year Code' in Gregorian calendar. `y' is the solar year after `Joint of February', roughly on 4th of February in Gregorian calendar, and `m' is the solar month after `Joint of Month'. If the date is before `Joint of Month', the value of `m' is equal to previous month. Assume the `Day Code' (DC) is (U,Z) and `d' is the number of days counting from 1st of January of the year (y). `d1' is the value of `d' calculated from the value of Stem of Day (UD) and `d2' is the value of `d' calculated from the value of Root of Day (ZD). If d1=d2 and the months (m) are same, the two dates belong to same `Day Set'. The Day Set Formulae are: d1=U+5-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 10) & d2=Z+10-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 12)In the `Day Code' (U,Z), `U' is called the `Stem' of the `Day Code' and `Z' is called the `Root' of the `Day Code'. The value of `U' shows the alphabetical order of the letter that it represents. For example, U=4 means `D'. The value of `Z' is the root of the day. It shows the location and direction of the day. The root of the day is equal to the zone in the space of the universe. `d=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If d>10 then `d' becomes `d-10' and if d<1 then `d' becomes `d+10'. Thus, the value range of `d=(Mod 10)' is from 1 to 10. `d=(Mod 12)' is another modulated function such that if d>12 then `d' becomes `d-12' and if d<1 then `d' becomes `d+12'. Thus, the value range of `d=(Mod 12)' is from 1 to 12. The `Day Code' (DC) can be found from the table of `Sequence Code of Day Co-ordinates' by the `Day Co-ordinates' (U,Z).If the codes of a time strap of a date in a specified year y=1958 is `E10F7D11', find the date in Gregorian calendar. The year code YC=E10 and it can represent y=1958. The `Month Code' (MC) is `F7' and `7' stands for the root of month. It means the 7th month in Gregorian calendar. That is July. So, m=7. Note that, when m=7, it means all possible dates are the days after `Joint of July' and before `Joint of August'. The `Day Code' (DC) is `D11' and `D' stands for the stem (U) of day U=4 because `D' is the fourth letter in alphabetical order. The root (Z) of day is Z=11. Applying 1st formula, U=4 & y=1958, d1=4+5-365(1958-1)-I[(1958-1)/4]+I[(1958-1)/100]-I[(1958-1)/400]+I[(1958-1)/3225] (Mod 10). d1=9-365x1957-I[1957/4]+I[1957/100]-I[1957/400]+I[1957/3225] (Mod 10). d1=9-714305-I[489.25]+I[19.57]-I[4.89]+I[0.60] (Mod 10). d1=9-714305-489+19-4+0 (Mod 10). d1=-714770 (Mod 10). Since the number of days is 181 days (i.e. 31 days for January, 28 days for February, 31 days for March, 30 days for April, 31 days for May and 30 days for June), counting from the beginning of the year to 30th June of 1958, d1=(31+28+31+30+31+30)-714770-181 (Mod 10). d1=181-714951 (Mod 10). d1=181+(71496x10-714951)+10n. d1=181+9+10n, where `n' is a non-negative integer. If n=0, d1=190. Counting from 1st January of 1958 by 190 days, it is 9th July of 1958. If n=1, d1=200. Counting from 1st January of 1958 by 200 days, it is 19th July of 1958. If n=2, d1=210. Counting from 1st January of 1958 by 210 days, it is 29th July of 1958. If n=3, d1=220. Counting from 1st January of 1958 by 220 days, it is 8th August of 1958. `Joint of August' is on 8th August, 1958. If the date is before the time of `Joint of August', the root of month is still regarded as 7 (i.e. m=7). In that case, the date of 8th August, 1958 is also in the set of possible solutions. Applying 2nd formula, Z=11 & y=1958, d2=11+10-365(1958-1)-I[(1958-1)/4]+I[(1958-1)/100]-I[(1958-1)/400]+I[(1958-1)/3225] (Mod 12). d2=21-365x1957-I[1957/4]+I[1957/100]-I[1957/400]+I[1957/3225] (Mod 12). d2=21-714305-I[489.25]+I[19.57]-I[4.89]+I[0.60] (Mod 12). d2=21-714305-489+19-4+0 (Mod 12). d2=-714758 (Mod 12). d2=(31+28+31+30+31+30)-714758-181 (Mod 12). d2=181-714939 (Mod 12). d2=181+(59579x12-714939)+12n. d2=181+9+12n, where `n' is a non-negative integer. If n=0, d2=190. The date is 9th July, 1958. Since the date of 9th July, 1958 is consistent with the 1st and 2nd Day Set Formulae, the day code `D11' stands for 9th July of 1958. If the codes of a time strap of a date in a specified year y=1958 is `E10F7J1', find the date in Gregorian calendar. Applying 1st formula , U=10 & y=1958, d1=10+5-365(1958-1)-I[(1958-1)/4]+I[(1958-1)/100]-I[(1958-1)/400]+I[(1958-1)/3225] (Mod 10). d1=15-365x1957-I[1957/4]+I[1957/100]-I[1957/400]+I[1957/3225] (Mod 10). d1=15-714305-I[489.25]+I[19.57]-I[4.89]+I[0.60] (Mod 10). d1=15-714305-489+19-4+0 (Mod 10). d1=-714764 (Mod 10). Since the number of days is 181 days counting from the beginning of the year 1958 to 30th June. d1=(31+28+31+30+31+30)-714764-181 (Mod 10). d1=181-714945 (Mod 10). d1=181+(71495x10-714945)+10n. d1=181+5+10n, where `n' is a non-negative integer. The possible date with day code `J1' is a day counting from 1st January of 1958 by 186 days or any date consistent with m=7 and d1=181+5+10n. If n=0, d1=186. The date is 5th July, 1958. The date cannot be 5th of July because 5th of July is before `Joint of July', 7th July of 1958. If n=1, then d1=196. The date is 15th July, 1958. If n=2, then d1=206. The date is 25th July, 1958. If n=3, then d1=216. The date is 4th August, 1958. Note that the date of 4th August, 1958 is before `Joint of August', 8th August of 1958 and the root of the month is regarded as 7 (i.e. m=7). So, the possible dates are 15th July, 25th July and 4th August of 1958. Applying 2nd formula, Z=1 & y=1958, d2=1+10-365(1958-1)-I[(1958-1)/4]+I[(1958-1)/100]-I[(1958-1)/400]+I[(1958-1)/3225] (Mod 12). d2=11-365x1957-I[1957/4]+I[1957/100]-I[1957/400]+I[1957/3225] (Mod 12). d2=11-714305-I[489.25]+I[19.57]-I[4.89]+I[0.60] (Mod 12). d2=11-714305-489+19-4+0 (Mod 12). d2=-714768 (Mod 12). d2=(31+28+31+30+31+30)-714768-181 (Mod 12). d2=181-714949 (Mod 12). d2=181+(59580x12-714949)+12n. d2=181+11+12n, where `n' is a non-negative integer. The possible date with day code `J1' is a date counting from 1st January of 1958 by 192 days or any date consistent with m=7 and d2=181+11+12n. If n=0, then d2=192. The date is 11th July, 1958. If n=1, then d2=204. The date is 23rd July, 1958. If n=2, then d2=216. The date is 4th August, 1958. Note that 4th August, 1958 is before `Joint of August' (i.e. m=7). So, the possible dates are 11th July, 23rd July and 4th August of 1958. The date with the time code `E10F7J1' is 4th August of 1958 because it satisfies both the 1st and 2nd Day Set Formulae. In case no date is common to the first & the second Day Set Formulae within the root of the month (m), it means the time codes of the date do not really exist in that year (y). The time codes of the date may exist 60 years before that (i.e.`y-60n' years) or 60 years after that (i.e.`y+60n' years).
Hour Fortune Origin Formula: UN4In general, the `Origin of Hour Fortune Co-ordinates' is expressed as (UN4,ZN4). No matter male or female, the origin of `Hour Fortune' of a person is the time of `Hour Fortune Co-ordinates' at birth. As there are twelve values in `ZN4' and there are 24 hours in one day, a value of `ZN4' stands for 2 hours. The value of `ZN4' shifts to the next after passing an odd number hour. The value of `ZN4' can be calculated directly from the time `h' expressed in 24-hour system. But, for finding out the value of `UN4', the `UN3' value of `Day Fortune Co-ordinates' (UN3,ZN3) of the day must be calculated first. Assume the `Day Fortune Co-ordinates' are (UN3,ZN3) and `h' is the time counting in hours of a person at birth reckoning in 24-hour system. The `Hour Fortune Origin Formula' is `UN4=ZN4-1+2x{UN3 &C{A[h/2]=12:+1}} (Mod 10) & ZN4=A[h/2] (Mod 12)' or UN4={ZN4-1+2xUN3 (Mod 10)}&C[If `h' is greater than or equal to 23, UN3=UN3+1 (Mod 10)] & ZN4=A[h/2] (Mod 12).The `Origin of Hour Fortune Co-ordinates' (UN4,ZN4) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Hour Code' of a person. No matter male or female, the `Hour Fortune Co-ordinates' (G4,C4) always spin clockwise. It starts to move from the origin at (UN4,ZN4) to the next `Hour Fortune Co-ordinates' (G4,C4) after two hours. For `UN4' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `ZN4' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of a couple of hours is called the `Hour Fortune Code' or `Hour Code'. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `UN4=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If UN4>10 then `UN4' becomes `UN4-10' and if UN4<1 then `UN4' becomes `UN4+10'. Thus, the value range of `UN4=(Mod 10)' is from 1 to 10. `ZN4=(Mod 12)' is a modulated function such that if ZN4>11 then `ZN4' becomes `ZN4-12' and if ZN4<0 then `ZN4' becomes `ZN4+12'. Thus, the value range of `ZN4=(Mod 12)' is from 0 to 11.Assume a person was born at 9:58 p.m. on 25th May of 2010. Find the `Origin of Hour Fortune Co-ordinates' (UN4,ZN4). Firstly, find out the value of `UN3' by applying the `Day Fortune Origin Formula' and `UN3=2'. Next, calculate the value of `h'. h=12+9+58/60, h=21.97 . Then, applying the `Hour Fortune Origin Formula', `UN4=ZN4-1+2x{UN3 &C{A[h/2]=12:+1}} (Mod 10) & ZN4=A[h/2] (Mod 12)', find the value of `ZN4' first. ZN4=A[21.97/2] (Mod 12). ZN4=A[10.985] (Mod 12). ZN4=11. UN4=11-1+2x{2&C{A[21.97/2]=12:+1}} (Mod 10). UN4=10+2x{2&C{A[10.985]=12:+1}} (Mod 10). UN4=10+2x{2&C{11=12:+1}} (Mod 10). UN4=10+2x2 (Mod 10). UN4=10+4 (Mod 10). UN4=14 (Mod 10). UN4=14-10. UN4=4. Or, apply the `Hour Fortune Origin Formula'. UN4={ZN4-1+2xUN3 (Mod 10)}&C[If `h' is greater than or equal to 23, UN3=UN3+1 (Mod 10)] & ZN4=A[h/2] (Mod 12). UN3=2. UN4=11-1+2x2 (Mod 10). UN4=14 (Mod 10). UN4=14-10. UN4=4. Hence, the `Origin of Hour Fortune Co-ordinates' (UN4,ZN4) of a person born at 9:58 p.m. on 25th May of 2010 is (4,11). The `Hour Code' is `24', `D11', `4L', `DL' or `DIM-HOI'. If a person was born at 11:00 p.m. on 25th May of 2010, find the `Origin of Hour Fortune Co-ordinates' (UN4,ZN4). Firstly, find out the value of `UN3' by applying the `Day Fortune Origin Formula' and `UN3=2'. Next, h=12+11, h=23. Applying the `Hour Fortune Origin Formula', `UN4=ZN4-1+2x{UN3 &C{A[h/2]=12:+1}} (Mod 10) & ZN4=A[h/2] (Mod 12)', find the value of `ZN4' first. ZN4=A[23/2] (Mod 12). ZN4=A[11.5] (Mod 12). ZN4=12 (Mod 12). ZN4=12-12. ZN4=0. Then, UN4=0-1+2x{2&C{A[23/2]=12:+1}} (Mod 10). UN4=-1+2x{2&C{A[11.5]=12:+1}} (Mod 10). UN4=-1+2x{2&C{12=12:+1}} (Mod 10). UN4=-1+2x{2+1} (Mod 10). UN4=-1+2x3 (Mod 10). UN4=-1+6 (Mod 10). UN4=5 (Mod 10). UN4=5. Or, apply the `Hour Fortune Origin Formula'. UN4={ZN4-1+2xUN3 (Mod 10)}&C[If `h' is greater than or equal to 23, UN3=UN3+1 (Mod 10)] & ZN4=A[h/2] (Mod 12). UN3=2+1(Mod 10). UN3=3. UN4=0-1+2x3 (Mod 10). UN4=5 (Mod 10). UN4=5. Hence, the `Origin of Hour Fortune Co-ordinates' (UN4,ZN4) of a person born at 11:00 p.m. on 25th May of 2010 is (5,0). The `Hour Code' is `25', `E0', `5A', `EA' or `MOO-CHI'.
Hour Fortune Formula: GC4In general, the `Hour Fortune Co-ordinates' is expressed as (G4,C4). As there are twelve values in `C4' and there are 24 hours in one day, a value of `C4' stands for 2 hours. The value of `C4' shifts to the next after passing an odd number hour. The value of `C4' can be calculated directly from the time `h' expressed in 24-hour system. But, for finding out the value of `G4', the `G3' value of `Day Fortune Co-ordinates' (G3,C3) of the day must be calculated first. Assume the `Day Fortune Co-ordinates' are (G3,C3) and `h' is the time counting in hours in 24-hour system. The `Hour Fortune Formula' is `G4=C4-1+2x{G3 &C{A[h/2]=12:+1}} (Mod 10) & C4=A[h/2] (Mod 12)' or G4={G4-1+2xG3 (Mod 10)}&C[If `h' is greater than or equal to 23, G3=G3+1 (Mod 10)] & C4=A[h/2] (Mod 12).No matter male or female, the `Hour Fortune Co-ordinates' always spin clockwise. The `Hour Fortune Co-ordinates' start to move from the `Origin of Hour Fortune Co-ordinates' at (UN4,ZN4) to the next after two hours. They oscillate in a loop of 60 and they are expressed as (G4,C4), where `G4' and `C4' are integers. If `G4' is a modulated function of 10, for `G4' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. If `C4' is a modulated function of 12, for `C4' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of a couple of hours is called the `Hour Fortune Code' or `Hour Code'. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `G4=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If G4>10 then `G4' becomes `G4-10' and if G4<1 then `G4' becomes `G4+10'. Thus, the value range of `G4=(Mod 10)' is from 1 to 10. `C4=(Mod 12)' is a modulated function such that if C4>11 then `C4' becomes `C4-12' and if C4<0 then `C4' becomes `C4+12'. Thus, the value range of `C4=(Mod 12)' is from 0 to 11.Assume to find the `Hour Fortune Co-ordinates' (G4,C4) of the time at 1:30 p.m. on 21st June of 1987. Firstly, find out the value of `G3' by applying the `Day Fortune Formula' and `G3=8'. Next, calculate the value of `h'. h=12+1+30/60,h=13.5 . Then, applying the `Hour Fortune Formula', `G4=C4-1+2x{G3 &C{A[h/2]=12:+1}} (Mod 10) & C4=A[h/2] (Mod 12)', find the value of `C4' first. C4=A[13.5/2] (Mod 12). C4=A[6.75] (Mod 12). C4=7. G4=7-1+2x{8&C{A[13.5/2]=12:+1}} (Mod 10). G4=6+2x{8&C{A[6.75]=12:+1}} (Mod 10). G4=6+2x{8&C{7=12:+1}} (Mod 10). G4=6+2x8 (Mod 10). G4=6+16 (Mod 10). G4=22 (Mod 10). G4=22-2x10. G4=2. Or, apply the `Hour Fortune Formula'. G4={C4-1+2xG3 (Mod 10)}&C[If `h' is greater than or equal to 23, G3=G3+1 (Mod 10)]. G3=8. G4=7-1+2x8 (Mod 10). G4=22 (Mod 10). G4=22-10x2. G4=2. Hence, the `Hour Fortune Co-ordinates' (G4,C4) of time at 1:30 p.m. on 21st June of 1987 is (2,7). The `Hour Code' is `32', `B7', `2H', `BH' or `EUT-MEI'. If the time is 11:55 p.m. on 21st November of 1990, find the `Hour Fortune Co-ordinates' (G4,C4). Firstly, find out the value of `G3' by applying the `Day Fortune Formula' and `G3=7'. Next, h=12+11+55/60. h=23.92 . Applying the `Hour Fortune Formula', `G4=C4-1+2x{G3 &C{A[h/2]=12:+1}} (Mod 10) & C4=A[h/2] (Mod 12)', find the value of `C4' first. C4=A[23.92/2] (Mod 12). C4=A[11.96] (Mod 12). C4=12 (Mod 12). C4=12-12. C4=0. Then, G4=0-1+2x{7&C{A[23.92/2]=12:+1}} (Mod 10). G4=-1+2x{7&C{A[11.96]=12:+1}} (Mod 10). G4=-1+2x{7&C{12=12:+1}} (Mod 10). G4=-1+2x{7+1} (Mod 10). G4=-1+2x8 (Mod 10). G4=-1+16 (Mod 10). G4=15 (Mod 10). G4=15-10. G4=5. Or, apply the `Hour Fortune Formula'. G4={C4-1+2xG3 (Mod 10)}&C[If `h' is greater than or equal to 23, G3=G3+1 (Mod 10)]. G3=7+1 (Mod 10). G3=8 (Mod 10). G3=8. G4=0-1+2x8 (Mod 10). G4=15 (Mod 10). G4=15-10. G4=5. Hence, the `Hour Fortune Co-ordinates' (G4,C4) of time at 11:55 p.m. on 21st November of 1990 is (5,0). The `Hour Code' is `25', `E0', `5A', `EA' or `MOO-CHI'.
Hour Code Formula: HCAssume the `Hour Fortune Co-ordinates' are (U,Z) and the `Sequence Code of Hour Fortune Co-ordinates' is `HC'. The values of `U' and `Z' can determine the `Sequence Code of Hour Fortune Co-ordinates' by the formula. On the contrary, the values of `U' and `Z' can be read from the table of `Sequence Code of Hour Fortune Co-ordinates'. The `Sequence Code of Hour Fortune Co-ordinates' is also named as `2-hour Numerology' or `Hour Numerology' (N). Thus, N=HC. The `Hour Code Formula' is also called `Hour Numerology Formula'. The `Hour Code Formula' is HC=5x{11-[(Z-U) (Mod 12)]}+U. The Stem (U) and Root (Z) of `Fortune Co-ordinates' can be found from the `Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12).No matter male or female, the couple-hourly fortune of a person always starts from the `Hour Fortune Co-ordinates' at birth (UN4,ZN4). The couple-hourly fortune of a person follows the order of `Fortune Co-ordinates' (U,Z) and it always moves to the next pair of co-ordinates in the next couple of hours. Everybody's `Hour Fortune' spins clockwise and shifts to the next after passing the time of an odd o'clock according to the `Sequence Code of Fortune Co-ordinates' on a couple-hourly base. The `Hour Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. For `U' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Hour Codes'. Usually, `Hour Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Hour Fortune Co-ordinates'. For example, `N=5' or `N=05' means the fifth entry in the table of `Sequence Code of Hour Fortune Co-ordinates' and `N=21' means it is the 21st entry. For easier time strap comparison by computer, the `Hour Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=28313827' stands for `H3(year)A6(month)H1(day)G2(hour)'. The time is 3 a.m. on 15th June, 2011. `N=12252225' stands for `B11E0B9E0'. The time is 11 p.m. on 20th Dec., 1995. An `Hour Code' can be expressed in six different ways. The commonest form is to express the `Hour Code' as `Hour Fortune Co-ordinates', (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `(Z-U)=(Mod 12)' is a modulated function such that if (Z-U)>11 then `(Z-U)' becomes `(Z-U)-12' and if (Z-U)<0 then `(Z-U)' becomes `(Z-U)+12'. Thus, the value range of `(Z-U)=(Mod 12)' is from 0 to 11.If the `Hour Fortune Co-ordinates' are (9,8), apply the `Hour Code Formula'. HC=5x{11-[(Z-U) (Mod 12)]}+U. HC=5x{11-[(8-9) (Mod 12)]}+9. HC=5x{11-[12+8-9]}+9. HC=5x{11-11}+9. HC=5x0+9. HC=9. Thus, the `Sequence Code of Hour Fortune Co-ordinates' of (9,8) is `09'. Besides, the `Hour Code' of `HC=09' can also be expressed as `HC=(9,8)', `HC=I8', `HC=9H', `HC=IH' and `HC=YAM-SAN'. If the `Numerology' is 43, N=43, find the Stem (U) and Root (Z) of the `Hour Fortune Co-ordinates'. Apply the `Stem & Root Formulae'. U=43 (Mod 10) & Z=43-1 (Mod 12). U=43-10x4 & Z=42 (Mod 12). U=3 & Z=42-12x3. U=3 and Z=6. Thus, the Stem (U) of `Hour Fortune Co-ordinates' is 3 and the Root (Z) of `Hour Fortune Co-ordinates' is 6. The `Hour Fortune Co-ordinates' are (3,6). Since the Hour Code (HC) is same as `Sequence of Hour Numerology' (N), HC=43 and HC=(3,6). The Hour Code (HC) can also be expressed as `HC=C6', `HC=3G', `HC=CG' or `HC=BIM-NGG'.
Hour Set Formula: HSAssume `y' is the solar year after `Joint of February', roughly on 4th of February in Gregorian calendar, and `m' is the solar month after `Joint of Month'. If the date is before `Joint of Month', the value of `m' is equal to previous month. If the `Year Code' (YC) and `Month Code' (MC) of two dates are same, the `Day Code' (DC) is (UD,ZD), `d' is the number of days counting from 1st of January of the year (y). `d1' is the value of `d' calculated from the value of Stem of Day (UD) and `d2' is the value of `d' calculated from the value of Root of Day (ZD). If d1=d2 and the months (m) are same, the two dates belong to same `Time Set'. The Day Set Formulae are: d1=UD+5-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 10) & d2=ZD+10-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 12). `d=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If d>10 then `d' becomes `d-10' and if d<1 then `d' becomes `d+10'. Thus, the value range of `d=(Mod 10)' is from 1 to 10. `d=(Mod 12)' is another modulated function such that if d>12 then `d' becomes `d-12' and if d<1 then `d' becomes `d+12'. Thus, the value range of `d=(Mod 12)' is from 1 to 12. The `Hour Set Formula' is used to find the time in hours from an `Hour Code' (HC). The `Hour Code' is expressed in the form of `Hour Co-ordinates' (U,Z). If `h' is the time reckoning in a 24-hour system of a date, the Hour Set Formula is: h=2ZIn `Prediction Technology and Forensic Mathematics' (PT&FM), `Time Set' is a set of time which has same `Time Codes'. If the precision of time in the `Time Set' is two hours, it is an `Hour Set'. The time in `Hour Set' is sexagesimal. The `Time Codes' of months, days and times in the `Set' are same but years are different. So, they are classified as a set. For example, the `Time Codes' (TC) of 3:05a.m. on 30th June, 1951 and 4:59a.m. on 15th June, 2011 are regarded as identical because they are in same 2-hour interval. TC=H3A6H1G2. The Numerology (N) is N=28313827. These two data of time belong to same `Time Set' because they are in same 2-hour interval. In the `Hour Code' (U,Z), `U' is called the `Stem' of the `Hour Code' and `Z' is called the `Root' of the `Hour Code' where `U' and `Z' are integers. The value of `U' shows the alphabetical order of the letter that it represents. For values of `U' which stands for time interval of a couple of hours (2 hours), 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. The value of `Z' is the Root of Hour Code. It stands for time interval of a couple of hours. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. The value of `Z' also shows the location and direction of a couple of hours. It is equal to the Zone (Z) in the space of the universe.If the Time Code (TC) of a time strap in a specified year y=1958 is `E10F7D11H11', find the time in Gregorian calendar. The Time Code (TC) is `E10F7D11H11' means the Numerology (N) is `35562448'. The Year Code is YC=E10 and it can represent y=1958. The Month Code is MC=F7 and `7' is the Root of Month Code, `m'. So, m=7. It means the 7th month in Gregorian calendar. That is July. The Day Code (DC) is `D11'. The Stem (UD) of Day Code is UD=4 because `D' is the fourth letter in alphabetical order. The Root (ZD) of Day Code is ZD=11. Firstly, find out the date which lies in the month (m) as well as `d1' and `d2' both satisfies the `Day Set Formulae'. The date is 9th July, 1958. Then, appy the `Hour Set Formula' to find the time of the `Time Code'. The `Hour Code' (HC) is `H11'. The Stem (U) of Hour Code is U=8 because `H' is the eighth letter in alphabetical order. The Root (Z) of Hour Code is Z=11. Apply the `Hour Set Formula'. h=2Z, h=2x11. h=22. The time is 10:00 p.m.. In history, a great earthquake that caused a huge tsunami in Lituya Bay of Alaska, U.S.A., occurred at 10:15:12 p.m. on 9th July,1958. By this approach, we can forecast wars of massive destructions and natural disasters by finding the dates and time of all logical combinations of bad codes of year, month, day and time related to the timeons of `Yeu',`Tor',`Jit',`Pik' & `Psu'. The probability of such events that will occur is very great.
Minute Fortune Origin Formula: UN5Since a pair of Hour Fortune Co-ordinates represent two hours and 2 hours is equal to 120 minutes, each pair of Minute Fortune Co-ordinates represent 10 minutes. In general, the `Origin of Minute Fortune Co-ordinates' is expressed as (UN5,ZN5). `UN5' is the Stem of Minute Code and `ZN5' is the Root of Minute Code. The time interval of Stem and Root of Minute Code is 10 minutes. No matter male or female, the origin of `Minute Fortune' of a person is the time of `Minutes Fortune Co-ordinates' at birth. As there are twelve values in `ZN5' and there are 120 minutes (2 hours) in an Hour Code, a value of `ZN5' stands for 10 minutes. The value of `ZN5' shifts to the next after passing the time at 0 minute, 10 minutes or a multiple of 10 minutes. The value of `ZN5' can be calculated directly from time `t' expressed in 24-hour system. But, for finding out the value of `UN5', the `UN4' value of `Hour Fortune Co-ordinates' (UN4,ZN4) of two hours must be calculated first. Assume the `Hour Fortune Co-ordinates' are (UH,ZH) and the origin of `Minutes Fortune Co-ordinates' are (U,Z). `t' is the time counting in minutes of a person at birth reckoning in 24-hour system. The `Minute Fortune Origin Formula' is `U=Z-1+2xUH (Mod 10) & Z=I[{t-60 (Mod 120)}/10]'.The `Origin of Minute Fortune Co-ordinates' (UN5,ZN5) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Minute Code' of a person. No matter male or female, the `Minute Fortune Co-ordinates' (G5,C5) always spin clockwise. It starts to move from the origin at (UN5,ZN5) to the next Minute Fortune Co-ordinates' (G5,C5) after 10 minutes. For `UN5' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `ZN5' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of an interval of 10 minutes is called the `Minute Fortune Code' or `Minute Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 120)' is a modulated function such that if Z>119 then `Z' becomes `Z-120' and if Z<0 then `Z' becomes `Z+120'. Thus, the value range of `Z=(Mod 120)' is from 0 to 119.Assume a person was born at 3:07:00 a.m. on 15th June of 2011. Find the `Origin of Minute Fortune Co-ordinates' (UN5,ZN5). Firstly, find out the value of `UN4' by applying the `Hour Fortune Origin Formula' and `UN4=7'. Thus, `UH=7'. Next, calculate the value of `t'. t=3x60+7. t=187. Then, applying the `Minute Fortune Origin Formula', `U=Z-1+2xUH (Mod 10) & Z=I[{t-60 (Mod 120)}/10]', find the value of `Z' first. Z=I[{187-60 (Mod 120)}/10]. Z=I[{127 (Mod 120)}/10]. Z=I[{127-120}/10]. Z=I[7/10]. Z=I[0.7]. Z=0. U=0-1+2x7 (Mod 10). U=13 (Mod 10). U=13-10. U=3. Hence, the `Origin of Minute Fortune Co-ordinates' (UN5,ZN5) of a person born at 3:07:00 a.m. on 15th June of 2011 is (3,0). The `Minute Code' is `13', `C0', `3A', `CA' or `BIM-CHI'. If a person was born at 11:44:42 p.m. on 20th December of 1995, find the `Origin of Minute Fortune Co-ordinates' (UN5,ZN5). Firstly, find out the value of `UN4' by applying the `Hour Fortune Origin Formula' and `UN4=5'. Thus, `UH=5'. Next, calculate the value of `t'. t=23x60+44+42/60. t=1424.7 . Then, applying the `Minute Fortune Origin Formula', `U=Z-1+2xUH (Mod 10) & Z=I[{t-60 (Mod 120)}/10]', find the value of `Z' first. Z=I[{1424.7-60 (Mod 120)}/10]. Z=I[{1364.7 (Mod 120)}/10]. Z=I[{1364.7-120x11}/10]. Z=I[44.7/10]. Z=I[4.47]. Z=4. U=4-1+2x5 (Mod 10). U=13 (Mod 10). U=13-10. U=3. Hence, the `Origin of Minute Fortune Co-ordinates' (UN5,ZN5) of a person born at 11:44:42 p.m. on 20th December of 1995 is (3,4). The `Minute Code' is `53', `C4', `3E', `CE' or `BIM-SEN'.
Minute Fortune Formula: GC5Since a pair of Hour Fortune Co-ordinates represent two hours and 2 hours is equal to 120 minutes, each pair of Minute Fortune Co-ordinates represent 10 minutes. In general, the `Minute Fortune Co-ordinates' is expressed as (G5,C5). `G5' is the Stem of Minute Code and `C5' is the Root of Minute Code. The time interval of Stem and Root of Minute Code is 10 minutes. As there are twelve values in `C5' and there are 120 minutes (2 hours) in an Hour Code, a value of `C5' stands for 10 minutes. The value of `C5' shifts to the next after passing the time at 0 minute, 10 minutes or a multiple of 10 minutes. The value of `C5' can be calculated directly from time `t' expressed in 24-hour system. But, for finding out the value of `G5', the `G4' value of `Hour Fortune Co-ordinates' (G4,C4) of two hours must be calculated first. Assume the `Hour Fortune Co-ordinates' are (GH,CH) and the `Minute Fortune Co-ordinates' are (U,Z). `t' is the time counting in minutes reckoning in 24-hour system. The `Minute Fortune Formula' is `U=Z-1+2xGH (Mod 10) & Z=I[{t-60 (Mod 120)}/10]'.No matter male or female, the `Minute Fortune Co-ordinates' (G5,C5) always spin clockwise. The `Minute Fortune Co-ordinates' start to move from the `Origin of Minute Fortune Co-ordinates' at (UN5,ZN5) to the next Minute Fortune Co-ordinates' (G5,C5) after 10 minutes. They oscillate in a loop of 60 and they are expressed as (G5,C5), where `G5' and `C5' are integers. For `G5' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `C5' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of an interval of 10 minutes is called the `Minute Fortune Code' or `Minute Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 120)' is a modulated function such that if Z>119 then `Z' becomes `Z-120' and if Z<0 then `Z' becomes `Z+120'. Thus, the value range of `Z=(Mod 120)' is from 0 to 119.Assume to find the `Minute Fortune Co-ordinates' (G5,C5) of the time at 3:07:00 a.m. on 15th June of 2011. Firstly, find out the value of `G4' by applying the `Hour Fortune Formula' and `G4=7'. Thus, `GH=7'. Next, calculate the value of `t'. t=3x60+7. t=187. Then, applying the `Minute Fortune Formula', `U=Z-1+2xGH (Mod 10) & Z=I[{t-60 (Mod 120)}/10]', find the value of `Z' first. Z=I[{187-60 (Mod 120)}/10]. Z=I[{127 (Mod 120)}/10]. Z=I[{127-120}/10]. Z=I[7/10]. Z=I[0.7]. Z=0. U=0-1+2x7 (Mod 10). U=13 (Mod 10). U=13-10. U=3. Hence, the `Minute Fortune Co-ordinates' (G5,C5) of time at 3:07:00 a.m. on 15th June of 2011 is (3,0). The `Minute Code' is `13', `C0', `3A', `CA' or `BIM-CHI'. If the time is 11:44:42 p.m. on 20th December of 1995, find the `Minute Fortune Co-ordinates' (G5,C5). Firstly, find out the value of `G4' by applying the `Hour Fortune Formula' and `G4=5'. Thus, `GH=5'. Next, calculate the value of `t'. t=23x60+44+42/60. t=1424.7 . Then, applying the `Minute Fortune Formula', `U=Z-1+2xGH (Mod 10) & Z=I[{t-60 (Mod 120)}/10]', find the value of `Z' first. Z=I[{1424.7-60 (Mod 120)}/10]. Z=I[{1364.7 (Mod 120)}/10]. Z=I[{1364.7-120x11}/10]. Z=I[44.7/10]. Z=I[4.47]. Z=4. U=4-1+2x5 (Mod 10). U=13 (Mod 10). U=13-10. U=3. Hence, the `Minute Fortune Co-ordinates' (G5,C5) of time at 11:44:42 p.m. on 20th December of 1995 is (3,4). The `Minute Code' is `53', `C4', `3E', `CE' or `BIM-SEN'.
Minute Code Formula: MiCAssume the `Minute Fortune Co-ordinates' are (U,Z) and the `Sequence Code of Minute Fortune Co-ordinates' is `MiC'. The values of `U' and `Z' can determine the `Sequence Code of Minute Fortune Co-ordinates' by the formula. On the contrary, the values of `U' and `Z' can be read from the table of `Sequence Code of Minute Fortune Co-ordinates'. The `Sequence Code of Minute Fortune Co-ordinates' is also named as `Minute Numerology' (N). Thus, N=MiC. The `Minute Code Formula' is also called `Minute Numerology Formula'. The `Minute Code Formula' is MiC=5x{11-[(Z-U) (Mod 12)]}+U. The Stem (U) and Root (Z) of `Fortune Co-ordinates' can be found from the `Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12).No matter male or female, the minute fortune of a person always starts from the `Minute Fortune Co-ordinates' at birth (UN5,ZN5). The minute fortune of a person follows the order of `Fortune Co-ordinates' (U,Z) and it always moves to the next pair of co-ordinates after passing the time at 0 minute, 10 minutes or a multiple of 10 minutes. Everybody's `Minute Fortune' spins clockwise and shifts to next 10 minutes according to the `Sequence Code of Fortune Co-ordinates' on a 10-minutes base. The `Minute Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. For `U' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Minute Codes'. Usually, `Minute Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Minute Fortune Co-ordinates'. For example, `N=9' or `N=09' means the 9th entry in the table of `Sequence Code of Minute Fortune Co-ordinates' and `N=40' means it is the 40th entry. For easier time strap comparison by computer, the `Minute Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=2831382713' stands for `H3(year)A6(month)H1(day)G2(hour)C0(10-minute)'. The time is 3:00a.m. on 15th June, 2011. `N=1225222553' stands for `B11E0B9E0C4'. The time is 11:40p.m. on 20th Dec., 1995. A `Minute Code' can be expressed in six different ways. The commonest form is to express the `Minute Code' as `Minute Fortune Co-ordinates', (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `x=(Mod 12)' is a modulated function such that if `x' is greater than 11 then `x' becomes `x-12' and if `x' is less than 0 then `x' becomes `x+12'. Thus, the value range of `x=(Mod 12)' is from 0 to 11.If the `Minute Fortune Co-ordinates' are (9,8), apply the `Minute Code Formula'. MiC=5x{11-[(Z-U) (Mod 12)]}+U. MiC=5x{11-[(8-9) (Mod 12)]}+9. MiC=5x{11-[12+8-9]}+9. MiC=5x{11-11}+9. MiC=5x0+9. MiC=9. Thus, the `Sequence Code of Minute Fortune Co-ordinates' of (9,8) is `09'. The `Sequence of Minute Numerology' (N) is `09' or N=9. Besides, the `Minute Code' of `MiC=09' can also be expressed as `MiC=(9,8)', `MiC=I8', `MiC=9H', `MiC=IH' and `MiC=YAM-SAN'. If the `Numerology' is 59, N=59, find the Stem (U) and Root (Z) of the `Minute Fortune Co-ordinates'. Apply the `Stem & Root Formulae'. U=59 (Mod 10) & Z=59-1 (Mod 12). U=59-10x5 & Z=58 (Mod 12). U=9 & Z=58-12x4. U=9 and Z=10. Thus, the Stem (U) of `Minute Fortune Co-ordinates' is 9 and the Root (Z) of `Minute Fortune Co-ordinates' is 10. The `Minute Fortune Co-ordinates' are (9,10). Since the Minute Code (MiC) is same as `Sequence of Minute Numerology' (N), MiC=59 and MiC=(9,10). The Minute Code (MiC) can also be expressed as `MiC=I10', `MiC=9K', `MiC=IK' or `MiC=YAM-SHT'.
Minute Set Formula: MiSAssume `y' is the solar year after `Joint of February', roughly on 4th of February in Gregorian calendar, and `m' is the solar month after `Joint of Month'. If the date is before `Joint of Month', the value of `m' is equal to previous month. If the `Year Code' (YC) and `Month Code' (MC) of two dates are same, the `Day Code' (DC) is (UD,ZD), `d' is the number of days counting from 1st of January of the year (y). `d1' is the value of `d' calculated from the value of Stem of Day (UD) and `d2' is the value of `d' calculated from the value of Root of Day (ZD). If d1=d2 and the months (m) are same, the two dates belong to same `Time Set'. The Day Set Formulae are: d1=UD+5-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 10) & d2=ZD+10-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 12). `d=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If d>10 then `d' becomes `d-10' and if d<1 then `d' becomes `d+10'. Thus, the value range of `d=(Mod 10)' is from 1 to 10. `d=(Mod 12)' is another modulated function such that if d>12 then `d' becomes `d-12' and if d<1 then `d' becomes `d+12'. Thus, the value range of `d=(Mod 12)' is from 1 to 12. The `Minute Set Formula' is used to find the time in hours from `Minute Code' (MiC). The `Minute Code' is expressed in the form of `Minute Co-ordinates' (U,Z). If the `Hour Code' is (UH,ZH), the `Minute Code' is (U,Z) and `h' is the time reckoning in a 24-hour system of a date, the Minute Set Formula is: h=2ZH-1+Z/6 (Mod 24)In `Prediction Technology and Forensic Mathematics' (PT&FM), `Time Set' is a set of time which has same `Time Codes'. If the precision of time in the `Time Set' is 10 minutes, it is a `Minute Set'. The time in `Minute Set' is sexagesimal. The `Time Codes' of months, days and times in the `Set' are same but years are different. So, they are classified as a set. For example, the `Time Codes' (TC) of 3:00a.m. on 30th June, 1951 and 3:09a.m. on 15th June, 2011 are regarded as identical because they are in same 10-minute interval. TC=H3A6H1G2C0. The Numerology (N) is N=2831382713. These two data of time belong to same `Time Set' because they are in same 10-minute interval. In the `Minute Code' (U,Z), `U' is the `Stem' of the `Minute Code' and `Z' is the `Root' of the `Minute Code' where `U' and `Z' are integers. The value of `U' shows the alphabetical order of the letter that it represents. For values of `U' which stands for time interval of 10 minutes, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. The value of `Z' is the Root of Minute Code. It stands for time interval of 10 minutes. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. The value of `Z' also shows the location and direction of 10 minutes. It is equal to the Zone (Z) in the space of the universe. `h=(Mod 24)' is a modulated function such that if h=24 or h>24 then `h' becomes `h-24' and if h<0 then `h' becomes `h+24'. Thus, the value range of `h=(Mod 24)' is from 0 to a number smaller than 24.If the Time Code (TC) of a time strap in a specified year y=1958 is `E10F7D11H11A6', find the time in Gregorian calendar. The Time Code (TC) is `E10F7D11H11A6' means the Numerology (N) is `3556244831'. The Year Code is YC=E10 and it can represent y=1958. The Month Code is MC=F7 and `7' is the Root of Month Code, `m'. So, m=7. It means the 7th month in Gregorian calendar. That is July. The Day Code (DC) is `D11'. The Stem (UD) of Day Code is UD=4 because `D' is the fourth letter in alphabetical order. The Root (ZD) of Day Code is ZD=11. Firstly, find out the date which lies in the month (m) as well as `d1' and `d2' both satisfies the `Day Set Formulae'. The date is 9th July, 1958. Then, appy the `Minute Set Formula' to find the time of the `Time Code'. The `Hour Code' (HC) is `H11'. The Stem (UH) of Hour Code is UH=8 because `H' is the eighth letter in alphabetical order. The Root (ZH) of Hour Code is ZH=11. The `Minute Code' (MiC) is `A6'. The Stem (U) of Minute Code is U=1 because `A' is the first letter in alphabetical order. The Root (Z) of Minute Code is Z=6. Apply the `Minute Set Formula', h=2ZH-1+Z/6 (Mod 24). h=2x11-1+6/6 (Mod 24). h=22-1+1 (Mod 24). h=22 (Mod 24). h=22. The time is 10:00p.m. on 9th July, 1958.
Second Fortune Origin Formula: UN6Since a pair of Minute Fortune Co-ordinates represent ten minutes and 10 minutes is equal to 600 seconds, each pair of Second Fortune Co-ordinates represent 50 seconds. In general, the `Origin of Second Fortune Co-ordinates' is expressed as (UN6,ZN6). `UN6' is the Stem of Second Code (Second Stem) and `ZN6' is the Root of Second Code (Second Root). The time interval of Stem and Root of Second Code is 50 seconds. No matter male or female, the origin of `Second Fortune' of a person is the time of `Second Fortune Co-ordinates' at birth. As there are twelve values in `ZN6' and there are 600 seconds (10 minutes) in a Minute Code, a value of `ZN6' stands for 50 seconds. The value of `ZN6' shifts to the next after passing the time at 0 second, 50 seconds or a multiple of 50 seconds. The value of `ZN6' can be calculated directly from time `t' expressed in 24-hour system. But, for finding out the value of `UN6', the `UN5' value of `Minute Fortune Co-ordinates' (UN5,ZN5) of ten minutes must be calculated first. Assume the `Minute Fortune Co-ordinates' are (UM,ZM) and the origin of `Second Fortune Co-ordinates' are (U,Z). `t' is the time counting in seconds of a person at birth reckoning in 24-hour system. The `Second Fortune Origin Formula' is `U=Z-1+2xUM (Mod 10) & Z=I[{{t (Mod 7200)} (Mod 600)}/50]'.The `Origin of Second Fortune Co-ordinates' (UN6,ZN6) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Second Code' of a person. No matter male or female, the `Second Fortune Co-ordinates' (G6,C6) always spin clockwise. It starts to move from the origin at (UN6,ZN6) to the next Second Fortune Co-ordinates' (G6,C6) after 50 seconds. For `UN6' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `ZN6' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of an interval of 50 seconds is called the `Second Fortune Code' or `Second Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 7200)' is a modulated function such that if Z>7199 then `Z' becomes `Z-7200' and if Z<0 then `Z' becomes `Z+7200'. Thus, the value range of `Z=(Mod 7200)' is from 0 to 7199. `Z=(Mod 600)' is a modulated function such that if Z>599 then `Z' becomes `Z-600' and if Z<0 then `Z' becomes `Z+600'. Thus, the value range of `Z=(Mod 600)' is from 0 to 599.Assume a person was born at 3:07:39 a.m. on 15th June of 2011. Find the `Origin of Second Fortune Co-ordinates' (UN6,ZN6). Firstly, find out the value of `UN5' by applying the `Minute Fortune Origin Formula'. `UN5=3'. Thus, `UM=3'. Next, calculate the value of `t'. t=3x3600+7x60+39. t=11259. Then, apply the `Second Fortune Origin Formula', `U=Z-1+2xUM (Mod 10) & Z=I[{{t (Mod 7200)} (Mod 600)}/50]'. Find the value of `Z' first. Z=I[{{11259 (Mod 7200)} (Mod 600)}/50]. Z=I[{11259-7200 (Mod 600)}/50]. Z=I[{4059 (Mod 600)}/50]. Z=I[{4059-600x6}/50]. Z=I[459/50]. Z=I[9.18]. Z=9. U=9-1+2x3 (Mod 10). U=14 (Mod 10). U=14-10. U=4. Hence, the `Origin of Second Fortune Co-ordinates' (UN6,ZN6) of a person born at 3:07:39 a.m. on 15th June of 2011 is (4,9). The `Second Code' is `34',`D9', `4J', `DJ' or `DIM-YAU'. If a person was born at 11:44:42 p.m. on 20th December of 1995, find the `Origin of Second Fortune Co-ordinates' (UN6,ZN6). Firstly, find out the value of `UN5' by applying the `Minute Fortune Origin Formula'. `UN5=3'. Thus, `UM=3'. Next, calculate the value of `t'. t=23x3600+44x60+42. t=85482. Then, apply the `Second Fortune Origin Formula', `U=Z-1+2xUM (Mod 10) & Z=I[{{t (Mod 7200)} (Mod 600)}/50]'. Find the value of `Z' first. Z=I[{{85482 (Mod 7200)} (Mod 600)}/50]. Z=I[{85482-7200x11 (Mod 600)}/50]. Z=I[{6282 (Mod 600)}/50]. Z=I[{6282-600x10}/50]. Z=I[282/50)]. Z=I[5.64]. Z=5. U=5-1+2x3 (Mod 10). U=10 (Mod 10). U=10. Hence, the `Origin of Second Fortune Co-ordinates' (UN6,ZN6) of a person born at 11:44:42 p.m. on 20th December of 1995 is (10,5). The `Second Code' is `30', `J5', `10F', `JF' or `QUI-CHJ'.
Second Fortune Formula: GC6Since a pair of Minute Fortune Co-ordinates represent ten minutes and 10 minutes is equal to 600 seconds, each pair of Second Fortune Co-ordinates represent 50 seconds. In general, the `Second Fortune Co-ordinates' are expressed as (G6,C6). `G6' is the Stem of Second Code (Second Stem) and `C6' is the Root of Second Code (Second Root). The time interval of Stem and Root of Second Code is 50 seconds. As there are twelve values in `C6' and there are 600 seconds (10 minutes) in a Minute Code, a value of `C6' stands for 50 seconds. The value of `C6' shifts to the next after passing the time at 0 second, 50 seconds or a multiple of 50 seconds. The value of `C6' can be calculated directly from time `t' expressed in 24-hour system. But, for finding out the value of `G6', the `G5' value of `Minute Fortune Co-ordinates' (G5,C5) of ten minutes must be calculated first. Assume the `Minute Fortune Co-ordinates' are (GM,CM) and the `Second Fortune Co-ordinates' are (U,Z). `t' is the time counting in seconds reckoning in 24-hour system. The `Second Fortune Formula' is `U=Z-1+2xGM (Mod 10) & Z=I[{{t (Mod 7200)} (Mod 600)}/50]'.No matter male or female, the `Second Fortune Co-ordinates' (G6,C6) always spin clockwise. The `Second Fortune Co-ordinates' start to move from the `Origin of Second Fortune Co-ordinates' at (UN6,ZN6) to the next Second Fortune Co-ordinates' (G6,C6) after 50 seconds. They oscillate in a loop of 60 and they are expressed as (G6,C6), where `G6' and `C6' are integers. For `G6' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `C6' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of an interval of 50 seconds is called the `Second Fortune Code' or `Second Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 7200)' is a modulated function such that if Z>7199 then `Z' becomes `Z-7200' and if Z<0 then `Z' becomes `Z+7200'. Thus, the value range of `Z=(Mod 7200)' is from 0 to 7199. `Z=(Mod 600)' is a modulated function such that if Z>599 then `Z' becomes `Z-600' and if Z<0 then `Z' becomes `Z+600'. Thus, the value range of `Z=(Mod 600)' is from 0 to 599.Assume to find the `Second Fortune Co-ordinates' (G6,C6) of the time at 3:07:39 a.m. on 15th June of 2011. Firstly, find out the value of `G5' by applying the `Minute Fortune Formula'. `G5=3'. Thus, `GM=3'. Next, calculate the value of `t'. t=3x3600+7x60+39. t=11259. Then, apply the `Second Fortune Formula', `U=Z-1+2xGM (Mod 10) & Z=I[{{t (Mod 7200)} (Mod 600)}/50]'. Find the value of `Z' first. Z=I[{{11259 (Mod 7200)} (Mod 600)}/50]. Z=I[{11259-7200 (Mod 600)}/50]. Z=I[{4059 (Mod 600)}/50]. Z=I[{4059-600x6}/50]. Z=I[459/50]. Z=I[9.18]. Z=9. U=9-1+2x3 (Mod 10). U=14 (Mod 10). U=14-10. U=4. Hence, the `Second Fortune Co-ordinates' (G6,C6) of time at 3:07:39 a.m. on 15th June of 2011 is (4,9). The `Second Code' is `34',`D9', `4J', `DJ' or `DIM-YAU'. If the time is 11:44:42 p.m. on 20th December of 1995, find the `Second Fortune Co-ordinates' (G6,C6). Firstly, find out the value of `G5' by applying the `Minute Fortune Formula'. `G5=3'. Thus, `GM=3'. Next, calculate the value of `t'. t=23x3600+44x60+42. t=85482. Then, apply the `Second Fortune Formula', `U=Z-1+2xGM (Mod 10) & Z=I[{{t (Mod 7200)} (Mod 600)}/50]'. Find the value of `Z' first. Z=I[{{85482 (Mod 7200)} (Mod 600)}/50]. Z=I[{85482-7200x11 (Mod 600)}/50]. Z=I[{6282 (Mod 600)}/50]. Z=I[{6282-600x10}/50]. Z=I[282/50)]. Z=I[5.64]. Z=5. U=5-1+2x3 (Mod 10), U=10 (Mod 10), U=10. Hence, the `Second Fortune Co-ordinates' (G6,C6) of time at 11:44:42 p.m. on 20th December of 1995 is (10,5). The `Second Code' is `30', `J5', `10F', `JF' or `QUI-CHJ'.
Second Code Formula: SeCAssume the `Second Fortune Co-ordinates' are (U,Z) and the `Sequence Code of Second Fortune Co-ordinates' is `SeC'. The values of `U' and `Z' can determine the `Sequence Code of Second Fortune Co-ordinates' by the formula. On the contrary, the values of `U' and `Z' can be read from the table of `Sequence Code of Second Fortune Co-ordinates'. The `Sequence Code of Second Fortune Co-ordinates' is also named as `50-second Numerology' or `Second Numerology' (N). Thus, N=SeC. The `Second Code Formula' is also called `Second Numerology Formula'. The `Second Code Formula' is SeC=5x{11-[(Z-U) (Mod 12)]}+U. The Stem (U) and Root (Z) of `Fortune Co-ordinates' can be found from the `Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12).No matter male or female, the second fortune of a person always starts from the `Second Fortune Co-ordinates' at birth (UN6,ZN6). The second fortune of a person follows the order of `Fortune Co-ordinates' (U,Z) and it always moves to the next pair of co-ordinates after passing the time at 0 second, 50 seconds or a multiple of 50 seconds. Everybody's `Second Fortune' spins clockwise and shifts to next 50 seconds according to the `Sequence Code of Fortune Co-ordinates' on a 50-seconds base. The `Second Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. For `U' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Second Codes'. Usually, `Second Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Second Fortune Co-ordinates'. For example, `N=1' or `N=01' means the first entry in the table of `Sequence Code of Second Fortune Co-ordinates' and `N=47' means it is the 47th entry. For easier time strap comparison by computer, the `Second Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=283138271334' stands for `H3(year)A6(month)H1(day)G2(hour)C0(10-minute)D9(50-second)'. The time is 3:07:30a.m. on 15th June, 2011. `N=122522255330' stands for `B11E0B9E0C4J5'. The time is 11:44:10p.m. on 20th Dec., 1995. A `Second Code' can be expressed in six different ways. The commonest form is to express the `Second Code' as `Second Fortune Co-ordinates', (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11.If the `Second Fortune Co-ordinates' are (4,1), find the `Sequence Code of Second Fortune Co-ordinates'. Apply the `Second Code Formula', SeC=5x{11-[(Z-U) (Mod 12)]}+U. SeC=5x{11-[(1-4) (Mod 12)]}+4. SeC=5x{11-[-3 (Mod 12)]}+4. SeC=5x{11-[12-3]}+4. SeC=5x{11-9}+4. SeC=5x2+4. SeC=14. Thus, the `Sequence Code of Second Fortune Co-ordinates' of (4,1) is `14'. The `Sequence of Second Numerology' (N) is `14' or N=14. Besides, the `Second Code' of `SeC=14' can also be expressed as `SeC=(4,1)', `SeC=D1', `SeC=4B', `SeC=DB' and `SeC=DIM-CHO'. If the `Numerology' is 19, N=19, find the Stem (U) and Root (Z) of the `Second Fortune Co-ordinates'. Apply the `Stem & Root Formulae', U=19 (Mod 10) & Z=19-1 (Mod 12). U=19-10 & Z=18 (Mod 12). U=9 & Z=18-12. U=9 & Z=6. Thus, the Stem (U) of `Second Fortune Co-ordinates' is 9 and the Root (Z) of `Second Fortune Co-ordinates' is 6. The `Second Fortune Co-ordinates' are (9,6). Since the Second Code (SeC) is same as `Sequence of Second Numerology' (N), SeC=19 and SeC=(9,6). The Second Code (SeC) can also be expressed as `SeC=I6', `SeC=9G', `SeC=IG' or `SeC=YAM-NGG'.
Second Set Formula: SeSAssume `y' is the solar year after `Joint of February', roughly on 4th of February in Gregorian calendar, and `m' is the solar month after `Joint of Month'. If the date is before `Joint of Month', the value of `m' is equal to previous month. If the `Year Code' (YC) and `Month Code' (MC) of two dates are same, the `Day Code' (DC) is (UD,ZD), `d' is the number of days counting from 1st of January of the year (y). `d1' is the value of `d' calculated from the value of Stem of Day (UD) and `d2' is the value of `d' calculated from the value of Root of Day (ZD). If d1=d2 and the months (m) are same, the two dates belong to same `Time Set'. The Day Set Formulae are: d1=UD+5-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 10) & d2=ZD+10-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 12). `d=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If d>10 then `d' becomes `d-10' and if d<1 then `d' becomes `d+10'. Thus, the value range of `d=(Mod 10)' is from 1 to 10. `d=(Mod 12)' is another modulated function such that if d>12 then `d' becomes `d-12' and if d<1 then `d' becomes `d+12'. Thus, the value range of `d=(Mod 12)' is from 1 to 12. The `Second Set Formula' is used to find the time in hours from `Second Code' (SeC). The `Second Code' is expressed in the form of `Second Co-ordinates' (U,Z). If the `Hour Code' is (UH,ZH), the `Minute Code' is (UM,ZM), the `Second Code' is (U,Z) and `h' is the time reckoning in a 24-hour system of a date, the Second Set Formula is: h=2ZH-1+ZM/6+5ZS/360 (Mod 24)In `Prediction Technology and Forensic Mathematics' (PT&FM), `Time Set' is a set of time which has same `Time Codes'. If the precision of time in the `Time Set' is 50 seconds, it is a `Second Set'. The time in `Second Set' is sexagesimal. The `Time Codes' of months, days and times in the `Set' are same but years are different. So, they are classified as a set. For example, the `Time Codes' (TC) of 3:07:30a.m. on 30th June, 1951 and 3:08:19a.m. on 15th June, 2011 are identical. TC=H3A6H1G2C0D9. The Numerology (N) is N=283138271334. These two data of time belong to same `Time Set' because they are in same 50-second interval. In the `Second Code' (U,Z), `U' is the `Stem' of the `Second Code' and `Z' is the `Root' of the `Second Code' where `U' and `Z' are integers. The value of `U' shows the alphabetical order of the letter that it represents. For values of `U' which stands for time interval of 50 seconds, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. The value of `Z' is the Root of Second Code. It stands for time interval of 50 seconds. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. The value of `Z' also shows the location and direction of 50 seconds. It is equal to the Zone (Z) in the space of the universe. `h=(Mod 24)' is a modulated function such that if h=24 or h>24 then `h' becomes `h-24' and if h<0 then `h' becomes `h+24'. Thus, the value range of `h=(Mod 24)' is from 0 to a number smaller than 24.If the Time Code (TC) of a time strap in a specified year y=1958 is `E10F7D11H11A6G10', find the time in Gregorian calendar. The Time Code (TC) is `E10F7D11H11A6G10' means the Numerology (N) is `355624483147'. The Year Code is YC=E10 and it can represent y=1958. The Month Code is MC=F7 and `7' is the Root of Month Code, `m'. So, m=7. It means the 7th month in Gregorian calendar. That is July. The Day Code (DC) is `D11'. The Stem (UD) of Day Code is UD=4 because `D' is the fourth letter in alphabetical order. The Root (ZD) of Day Code is ZD=11. Firstly, find out the date which lies in the month (m) as well as `d1' and `d2' both satisfies the `Day Set Formulae'. The date is 9th July, 1958. Then, appy the `Second Set Formula' to find the time of the `Time Code'. The `Hour Code' (HC) is `H11'. The Stem (UH) of Hour Code is UH=8 because `H' is the eighth letter in alphabetical order. The Root (ZH) of Hour Code is ZH=11. The `Minute Code' (MiC) is `A6'. The Stem (UM) of Minute Code is UM=1 because `A' is the first letter in alphabetical order. The Root (ZM) of Minute Code is ZM=6. The `Second Code' (SeC) is `G10'. The Stem (U) of Second Code is U=7 because `G' is the seventh letter in alphabetical order. The Root (Z) of Second Code is Z=10. Apply the `Second Set Formula', h=2ZH-1+ZM/6+5Z/360 (Mod 24). h=2x11-1+6/6+5x10/360 (Mod 24). h=22-1+1+0.1388888 (Mod 24). h=22.1388888 (Mod 24). h=22.1388888. The time is 10:08:20p.m. on 9th July, 1958.
Tiny Fortune Origin Formula: UN7Since a pair of Second Fortune Co-ordinates represent fifty seconds, each pair of Tiny Fortune Co-ordinates represent 4 and one-sixth seconds (approximately 4.17 seconds). In general, the `Origin of Tiny Fortune Co-ordinates' is expressed as (UN7,ZN7). `UN7' is the Stem of Tiny Code and `ZN7' is the Root of Tiny Code. They are called `Tiny Stem' and `Tiny Root' of Time Code. The time interval of Stem and Root of Tiny Code is four and one-sixth seconds. No matter male or female, the origin of `Tiny Fortune' of a person is the time of `Tiny Fortune Co-ordinates' at birth. As there are twelve values in `ZN7' and there are fifty seconds in a Second Code, a value of `ZN7' stands for four and one-sixth seconds (approximately 4.17 seconds). The value of `ZN7' shifts to the next after passing the time at 0 second, four and one-sixth seconds or a multiple of four and one-sixth seconds. The value of `ZN7' can be calculated directly from time `t' expressed in 24-hour system. But, for finding out the value of `UN7', the `UN6' value of `Second Fortune Co-ordinates' (UN6,ZN6) of 50 seconds must be calculated first. Assume the `Second Fortune Co-ordinates' are (US,ZS) and the origin of `Tiny Fortune Co-ordinates' are (U,Z). `t' is the time counting in seconds of a person at birth reckoning in 24-hour system. The `Tiny Fortune Origin Formula' is `U=Z-1+2xUS (Mod 10) & Z=I[6x{{{t (Mod 7200)} (Mod 600)} (Mod 50)}/25]'.The `Origin of Tiny Fortune Co-ordinates' (UN7,ZN7) of a person at birth is important in `Prediction Technology and Forensic Mathematics' (PT&FM). It is called the `Tiny Code' of a person. No matter male or female, the `Tiny Fortune Co-ordinates' (G7,C7) always spin clockwise. It starts to move from the origin at (UN7,ZN7) to the next Tiny Fortune Co-ordinates' (G7,C7) after four and one-sixth seconds. For `UN7' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `ZN7' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of an interval of four and one-sixth seconds is called the `Tiny Fortune Code' or `Tiny Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 7200)' is a modulated function such that if Z>7199 then `Z' becomes `Z-7200' and if Z<0 then `Z' becomes `Z+7200'. Thus, the value range of `Z=(Mod 7200)' is from 0 to 7199. `Z=(Mod 600)' is a modulated function such that if Z>599 then `Z' becomes `Z-600' and if Z<0 then `Z' becomes `Z+600'. Thus, the value range of `Z=(Mod 600)' is from 0 to 599. `Z=(Mod 50)' is a modulated function such that if Z>49 then `Z' becomes `Z-50' and if Z<0 then `Z' becomes `Z+50'. Thus, the value range of `Z=(Mod 50)' is from 0 to 49.Assume a person was born at 3:07:39 a.m. on 15th June of 2011. Find the `Origin of Tiny Fortune Co-ordinates' (UN7,ZN7). Firstly, find out the value of `UN6' by applying the `Second Fortune Origin Formula' and `UN6=4'. Thus, `US=4'. Next, calculate the value of `t'. t=3x3600+7x60+39. t=11259. Then, apply the `Tiny Fortune Origin Formula', `U=Z-1+2xUS (Mod 10) & Z=I[6x{{{t (Mod 7200)} (Mod 600)} (Mod 50)}/25]'. Find the value of `Z' first. Z=I[6x{{{11259 (Mod 7200)} (Mod 600)} (Mod 50)}/25]. Z=I[6x{{11259-7200 (Mod 600)} (Mod 50)}/25]. Z=I[6x{{4059 (Mod 600)} (Mod 50)}/25]. Z=I[6x{4059-600x6 (Mod 50)}/25]. Z=I[6x{459 (Mod 50)}/25]. Z=I[6x{459-50x9}/25]. Z=I[6x9/25]. Z=I[2.16]. Z=2. U=2-1+2x4 (Mod 10). U=9 (Mod 10). U=9. Hence, the `Origin of Tiny Fortune Co-ordinates' (UN7,ZN7) of a person born at 3:07:39 a.m. on 15th June of 2011 is (9,2). The `Tiny Code' is `39', `I2', `9C', `IC' or `YAM-YAN'. If a person was born at 11:44:42 p.m. on 20th December of 1995, find the `Origin of Tiny Fortune Co-ordinates' (UN7,ZN7). Firstly, find out the value of `UN6' by applying the `Second Fortune Origin Formula' and `UN6=10'. Thus, `US=10'. Next, calculate the value of `t'. t=23x3600+44x60+42. t=85482. Then, apply the `Tiny Fortune Origin Formula', `U=Z-1+2xUS (Mod 10) & Z=I[6x{{{t (Mod 7200)} (Mod 600)} (Mod 50)}/25]'. Find the value of `Z' first. Z=I[6x{{{85482 (Mod 7200)} (Mod 600)} (Mod 50)}/25]. Z=I[6x{{85482-7200x11 (Mod 600)} (Mod 50)}/25]. Z=I[6x{{6282 (Mod 600)} (Mod 50)}/25]. Z=I[6x{6282-600x10 (Mod 50)}/25]. Z=I[6x{282 (Mod 50)}/25]. Z=I[6x{282-50x5}/25]. Z=I[6x32/25]. Z=I[7.68]. Z=7. U=7-1+2x10 (Mod 10). U=26 (Mod 10). U=26-10x2. U=6. Hence, the `Origin of Tiny Fortune Co-ordinates' (UN7,ZN7) of a person born at 11:44:42 p.m. on 20th December of 1995 is (6,7). The `Tiny Code' is `56', `F7', `6H', `FH' or `GAI-MEI'.
Tiny Fortune Formula: GC7Since a pair of Second Fortune Co-ordinates represent fifty seconds, each pair of Tiny Fortune Co-ordinates represent 4 and one-sixth seconds (approximately 4.17 seconds). In general, the `Tiny Fortune Co-ordinates' are expressed as (G7,C7). `G7' is the Stem of Tiny Code and `C7' is the Root of Tiny Code. They are called `Tiny Stem' and `Tiny Root' of Fortune Code. The time interval of Stem and Root of Tiny Code is four and one-sixth seconds. As there are twelve values in `C7' and there are 50 seconds in a Second Code, a value of `C7' stands for four and one-sixth seconds (4.17 seconds). The value of `C7' shifts to the next after passing the time at 0 second, four and one-sixth seconds or a multiple of four and one-sixth seconds. The value of `C7' can be calculated directly from time `t' expressed in 24-hour system. But, for finding out the value of `G7', the `G6' value of `Second Fortune Co-ordinates' (G6,C6) of 50 seconds must be calculated first. Assume the `Second Fortune Co-ordinates' are (GS,CS) and the `Tiny Fortune Co-ordinates' are (U,Z). `t' is the time counting in seconds reckoning in 24-hour system. The `Tiny Fortune Formula' is `U=Z-1+2xGS (Mod 10) & Z=I[6x{{{t (Mod 7200)} (Mod 600)} (Mod 50)}/25]'.No matter male or female, the `Tiny Fortune Co-ordinates' (G7,C7) always spin clockwise. The `Tiny Fortune Co-ordinates' start to move from the `Origin of Tiny Fortune Co-ordinates' at (UN7,ZN7) to the next Tiny Fortune Co-ordinates' (G7,C7) after four and one-sixth seconds. They oscillate in a loop of 60 and they are expressed as (G7,C7), where `G7' and `C7' are integers. For `G7' values in modulus of ten, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `C7' values in modulus of twelve, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Fortune Codes'. The `Fortune Code' of an interval of four and one-sixth seconds is called the `Tiny Fortune Code' or `Tiny Code'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 7200)' is a modulated function such that if Z>7199 then `Z' becomes `Z-7200' and if Z<0 then `Z' becomes `Z+7200'. Thus, the value range of `Z=(Mod 7200)' is from 0 to 7199. `Z=(Mod 600)' is a modulated function such that if Z>599 then `Z' becomes `Z-600' and if Z<0 then `Z' becomes `Z+600'. Thus, the value range of `Z=(Mod 600)' is from 0 to 599. `Z=(Mod 50)' is a modulated function such that if Z>49 then `Z' becomes `Z-50' and if Z<0 then `Z' becomes `Z+50'. Thus, the value range of `Z=(Mod 50)' is from 0 to 49.Assume to find the `Tiny Fortune Co-ordinates' (G7,C7) of the time at 3:07:39 a.m. on 15th June of 2011. Firstly, find out the value of `G6' by applying the `Second Fortune Formula' and `G6=4'. Thus, `GS=4'. Next, calculate the value of `t'. t=3x3600+7x60+39. t=11259. Then, apply the `Tiny Fortune Formula', `U=Z-1+2xGS (Mod 10) & Z=I[6x{{{t (Mod 7200)} (Mod 600)} (Mod 50)}/25]'. Find the value of `Z' first. Z=I[6x{{{11259 (Mod 7200)} (Mod 600)} (Mod 50)}/25]. Z=I[6x{{11259-7200 (Mod 600)} (Mod 50)}/25]. Z=I[6x{{4059 (Mod 600)} (Mod 50)}/25]. Z=I[6x{4059-600x6 (Mod 50)}/25]. Z=I[6x{459 (Mod 50)}/25]. Z=I[6x{459-50x9}/25]. Z=I[6x9/25]. Z=I[2.16]. Z=2. U=2-1+2x4 (Mod 10). U=9 (Mod 10). U=9. Hence, the `Tiny Fortune Co-ordinates' (G7,C7) of time at 3:07:39 a.m. on 15th June of 2011 is (9,2). The `Tiny Code' is `39', `I2', `9C', `IC' or `YAM-YAN'. If the time is 11:44:42 p.m. on 20th December of 1995, find the `Tiny Fortune Co-ordinates' (G7,C7). Firstly, find out the value of `G6' by applying the `Second Fortune Formula' and `G6=10'. Thus, `GS=10'. Next, calculate the value of `t'. 23x3600+44x60+42. t=85482. Then, apply the `Tiny Fortune Formula', `U=Z-1+2xGS (Mod 10) & Z=I[6x{{{t (Mod 7200)} (Mod 600)} (Mod 50)}/25]'. Find the value of `Z' first. Z=I[6x{{{85482 (Mod 7200)} (Mod 600)} (Mod 50)}/25]. Z=I[6x{{85482-7200x11 (Mod 600)} (Mod 50)}/25]. Z=I[6x{{6282 (Mod 600)} (Mod 50)}/25]. Z=I[6x{6282-600x10 (Mod 50)}/25]. Z=I[6x{282 (Mod 50)}/25]. Z=I[6x{282-50x5}/25]. Z=I[6x32/25]. Z=I[7.68]. Z=7. U=7-1+2x10 (Mod 10). U=26 (Mod 10). U=26-10x2. U=6. Hence, the `Tiny Fortune Co-ordinates' (G7,C7) of time at 11:44:42 p.m. on 20th December of 1995 is (6,7). The `Tiny Code' is `56', `F7', `6H', `FH' or `GAI-MEI'.
Tiny Code Formula: TiCAssume the `Tiny Fortune Co-ordinates' are (U,Z) and the `Sequence Code of Tiny Fortune Co-ordinates' is `TiC'. The values of `U' and `Z' can determine the `Sequence Code of Tiny Fortune Co-ordinates' by the formula. On the contrary, the values of `U' and `Z' can be read from the table of `Sequence Code of Tiny Fortune Co-ordinates'. The `Sequence Code of Tiny Fortune Co-ordinates' is also named as `4.17-second Numerology' or `Tiny Numerology' (N). Thus, N=TiC. The `Tiny Code Formula' is also called `Tiny Numerology Formula'. The `Tiny Code Formula' is TiC=5x{11-[(Z-U) (Mod 12)]}+U. The Stem (U) and Root (Z) of `Tiny Fortune Co-ordinates' can be found from `Tiny Numerology' (N) by the `Stem & Root' Formulae. The `Stem & Root' Formulae are U=N (Mod 10) & Z=N-1 (Mod 12).No matter male or female, the tiny fortune of a person always starts from the `Tiny Fortune Co-ordinates' at birth (UN7,ZN7). The tiny fortune of a person follows the order of `Fortune Co-ordinates' (U,Z) and it always moves to the next pair of co-ordinates after passing the time at 0 second, four and one-sixth seconds or a multiple of four and one-sixth seconds (approximately 4.17 seconds). Everybody's `Tiny Fortune' spins clockwise and shifts to next four and one-sixth seconds according to the `Sequence Code of Fortune Co-ordinates' on a 4.17-second base. The `Tiny Fortune' recurs in 60 `Fortune Co-ordinates' expressed as `(U,Z)' where `U' and `Z' are integers. For `U' values, 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. They are called `Tiny Codes'. Usually, `Tiny Numerology' (N) is expressed by one or two digits to note the `Sequence Code of Tiny Fortune Co-ordinates'. For example, `N=4' or `N=04' means the 4th entry in the table of `Sequence Code of Tiny Fortune Co-ordinates' and `N=59' means it is the 59th entry. For easier time strap comparison by computer, the `Tiny Numerology' (N) must be expressed by two digits. Conventionally, the Numerology (N) of time is expressed beginning with year. For example, `N=28313827133441' stands for `H3(year)A6(month)H1(day)G2(hour)C0(10-minute)D9(50-second)A4(4.17-second)'. The time is 3:07:39a.m. on 15th June, 2011. `N=12252225533056' stands for `B11E0B9E0C4J5F7'. The time is 11:44:42p.m. on 20th Dec., 1995. A `Tiny Code' can be expressed in six different ways. The commonest form is to express the `Tiny Code' as `Tiny Fortune Co-ordinates', (U,Z). `U' is a value on the X-axis of a `X-Y' plane and `Z' is a value on the Y-axis of a `X-Y' plane. `U=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If U>10 then `U' becomes `U-10' and if U<1 then `U' becomes `U+10'. Thus, the value range of `U=(Mod 10)' is from 1 to 10. `Z=(Mod 12)' is a modulated function such that if `Z' is greater than 11 then `Z' becomes `Z-12' and if `Z' is less than 0 then `Z' becomes `Z+12'. Thus, the value range of `Z=(Mod 12)' is from 0 to 11.If the `Tiny Fortune Co-ordinates' are (4,1), apply the `Tiny Code Formula'. TiC=5x{11-[(Z-U) (Mod 12)]}+U. TiC=5x{11-[(1-4) (Mod 12)]}+4. TiC=5x{11-[-3 (Mod 12)]}+4. TiC=5x{11-[12-3]}+4. TiC=5x{11-9}+4. TiC=5x2+4. TiC=14. Thus, the `Sequence Code of Tiny Fortune Co-ordinates' of (4,1) is `14'. The `Tiny Numerology' (N) is `14' or N=14. Besides, the `Tiny Code' of `TiC=14' can also be expressed as `TiC=(4,1)', `TiC=D1', `TiC=4B', `TiC=DB' and `TiC=DIM-CHO'. If the `Tiny Numerology' is 1, N=1, find the Stem (U) and Root (Z) of the `Tiny Fortune Co-ordinates'. Apply the `Stem & Root Formulae'. U=1 (Mod 10) & Z=1-1 (Mod 12). U=1 & Z=0 (Mod 12). U=1 & Z=0. Thus, the Stem (U) of `Tiny Fortune Co-ordinates' is 1 and the Root (Z) of `Tiny Fortune Co-ordinates' is 0. The `Tiny Fortune Co-ordinates' are (1,0). Since the Tiny Code (TiC) is same as `Tiny Numerology' (N), TiC=01 and TiC=(1,0). The Tiny Code (TiC) can also be expressed as `TiC=A0', `TiC=1A', `TiC=AA' or `TiC=GAP-CHI'.
Tiny Set Formula: TiSAssume `y' is the solar year after `Joint of February', roughly on 4th of February in Gregorian calendar, and `m' is the solar month after `Joint of Month'. If the date is before `Joint of Month', the value of `m' is equal to previous month. If the `Year Code' (YC) and `Month Code' (MC) of two dates are same, the `Day Code' (DC) is (UD,ZD), `d' is the number of days counting from 1st of January of the year (y). `d1' is the value of `d' calculated from the value of Stem of Day (UD) and `d2' is the value of `d' calculated from the value of Root of Day (ZD). If d1=d2 and the months (m) are same, the two dates belong to same `Time Set'. The Day Set Formulae are: d1=UD+5-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 10) & d2=ZD+10-365(y-1)-I[(y-1)/4]+I[(y-1)/100]-I[(y-1)/400]+I[(y-1)/3225] (Mod 12). `d=(Mod 10)' is a special modulated function such that the smallest value of it is 1 and the largest value of it is 10. If d>10 then `d' becomes `d-10' and if d<1 then `d' becomes `d+10'. Thus, the value range of `d=(Mod 10)' is from 1 to 10. `d=(Mod 12)' is another modulated function such that if d>12 then `d' becomes `d-12' and if d<1 then `d' becomes `d+12'. Thus, the value range of `d=(Mod 12)' is from 1 to 12. The `Tiny Set Formula' is used to find the time in hours from `Tiny Code' (TiC). The `Tiny Code' is expressed in the form of `Tiny Co-ordinates' (U,Z). If the `Hour Code' is (UH,ZH), the `Minute Code' is (UM,ZM), the `Second Code' is (US,ZS) and `h' is the time reckoning in a 24-hour system of a date, the Tiny Set Formula is: h=2ZH-1+ZM/6+5ZS/360+Z/864 (Mod 24)In `Prediction Technology and Forensic Mathematics' (PT&FM), `Time Set' is a set of time which has same `Time Codes'. If the precision of time in the `Time Set' is four and one-sixth seconds (approximately 4.17 seconds), it is a `Tiny Set'. It means the time in this set is very precise. The time in `Tiny Set' is sexagesimal. The `Time Codes' of months, days and times in the `Set' are same but years are different. So, they are classified as a set. For example, the `Time Codes' (TC) of 3:07:39a.m. on 30th June, 1951 and 3:07:42a.m. on 15th June, 2011 are identical. TC=H3A6H1G2C0D9I2. The Numerology (N) is N=28313827133439. These two data of time belong to same `Time Set' because they are in same 4.17-second interval. In the `Tiny Code' (U,Z), `U' is the `Stem' of the `Tiny Code' and `Z' is the `Root' of the `Tiny Code' where `U' and `Z' are integers. The value of `U' shows the alphabetical order of the letter that it represents. For values of `U' which stands for time interval of four and one-sixth seconds (approximately 4.17 seconds), 1 is `A', 2 is `B', 3 is `C', 4 is `D', 5 is `E', 6 is `F', 7 is `G', 8 is `H', 9 is `I', 10 is `J'. So, (1,0)=A0, (2,1)=B1, (3,2)=C2, and so on. The value of `Z' is the Root of Tiny Code. It stands for time interval of four and one-sixth seconds (approximately 4.17 seconds). For `Z' values, 0 is `A', 1 is `B', 2 is `C', 3 is `D', 4 is `E', 5 is `F', 6 is `G', 7 is `H', 8 is `I', 9 is `J', 10 is `K', 11 is `L'. So, (1,0)=1A, (2,1)=2B, (3,2)=3C, and so on. For all in terms of alphabets, (1,0)=AA, (2,1)=BB, (3,2)=CC, and so on. The value of `Z' also shows the location and direction of four and one-sixth seconds. It is equal to the Zone (Z) in the space of the universe. `h=(Mod 24)' is a modulated function such that if h=24 or h>24 then `h' becomes `h-24' and if h<0 then `h' becomes `h+24'. Thus, the value range of `h=(Mod 24)' is from 0 to a number smaller than 24.If the Time Code (TC) of a time strap in a specified year y=1995 is `B11E0B9E0C4J5F7', find the time in Gregorian calendar. Time Code (TC) is `B11E0B9E0C4J5F7' means the Numerology (N) is `12252225533056'. The Year Code is YC=B11 and it can represent y=1995. The Month Code is MC=E0. The Stem of Month Code is 5 because `E' is the fifth letter in alphabetical order. The Root of Month Code is 0. That is, m=0 (Mod 12). m=0+12. m=12. It stands for the 12th month in Gregorian calendar. The month is regarded as December. It stands for the days after `Joint of Month' in December but before `Joint of Month' in January. The Day Code (DC) is `B9'. The Stem (UD) of Day Code is UD=2 because `B' is the second letter in alphabetical order. The Root (ZD) of Day Code is ZD=9. Firstly, find out the date which lies in the month (m) as well as `d1' and `d2' both satisfies the `Day Set Formulae'. The date is 20th Dec, 1995. Then, appy the `Tiny Set Formula' to find the time of the `Time Code'. The `Hour Code' (HC) is `E0'. The Stem (UH) of Hour Code is UH=5 because `E' is the fifth letter in alphabetical order. The Root (ZH) of Hour Code is ZH=0. The `Minute Code' (MiC) is `C4'. The Stem (UM) of Minute Code is UM=3 because `C' is the third letter in alphabetical order. The Root (ZM) of Minute Code is ZM=4. The `Second Code' (SeC) is `J5'. The Stem (US) of Second Code is US=10 because `J' is the tenth letter in alphabetical order. The Root (ZS) of Second Code is ZS=5. The `Tiny Code' (TiC) is `F7'. The Stem (U) of Tiny Code is U=6 because `F' is the sixth letter in alphabetical order. The Root (Z) of Tiny Code is Z=7. Apply the `Tiny Set Formula', h=2ZH-1+ZM/6+5ZS/360+Z/864 (Mod 24). h=2x0-1+4/6+5x5/360+7/864 (Mod 24). h=-1+0.666666666+0.069444444+0.008101851 (Mod 24). h=-0.255787039 (Mod 24). h=24-0.2557876. h=23.74421296. The time is 11:44:39.17p.m. to 11:44:43.33p.m. on 20th Dec., 1995.
E16 Track Formula: TrackLet M=2xI[S/2]&C[If M=10 then M=2]. If R[y/10]=1 or R[y/10]=6, then E=5-M+I[M/4]+4xI[M/6]+3xI[M/8].`E' is the `Track Number' of the characteristics of a person. `S' is the zone which marks the position of `Soul'. `M' is the nearest `Even Zone' of `Soul'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' is a remainder function such that it takes the remainder of the solar year of birth, `y', divided by 10.If y=1986 and S=9, then R[y/10]=6. Since M=2xI[S/2]&C[If M=10 then M=2], then M=2xI[9/2]&C[If M=10 then M=2]. M=2xI[4.5]&C[If M=10 then M=2]. M=2x4&C[If M=10 then M=2]. M=8&C[If M=10 then M=2]. M=8. Since E=5-M+I[M/4]+4xI[M/6]+3xI[M/8], E=5-8+I[8/4]+4xI[8/6]+3xI[8/8]. E=-3+I[2]+4xI[1.333]+3xI[1]. E=-3+2+4x1+3x1. E=-1+4+3. E=6.
E27 Track Formula: TrackLet M=2xI[S/2]&C[If M=10 then M=2]. If R[y/10]=2 or R[y/10]=7, then E=(M+6)/2+I[M/4]-5xI[M/6]+I[M/8].`E' is the `Track Number' of the characteristics of a person. `S' is the zone which marks the position of `Soul'. `M' is the nearest `Even Zone' of `Soul'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' is a remainder function such that it takes the remainder of the solar year of birth, `y', divided by 10.If y=1912 and S=4, then R[y/10]=2. Since M=2xI[S/2]&C[If M=10 then M=2], then M=2xI[4/2]&C[If M=10 then M=2]. M=2xI[2]&C[If M=10 then M=2]. M=2x2&C[If M=10 then M=2]. M=4&C[If M=10 then M=2]. M=4. Since E=(M+6)/2+I[M/4]-5xI[M/6]+I[M/8], E=(4+6)/2+I[4/4]-5xI[4/6]+I[4/8]. E=10/2+I[1]-5xI[0.666]+I[0.5]. E=5+1-5x0+0. E=6.
E38 Track Formula: TrackLet M=2xI[S/2]&C[If M=10 then M=2]. If R[y/10]=3 or R[y/10]=8, then E=4-M+5xI[M/4]+3xI[M/6]-6xI[M/8].`E' is the `Track Number' of the characteristics of a person. `S' is the zone which marks the position of `Soul'. `M' is the nearest `Even Zone' of `Soul'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' is a remainder function such that it takes the remainder of the solar year of birth, `y', divided by 10.If y=1998 and S=7, then R[y/10]=8. Since M=2xI[S/2]&C[If M=10 then M=2], then M=2xI[7/2]&C[If M=10 then M=2]. M=2xI[3.5]&C[If M=10 then M=2]. M=2x3&C[If M=10 then M=2]. M=6&C[If M=10 then M=2]. M=6. Since E=4-M+5xI[M/4]+3xI[M/6]-6xI[M/8], E=4-6+5xI[6/4]+3xI[6/6]-6xI[6/8]. E=-2+5xI[1.5]+3xI[1]-6xI[0.75]. E=-2+5x1+3x1-6x0. E=-2+5+3-0. E=6.
E49 Track Formula: TrackLet M=2xI[S/2]&C[If M=10 then M=2]. If R[y/10]=4 or R[y/10]=9, then E=2+2M-7xI[M/4]-2xI[M/6]+2xI[M/8].`E' is the `Track Number' of the characteristics of a person. `S' is the zone which marks the position of `Soul'. `M' is the nearest `Even Zone' of `Soul'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' is a remainder function such that it takes the remainder of the solar year of birth, `y', divided by 10.If y=2004 and S=1, then R[y/10]=4. Since M=2xI[S/2]&C[If M=10 then M=2], then M=2xI[1/2]&C[If M=10 then M=2]. M=2xI[0.5]&C[If M=10 then M=2]. M=2x0&C[If M=10 then M=2]. M=0&C[If M=10 then M=2]. M=0. Since E=2+2M-7xI[M/4]-2xI[M/6]+2xI[M/8], E=2+2x0-7xI[0/4]-2xI[0/6]+2xI[0/8]. E=2+0-7xI[0]-2xI[0]+2xI[0]. E=2-7x0-2x0+2x0. E=2-0-0+0. E=2.
E50 Track Formula: TrackLet M=2xI[S/2]&C[If M=10 then M=2]. If R[y/10]=5 or R[y/10]=0. then E=6-M/2.`E' is the `Track Number' of the characteristics of a person. `S' is the zone which marks the position of `Soul'. `M' is the nearest `Even Zone' of `Soul'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[y/10]' is a remainder function such that it takes the remainder of the solar year of birth, `y', divided by 10.If y=1940 and S=11, then R[y/10]=0. Since M=2xI[S/2]&C[If M=10 then M=2], then M=2xI[11/2]&C[If M=10 then M=2]. M=2xI[5.5]&C[If M=10 then M=2]. M=2x5&C[If M=10 then M=2]. M=10&C[If M=10 then M=2]. M=2. Since E=6-M/2. E=6-2/2. E=6-1. E=5.
E2 Destiny Characteristics Formula: ChzIf E=2, then Chz=1+I[d/2] (Mod 12).`E' is the `Track Number' of the characteristics of a person. Since gravity of the moon can affect human's thinkings and behaviours, `d' is the lunar day of a month, not reckoned on a solar base. `Chz' is a special `Timeon' (Fate Particle). Owing to the fact that `Chz' is a crucial variable of many `Timeon Formulae', it is the most important `Fate Particle'. The constitution of it's related `Timeons' form a special `Time Gene' which can determine the `Destiny Characteristics' of a person. Hence, the value of `Chz' can be regarded as a `Code' of finger-prints of personal `Destiny Characteristics'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Chz=(Mod 12)' is a modulated function such that if Chz>11 then `Chz' becomes `Chz-12' and if Chz<0 then `Chz' becomes `Chz+12'. Thus, the value range of `Chz=(Mod 12)' is from 0 to 11.If E=2 and d=30, Chz=1+I[d/2] (Mod 12). Chz=1+I[30/2] (Mod 12). Chz=1+I[15] (Mod 12). Chz=1+15 (Mod 12). Chz=16 (Mod 12). Chz=16-12. Chz=4.
E3 Destiny Characteristics Formula: ChzIf E=3, then Chz=1+I[d/3]+3x{I[(d-1)/3]-I[(d-2)/3]} (Mod 12).`E' is the `Track Number' of the characteristics of a person. Since gravity of the moon can affect human's thinkings and behaviours, `d' is the lunar day of a month, not reckoned on a solar base. `Chz' is a special `Timeon' (Fate Particle). Owing to the fact that `Chz' is a crucial variable of many `Timeon Formulae', it is the most important `Fate Particle'. The constitution of it's related `Timeons' form a special `Time Gene' which can determine the `Destiny Characteristics' of a person. Hence, the value of `Chz' can be regarded as a `Code' of finger-prints of personal `Destiny Characteristics'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Chz=(Mod 12)' is a modulated function such that if Chz>11 then `Chz' becomes `Chz-12' and if Chz<0 then `Chz' becomes `Chz+12'. Thus, the value range of `Chz=(Mod 12)' is from 0 to 11.If E=3 and d=25, Chz=1+I[d/3]+3x{I[(d-1)/3]-I[(d-2)/3]} (Mod 12). Chz=1+I[25/3]+3x{I[(25-1)/3]-I[(25-2)/3]} (Mod 12). Chz=1+I[8.333]+3x{I[24/3]-I[23/3]} (Mod 12). Chz=1+8+3x{I[8]-I[7.666]} (Mod 12). Chz=9+3x{8-7} (Mod 12). Chz=9+3x1 (Mod 12). Chz=9+3 (Mod 12). Chz=12 (Mod 12). Chz=12-12. Chz=0.
E4 Destiny Characteristics Formula: ChzIf E=4, then Chz=11-7x(d-1)+4x{I[(d+1)/4]-I[d/4]}+5xI[(d-1)/4] (Mod 12).`E' is the `Track Number' of the characteristics of a person. Since gravity of the moon can affect human's thinkings and behaviours, `d' is the lunar day of a month, not reckoned on a solar base. `Chz' is a special `Timeon' (Fate Particle). Owing to the fact that `Chz' is a crucial variable of many `Timeon Formulae', it is the most important `Fate Particle'. The constitution of it's related `Timeons' form a special `Time Gene' which can determine the `Destiny Characteristics' of a person. Hence, the value of `Chz' can be regarded as a `Code' of finger-prints of personal `Destiny Characteristics'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Chz=(Mod 12)' is a modulated function such that if Chz>11 then `Chz' becomes `Chz-12' and if Chz<0 then `Chz' becomes `Chz+12'. Thus, the value range of `Chz=(Mod 12)' is from 0 to 11.If E=4 and d=1, Chz=11-7x(d-1)+4x{I[(d+1)/4]-I[d/4]}+5xI[(d-1)/4] (Mod 12). Chz=11-7x(1-1)+4x{I[(1+1)/4]-I[1/4]}+5xI[(1-1)/4] (Mod 12). Chz=11-7x0+4x{I[2/4]-I[0.25]}+5xI[0] (Mod 12). Chz=11-0+4x{I[0.5]-0}+5x0 (Mod 12). Chz=11+4x{0-0}+0 (Mod 12). Chz=11+4x0 (Mod 12). Chz=11+0 (Mod 12). Chz=11 (Mod 12). Chz=11.
E5 Destiny Characteristics Formula: ChzIf E=5, then Chz=6+5x(d-1)-8xI[(d+1)/5]-4xI[d/5] (Mod 12).`E' is the `Track Number' of the characteristics of a person. Since gravity of the moon can affect human's thinkings and behaviours, `d' is the lunar day of a month, not reckoned on a solar base. `Chz' is a special `Timeon' (Fate Particle). Owing to the fact that `Chz' is a crucial variable of many `Timeon Formulae', it is the most important `Fate Particle'. The constitution of it's related `Timeons' form a special `Time Gene' which can determine the `Destiny Characteristics' of a person. Hence, the value of `Chz' can be regarded as a `Code' of finger-prints of personal `Destiny Characteristics'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Chz=(Mod 12)' is a modulated function such that if Chz>11 then `Chz' becomes `Chz-12' and if Chz<0 then `Chz' becomes `Chz+12'. Thus, the value range of `Chz=(Mod 12)' is from 0 to 11.If E=5 and d=21, Chz=6+5x(d-1)-8xI[(d+1)/5]-4xI[d/5] (Mod 12). Chz=6+5x(21-1)-8xI[(21+1)/5]-4xI[21/5] (Mod 12). Chz=6+5x20-8xI[22/5]-4xI[4.2] (Mod 12). Chz=6+100-8xI[4.4]-4x4 (Mod 12). Chz=106-8x4-16 (Mod 12). Chz=106-32-16 (Mod 12). Chz=58 (Mod 12). Chz=58-12x4. Chz=10.
E6 Destiny Characteristics Formula: ChzIf E=6, then Chz=9-3x(d-1)+8x{I[(d+3)/6]-I[d/6]}-4xI[(d+2)/6]-I[(d-1)/6] (Mod 12).`E' is the `Track Number' of the characteristics of a person. Since gravity of the moon can affect human's thinkings and behaviours, `d' is the lunar day of a month, not reckoned on a solar base. `Chz' is a special `Timeon' (Fate Particle). Owing to the fact that `Chz' is a crucial variable of many `Timeon Formulae', it is the most important `Fate Particle'. The constitution of it's related `Timeons' form a special `Time Gene' which can determine the `Destiny Characteristics' of a person. Hence, the value of `Chz' can be regarded as a `Code' of finger-prints of personal `Destiny Characteristics'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Chz=(Mod 12)' is a modulated function such that if Chz>11 then `Chz' becomes `Chz-12' and if Chz<0 then `Chz' becomes `Chz+12'. Thus, the value range of `Chz=(Mod 12)' is from 0 to 11.If E=6 and d=8, Chz=9-3x(d-1)+8x{I[(d+3)/6]-I[d/6]}-4xI[(d+2)/6]-I[(d-1)/6] (Mod 12). Chz=9-3x(8-1)+8x{I[(8+3)/6]-I[8/6]}-4xI[(8+2)/6]-I[(8-1)/6] (Mod 12). Chz=9-3x7+8x{I[11/6]-I[1.333]}-4xI[10/6]-I[7/6] (Mod 12). Chz=9-21+8x{I[1.833]-1}-4xI[1.667]-I[1.167] (Mod 12). Chz=-12+8x{1-1}-4x1-1 (Mod 12). Chz=-12+8x0-4-1 (Mod 12). Chz=-12+0-4-1 (Mod 12). Chz=-17 (Mod 12). Chz=12x2-17. Chz=7.
Chzon Formula: ChzonThe Chzon Formula is: `Chz=0+Chz (Mod 12), Lm=4+Chz (Mod 12), Tg=7+Chz (Mod 12), Mo=8+Chz (Mod 12), Ta=9+Chz (Mod 12), Ke=11+Chz (Mod 12), Pr=2-Chz (Mod 12), Fuo=4-Chz (Mod 12), Ym=5-Chz (Mod 12), Tm=6-Chz (Mod 12), Ku=7-Chz (Mod 12), Su=8-Chz (Mod 12), Le=9-Chz (Mod 12), Cs=10-Chz (Mod 12)'.There are altogether 13 `Fate Particles' (Timeon) related to `Chz'. These `Timeons', including `Chz' altogether 14 `Fate Particles', are named as the `Family of Fate Particles' of `Chz' or `Chzons'. The codes of these `Chzons' are: 1. `Chz', 2. `Lm', 3. `Tg', 4. `Mo', 5. `Ta', 6. `Ke', 7. `Pr', 8. `Fuo', 9. `Ym', 10. `Tm', 11. `Ku', 12. `Su', 13. `Le', 14. `Cs'. The major part of `Destiny Characteristics' of a person is determined by the `Time Gene' of `Chz' and its 13 related `Fate Particles', `Chzons' . The `Chzons' each has enormous power and lays invisible great stress with wonderful influence on human destiny. The power of `Chzons' fill up our universe and their strength never come to an end. In general, `Chz' has the image of king. It means `Supremacy', `Power', `Nobility' and `Dignity'. `Lm' means `Cunning'. `Tg' means `Stability'. `Mo' means `Strength'. `Ta' means `Enthusiasm'. `Ke' means `Swiftness'. `Pr' means `Violence'. `Fuo' has the image of queen. It means `Wealth', `Intellect', `Feminine' and `Beauty'. `Ym' means `Mildness'. `Tm' means `Greediness'. `Ku' means `Entanglement'. `Su' means `Obedience'. `Le' means `Prestige'. `Cs' means `Fierceness'. `Chzon=(Mod 12)' is a modulated function such that if Chzon>11 then `Chzon' becomes `Chzon-12' and if Chzon<0 then `Chzon' becomes `Chzon+12'. Thus, the value range of `Chzon=(Mod 12)' is from 0 to 11.If Chz=7, apply the Chzon Formula `Lm=4+Chz (Mod 12), Tg=7+Chz (Mod 12), Mo=8+Chz (Mod 12), Ta=9+Chz (Mod 12), Ke=11+Chz (Mod 12), Pr=2-Chz (Mod 12), Fuo=4-Chz (Mod 12), Ym=5-Chz (Mod 12), Tm=6-Chz (Mod 12), Ku=7-Chz (Mod 12), Su=8-Chz (Mod 12), Le=9-Chz (Mod 12), Cs=10-Chz (Mod 12)', Lm=4+7 (Mod 12). Lm=11 (Mod 12). Lm=11. Tg=7+7 (Mod 12). Tg=14 (Mod 12). Tg=14-12. Tg=2. Mo=8+7 (Mod 12). Mo=15 (Mod 12). Mo=15-12. Mo=3. Ta=9+7 (Mod 12). Ta=16 (Mod 12). Ta=16-12. Ta=4. Ke=11+7 (Mod 12). Ke=18 (Mod 12). Ke=18-12. Ke=6. Pr=2-7 (Mod 12). Pr=-5 (Mod 12). Pr=12-5. Pr=7. Fuo=4-7 (Mod 12). Fuo=-3 (Mod 12). Fuo=12-3. Fuo=9. Ym=5-7 (Mod 12). Ym=-2 (Mod 12). Ym=12-2. Ym=10. Tm=6-7 (Mod 12). Tm=-1 (Mod 12). Tm=12-1. Tm=11. Ku=7-7 (Mod 12). Ku=0 (Mod 12). Ku=0. Su=8-7 (Mod 12). Su=1 (Mod 12). Su=1. Le=9-7 (Mod 12). Le=2 (Mod 12). Le=2. Cs=10-7 (Mod 12). Cs=3 (Mod 12). Cs=3.
Houron Formula: HouronThe Houron Formula is: `Im=3+3xR[(y+3)/4]-5xR[(y+1)/2]+7xI[R[(y+3)/4]/3]+A[h/2] (Mod 12), Li=5xR[y/4]+5xR[(y+2)/4]-10xR[y/2]+5xI[R[(y+1)/4]/3]+A[h/2] (Mod 12), Ch=10-A[h/2] (Mod 12), Kk=4+A[h/2] (Mod 12), Hun=11-A[h/2] (Mod 12), Kip=11+A[h/2] (Mod 12), Tfu=6+A[h/2] (Mod 12), Fgo=2+A[h/2] (Mod 12)'. SM=&C[{SC:m=0, f=1 & R[(SC+y)/2]]. Sen=8+3x(E-2)-9xI[E/4]+3xI[E/6] (Mod 12). Muk={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+1, R[(SC+y)/2]=1:-1}] (Mod 12). Dai={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+2, R[(SC+y)/2]=1:-2}] (Mod 12). Lam={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+3, R[(SC+y)/2]=1:-3}] (Mod 12). Won={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+4, R[(SC+y)/2]=1:-4}] (Mod 12). Suy={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+5, R[(SC+y)/2]=1:-5}] (Mod 12). Bam=2+3x(E-2)-9xI[E/4]+3xI[E/6] (Mod 12). Sei={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+7, R[(SC+y)/2]=1:-7}] (Mod 12). Moo={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+8, R[(SC+y)/2]=1:-8}] (Mod 12). Jut={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+9, R[(SC+y)/2]=1:-9}] (Mod 12). Toi={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+10, R[(SC+y)/2]=1:-10}] (Mod 12). Yeo={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+11, R[(SC+y)/2]=1:-11}] (Mod 12). See=5+m-A[h/2] (Mod 12). Seu=7+m-A[h/2] (Mod 12).There are altogether twenty-two `Timeons' which are directly or partially related to a couple of hours. They are named as `Fate Particle' of `Hour' or `Houron'. The codes of these `Hourons' are: 1.`Im', 2.`Li', 3.`Ch', 4.`Kk', 5.`Hun', 6.`Kip', 7.`Tfu', 8.`Fgo', 9.`Sen', 10.`Muk', 11.`Dai', 12.`Lam', 13.`Won', 14.`Suy', 15.`Bam', 16.`Sei', 17.`Moo', 18.`Jut', 19.`Toi', 20.`Yeo', 21.`See', 22.`Seu'. The `Hourons' each has fantastic power and lays invisible stress with different influence on human destiny within two hours. In general, `Im' means `Vicious' or `Kill'. `Li' means `Malevolent' or `Kill'. `Ch' means `Literacy'. `Kk' means `Speech'. `Hun' means `Loss',`Nil' or `Flight'. `Kip' means `Robbery' or `Disaster'. `Tfu' means `Success' or `Award'. `Fgo' means `Entitlement', `Mandate' or `Achieve'. `Sen' means `Born' or `Alive'. `Muk' means `Obscene'. `Dai' means `Begin' or `Mature'. `Lam' means `Officate' or `Reign'. `Won' means `Flourish' or Strong'. `Suy' means `Decline' or `Degenerate'. `Bam' means `Sick'. `Sei' means `Die'. `Moo' means `Store' or `Conceal'. `Jut' means `Cut' or `None'. `Toi' means `Embryo' or `Reincarnate'. `Yeo' means `Nourish' or `Grow'. `See' means `Execute' or `Appoint'. `Seu' means `Injure' or `Sick'. `y' is the year of birth of a person after `Joint of Year' in Gregorian calendar. `Joint of Year' is same as `Joint of February'. If the time of birth is before `Joint of February', it is regarded as previous year. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `SM' is the `Spin Mode' of one's fortune. If SM=0, it means the `Spin Mode' is clockwise. If SM=1, it means the `Spin Mode' is anti-clockwise. `E' is the `Track' of one's personal characteristics. `R[m/n]' is a remainder function such that it takes the remainder of `m' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `Houron=(Mod 12)' is a modulated function such that if Houron>11 then `Houron' becomes `Houron-12' and if Houron<0 then `Houron' becomes `Houron+12'. Thus, the value range of `Houron=(Mod 12)' is from 0 to 11.If y=1976 and h=0:45, apply the Houron Formula `Im=3+3xR[(y+3)/4]-5xR[(y+1)/2]+7xI[R[(y+3)/4]/3]+A[h/2] (Mod 12), Li=5xR[y/4]+5xR[(y+2)/4]-10xR[y/2]+5xI[R[(y+1)/4]/3]+A[h/2] (Mod 12), Ch=10-A[h/2] (Mod 12), Kk=4+A[h/2] (Mod 12), Hun=11-A[h/2] (Mod 12), Kip=11+A[h/2] (Mod 12), Tfu=6+A[h/2] (Mod 12), Fgo=2+A[h/2] (Mod 12)', Im=3+3xR[(1976+3)/4]-5xR[(1976+1)/2]+7xI[R[(1976+3)/4]/3]+A[(0+45/60)/2] (Mod 12). Im=3+3xR[1979/4]-5xR[1977/2]+7xI[R[1979/4]/3]+A[0.75/2] (Mod 12). Im=3+3x3-5x1+7xI[3/3]+A[0.375] (Mod 12). Im=3+9-5+7xI[1]+0 (Mod 12). Im=7+7x1 (Mod 12). Im=7+7 (Mod 12). Im=14 (Mod 12). Im=14-12. Im=2. Li=5xR[1976/4]+5xR[(1976+2)/4]-10xR[1976/2]+5xI[R[(1976+1)/4]/3]+A[(0+45/60)/2] (Mod 12). Li=5x0+5xR[1978/4]-10x0+5xI[R[1977/4]/3]+A[0.75/2] (Mod 12). Li=5x2-5xI[1/3]+A[0.375] (Mod 12). Li=10-5xI[0.333]+0 (Mod 12). Li=10-5x0 (Mod 12). Li=10-0 (Mod 12). Li=10 (Mod 12). Li=10. Ch=10-A[(0+45/60)/2] (Mod 12). Ch=10-A[0.75/2] (Mod 12). Ch=10-A[0.375] (Mod 12). Ch=10-0 (Mod 12). Ch=10 (Mod 12). Ch=10. Kk=4+A[(0+45/60)/2] (Mod 12). Kk=4+A[0.75/2] (Mod 12). Kk=4+A[0.375] (Mod 12). Kk=4+0 (Mod 12). Kk=4 (Mod 12). Kk=4. Hun=11-A[(0+45/60)/2] (Mod 12). Hun=11-A[0.75/2] (Mod 12). Hun=11-A[0.375] (Mod 12). Hun=11-0 (Mod 12). Hun=11 (Mod 12). Hun=11. Kip=11+A[(0+45/60)/2] (Mod 12). Kip=11+A[0.75/2] (Mod 12). Kip=11+A[0.375] (Mod 12). Kip=11+0 (Mod 12). Kip=11 (Mod 12). Kip=11. Tfu=6+A[(0+45/60)/2] (Mod 12). Tfu=6+A[0.75/2] (Mod 12). Tfu=6+A[0.375] (Mod 12). Tfu=6+0 (Mod 12). Tfu=6 (Mod 12). Tfu=6. Fgo=2+A[(0+45/60)/2] (Mod 12). Fgo=2+A[0.75/2] (Mod 12). Fgo=2+A[0.375] (Mod 12). Fgo=2+0 (Mod 12). Fgo=2 (Mod 12). Fgo=2. If E=3, apply the Houron Formula `Sen=8+3x(E-2)-9xI[E/4]+3xI[E/6] (Mod 12)', Sen=8+3x(3-2)-9xI[3/4]+3xI[3/6] (Mod 12). Sen=8+3x1-9xI[0.75]+3xI[0.5] (Mod 12). Sen=8+3-9x0+3x0 (Mod 12). Sen=11 (Mod 12). Sen=11. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=2014 and E=2, apply the Houron Formula `Muk={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+1, R[(SC+y)/2]=1:-1}] (Mod 12)'. Muk={8+3x(2-2)-9xI[2/4]+3xI[2/6]}&C[R[(0+2014)/2]=0:+1, R[(0+2014)/2]=1:-1] (Mod 12). Muk={8+3x0-9xI[0.5]+3xI[0.33]}&C[R[2014/2]=0:+1, R[2014/2]=1:-1] (Mod 12). Muk={8-9x0+3x0}&C[0=0:+1, 0=1:-1] (Mod 12). Muk=8&C[0=0:+1, 0=1:-1] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+1' after the sign `:' should be operated. Thus, Muk=8+1 (Mod 12). Muk=9 (Mod 12). Muk=9. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=2011 and E=6, apply the Houron Formula `Dai={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+2, R[(SC+y)/2]=1:-2}] (Mod 12)'. Dai={8+3x(6-2)-9xI[6/4]+3xI[6/6]}&C[R[(1+2011)/2]=0:+2, R[(1+2011)/2]=1:-2] (Mod 12). Dai={8+3x4-9xI[1.5]+3xI[1]}&C[R[2012)/2]=0:+2, R[2012/2]=1:-2] (Mod 12). Dai={20-9x1+3x1}&C[0=0:+2, 0=1:-2] (Mod 12). Dai=14&C[0=0:+2, 0=1:-2] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+2' after the sign `:' should be operated. Dai=14+2 (Mod 12). Dai=16 (Mod 12). Dai=16-12. Dai=4. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=1995 and E=4, apply the Houron Formula `Lam={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+3, R[(SC+y)/2]=1:-3}] (Mod 12)'. Lam={8+3x(4-2)-9xI[4/4]+3xI[4/6]}&C[R[(0+1995)/2]=0:+3, R[(0+1995)/2]=1:-3] (Mod 12). Lam={8+3x2-9xI[1]+3xI[0.66]}&C[R[1995/2]=0:+3, R[1995/2]=1:-3] (Mod 12). Lam={14-9x1+3x0}&C[1=0:+3, 1=1:-3] (Mod 12). Lam=5&C[1=0:+3, 1=1:-3] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-3' after the sign `:' should be operated. Lam=5-3 (Mod 12). Lam=2 (Mod 12). Lam=2. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=1997 and E=5, apply the Houron Formula `Won={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+4, R[(SC+y)/2]=1:-4}] (Mod 12)'. Won={8+3x(5-2)-9xI[5/4]+3xI[5/6]}&C[R[(1+1997)/2]=0:+4, R[(1+1997)/2]=1:-4] (Mod 12). Won={8+3x3-9xI[1.25]+3xI[0.833]}&C[R[1998/2]=0:+4, R[1998/2]=1:-4] (Mod 12). Won={17-9x1+3x0}&C[0=0:+4, 0=1:-4] (Mod 12). Won=8&C[0=0:+4, 0=1:-4] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+4' after the sign `:' should be operated. Won=8+4 (Mod 12). Won=12 (Mod 12). Won=12-12. Won=0. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=2017 and E=3, apply the Houron Formula `Suy={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+5, R[(SC+y)/2]=1:-5}] (Mod 12)'. Suy={8+3x(3-2)-9xI[3/4]+3xI[3/6]}&C[R[(0+2017)/2]=0:+5, R[(0+2017)/2]=1:-5] (Mod 12). Suy={8+3x1-9xI[0.75]+3xI[0.5]}&C[R[2017/2]=0:+5, R[2017/2]=1:-5] (Mod 12). Suy={11-9x0+3x0}&C[1=0:+5, 1=1:-5] (Mod 12). Suy=11&C[1=0:+5, 1=1:-5] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-5' after the sign `:' should be operated. Suy=11-5 (Mod 12). Suy=6 (Mod 12). Suy=6. If E=5, apply the Houron Formula `Bam=2+3x(E-2)-9xI[E/4]+3xI[E/6] (Mod 12)'. Bam=2+3x(5-2)-9xI[5/4]+3xI[5/6] (Mod 12). Bam=2+3x3-9xI[1.25]+3xI[0.833] (Mod 12). Bam=2+9-9x1+3x0 (Mod 12). Bam=11-9+0 (Mod 12). Bam=2 (Mod 12). Bam=2. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=2003 and E=2, apply the Houron Formula `Sei={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+7, R[(SC+y)/2]=1:-7}] (Mod 12)'. Sei={8+3x(2-2)-9xI[2/4]+3xI[2/6]}&C[R[(1+2003)/2]=0:+7, R[(1+2003)/2]=1:-7] (Mod 12). Sei={8+3x0-9xI[0.5]+3xI[0.33]}&C[R[2004/2]=0:+7, R[2004/2]=1:-7] (Mod 12). Sei={8-9x0+3x0}&C[0=0:+7, 0=1:-7] (Mod 12). Sei=8&C[0=0:+7, 0=1:-7] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+7' after the sign `:' should be operated. Sei=8+7 (Mod 12). Sei=15 (Mod 12). Sei=15-12. Sei=3. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=2014 and E=6, apply the Houron Formula `Moo={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+8, R[(SC+y)/2]=1:-8}] (Mod 12)'. Moo={8+3x(6-2)-9xI[6/4]+3xI[6/6]}&C[R[(0+2014)/2]=0:+8, R[(0+2014)/2]=1:-8] (Mod 12). Moo={8+3x4-9xI[1.5]+3xI[1]}&C[R[2014/2]=0:+8, R[2014/2]=1:-8] (Mod 12). Moo={20-9x1+3x1}&C[0=0:+8, 0=1:-8] (Mod 12). Moo=14&C[0=0:+8, 0=1:-8] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+8' after the sign `:' should be operated. Moo=14+8 (Mod 12). Moo=22 (Mod 12). Moo=22-12. Moo=10. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=1994 and E=4, apply the Houron Formula `Jut={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+9, R[(SC+y)/2]=1:-9}] (Mod 12)'. Jut={8+3x(4-2)-9xI[4/4]+3xI[4/6]}&C[R[(1+1994)/2]=0:+9, R[(1+1994)/2]=1:-9] (Mod 12). Jut={8+3x2-9xI[1]+3xI[0.666]}&C[R[1995/2]=0:+9, R[1995/2]=1:-9] (Mod 12). Jut={14-9x1+3x0}&C[1=0:+9, 1=1:-9] (Mod 12). Jut=5&C[1=0:+9, 1=1:-9] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-9' after the sign `:' should be operated. Jut=5-9 (Mod 12). Jut=-4 (Mod 12). Jut=12-4. Jut=8. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=1973 and E=5, apply the Houron Formula `Toi={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+10, R[(SC+y)/2]=1:-10}] (Mod 12)'. Toi={8+3x(5-2)-9xI[5/4]+3xI[5/6]}&C[R[(0+1973)/2]=0:+10, R[(0+1973)/2]=1:-10] (Mod 12). Toi={8+3x3-9xI[1.25]+3xI[0.833]}&C[R[1973/2]=0:+10, R[1973/2]=1:-10] (Mod 12). Toi={17-9x1+3x0}&C[1=0:+10, 1=1:-10] (Mod 12). Toi=8&C[1=0:+10, 1=1:-10] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-10' after the sign `:' should be operated. Toi=8-10 (Mod 12). Toi=-2 (Mod 12). Toi=12-2. Toi=10. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=2019 and E=3, apply the Houron Formula `Yeo={8+3x(E-2)-9xI[E/4]+3xI[E/6]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+11, R[(SC+y)/2]=1:-11}] (Mod 12)'. Yeo={8+3x(3-2)-9xI[3/4]+3xI[3/6]}&C[R[(1+2019)/2]=0:+11, R[(1+2019)/2]=1:-11] (Mod 12). Yeo={8+3x1-9xI[0.75]+3xI[0.5]}&C[R[2020/2]=0:+11, R[2020/2]=1:-11] (Mod 12). Yeo={11-9x0+3x0}&C[0=0:+11, 0=1:-11] (Mod 12). Yeo=11&C[0=0:+11, 0=1:-11] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+11' after the sign `:' should be operated. Yeo=11+11 (Mod 12). Yeo=22 (Mod 12). Yeo=22-12. Yeo=10. If m=7 and h=23:39:42, apply the Houron Formula `See=5+m-A[h/2] (Mod 12)', See=5+7-A[(23+39/60+42/360)/2] (Mod 12). See=12-A[(23+0.65+0.117)/2] (Mod 12). See=12-A[(23.767)/2] (Mod 12). See=12-A[11.883] (Mod 12). See=12-12 (Mod 12). See=0 (Mod 12). See=0.
Dayon Formula: Dayon The Dayon Formulae are: Sam=1+m+d+I[h/23] (Mod 12), Bat=1-m-d-I[h/23] (Mod 12), Yan=8+d-A[h/2]+I[h/23] (Mod 12), Kwi=2+d+A[h/2]+I[h/23] (Mod 12), Rlu=1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12), Rye=2+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12), Rto=U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12), Rfu=6+U+I[U/4]+I[U/5]-2xI[U/6]-I[U/8] (Mod 12), Rut=2-U-I[U/4]-I[U/5]+2xI[U/6]+I[U/8] (Mod 12), Rch=4+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12), Rkk=10-U-I[U/3]+2xI[U/5]+I[U/6]-I[U/7]-2xI[U/10] (Mod 12), Rok=11-5xI[U/2]-4xI[U/3]+5xI[U/5]+4xI[U/6]-4xI[U/7]+7xI[U/10] (Mod 12), Ryu=3+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12), Rce=4+U+5xI[U/3]+4xI[U/4]+8xI[U/6]-7xI[U/7]-I[U/8]-3xI[U/9]+I[U/10] (Mod 12), Rym=4+2U-8xI[U/3]+3xI[U/4]-5xI[U/5]+6xI[U/6]+4xI[U/7]-6xI[U/8]-3xI[U/9]-I[U/10] (Mod 12), Rln=3-Z (Mod 12), Rhe=9-Z (Mod 12), Rhm=9+9xR[Z/4] (Mod 12), Ryi=11+Z (Mod 12), Rkm=9xR[Z/4] (Mod 12), Rik=2+9xR[Z/4] (Mod 12), Rwa=4+9xR[Z/4] (Mod 12), Rhu=6+Z (Mod 12), Rst=6+9xR[Z/4] (Mod 12), Rcp=5+9xR[Z/4] (Mod 12), Rsu=5+8Z (Mod 12), Rho=1+Z (Mod 12) and Rmn=11+9xR[Z/4] (Mod 12). There are altogether eighteen `Timeons' which are directly or partially related to lunar day. They are named as `Fate Particle' of `Day' or `Dayon'. Fourteen of them are very significant. They belong to the family of `Chz'. They are named as `Family of Chz' or `Chzons'. The names of other `Dayons' related to lunar day are: 1.`Sam', 2.`Bat', 3.`Yan', 4.`Kwi'. `Sam' means `Elevation' or `Sitting'. `Bat' means `Ride' or `Sitting'. `Yan' means `Grace'. `Kwi' means `Prestigious' or `Nobility'. Other `Dayons' which are relate to `Stem' or `Root' are: 1.`Rlu', 2.`Rye', 3.`Rto', 4.`Rfu', 5.`Rut', 6.`Rch', 7.`Rkk', 8.`Rok', 9.`Ryu', 10.`Rce', 11.`Rym', 12.`Rln', 13.`Rhe', 14.`Rhm', 15.`Ryi', 16.`Rkm', 17.`Rik', 18.`Rwa', 19.`Rhu', 20.`Rst', 21.`Rcp', 22.`Rsu', 23.`Rho', 24.`Rmn'. `Dayons' have fantastic powers. They give different invisible influences on human destiny within a whole day. They are dark matters. In general, `Rlu' means `Power' or `Wealth'. `Rye' means `Injury' or `Destruction'.`Rto' means `Injury' or `Destruction'. `Rfu' means `Outstanding'. `Rut' means `Outstanding'. `Rch' means `Knowledge' or `Education'. `Rkk' means `Oration' or `Music'. `Rok' means `Learning' or `School'. `Ryu' means `Vehicle' or `Transportation'. `Rce' means `Eating' or `Food'. `Rym' means `Lascivious' or `Masturbation'. `Rln' means `Marriage' or `Female'. `Rhe' means `Happiness' or `Pregnancy'. `Rhm' means `Lustful' or `Adultery'. `Ryi' means `Coquetry' or `Sex'. `Rkm' means `Wealth' or `Money'. `Rik' means `Ride' or `Motion'. `Rwa' means `Desolation' or `Devotion'. `Rhu' means `Weakness' or `Empty'. `Rst' means `Calamity' or `Death'. `Rcp' means `Robbery' or `Disaster'. `Rsu' means `Puncture' or `Wounded'. `Rho' means `Consumption' or `Exhaustion'. `Rmn' means `Death' or `Loss'. `Z' is `Root of Day'. `m' is the month of birth of a person after `Joint of Month' in Gregorian calendar. If the time of birth is before `Joint of Month', it is regarded as previous month. Since gravity of the moon can also affect human thinkings and behaviours, `d' is the lunar day of a month, not reckoned in Gregorian calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up it. `R[a/b]' is a remainder function such that it takes the remainder of `a' divided by `b'. `b' is a natural number. `D=(Mod 12)' is a modulated function such that if D>11 then `D' becomes `D-12' and if D<0 then `D' becomes `D+12'. Thus, the value range of `D=(Mod 12)' is from 0 to 11. Assume the time is 11:40:30 p.m. on 26th January of 2015. It is the seventh day of the twelfth month in lunar calendar. The `Year Code' (YC) is (1,6). The `Month Code' (MC) is (4,1). The `Day Code' (DC) is (9,2). The `Hour Code' (HC) is (9,0). Since 11:40:30 p.m. on 26th January of 2015 is after `Joint of January' which is at 0:57 a.m. on 6th January of 2015, m=1 and d=7. h=23+(40/60)+(30/3600) and h=23.67499. Since DC=(9,2), the `Root of Day' is Z=2. Apply `Dayon Formula', Rst=6+9xR[Z/4] (Mod 12). Rst=6+9xR[2/4] (Mod 12). Rst=6+9x2 (Mod 12). Rst=24 (Mod 12). Rst=24-12x2. Rst=0. Sam=1+m+d+I[h/23] (Mod 12). Sam=1+1+7+I[23.67499/23] (Mod 12). Sam=9+I[1.02934] (Mod 12). Sam=9+1 (Mod 12). Sam=10 (Mod 12). Sam=10. Bat=1-m-d-I[h/23] (Mod 12). Bat=1-1-7-I[23.67499/23] (Mod 12). Bat=-7-I[1.02934] (Mod 12). Bat=-7-1 (Mod 12). Bat=-8 (Mod 12). Bat=12-8. Bat=4. Yan=8+d-A[h/2]+I[h/23] (Mod 12). Yan=8+7-A[23.67499/2]+I[23.67499/23] (Mod 12). Yan=15-A[11.83749]+I[1.02934] (Mod 12). Yan=15-12+1 (Mod 12). Yan=4 (Mod 12). Yan=4. Kwi=2+d+A[h/2]+I[h/23] (Mod 12). Kwi=2+7+A[23.67499/2]+I[23.67499/23] (Mod 12). Kwi=9+A[11.83749]+I[1.02934] (Mod 12). Kwi=9+12+1 (Mod 12). Kwi=22 (Mod 12). Kwi=22-12. Kwi=10.
Monthon Formula: MonthonThe Monthon Formula is: `Fu=2+m (Mod 12), Bu=12-m (Mod 12), Yin=7+m (Mod 12), Yiu=11+m (Mod 12), Tma=11-3(m-1) (Mod 12), Kai=6+2xI[m/2] (Mod 12), Yst=6-2m (Mod 12), Yee=3+m (Mod 12) or Yee=3+Z (Mod 12), Tmo=11-6xR[(m-1)/4]-3xI[{R[(m-1)/4]}/2] (Mod 12) or Tmo=10+m-7xI[m/2]+2xI[m/3]+8xI[m/5]-2xI[m/6]+2xI[m/7]+6xI[m/9]+4xI[m/10]+2xI[m/11] (Mod 12), Tyu=2-4(m-1)-I[(m-1)/2]+3xI[(m-1)/3]-9xI[(m-1)/4]-3xI[(m-1)/5]-2xI[(m-1)/6]-2xI[(m-1)/8]+6xI[(m-1)/9]+2xI[(m-1)/10]+8xI[(m-1)/11] (Mod 12) or Tyu=1+m+7xI[m/2]-6xI[m/3]+3xI[m/4]-3xI[m/5]+3xI[m/6]-5xI[m/7]+9xI[m/8]+I[m/9]+2xI[m/10]+3xI[m/11]+8xI[m/12] (Mod 12)'.There are altogether ten `Timeons' which are directly related to month. They are named as `Fate Particle' of `Month' or `Monthon'. The codes of these 10 `Monthons' are: 1.`Fu', 2.`Bu', 3.`Yin', 4.`Yiu', 5.`Tma', 6.`Kai', 7.`Yst', 8.`Yee', 9.`Tmo', 10.`Tyu'. The `Monthons' each has fantastic power and lays invisible stress with different influence on human destiny within a month. In general, `Fu' means `Money' or `Support'. `Bu' means `Money' or `Support'. `Yin' means `Penalty' or `Surgery'. `Yiu' means `Sexual intercourse'. `Tma' means `Flight' or `Movement'. `Kai' means `Release' or `Subsitution'. `Yst' means `Conspiracy' or `Plot'. `Yee' means `Medical treatment' or `Severe sickness'. `Tmo' means `Religion'. `Tyu' means `Sick' or `Disease'. `m' is the month of birth of a person in Gregorian calendar after `Joint of Month'. If the time of birth of a person is before `Joint of Month', it is regarded as previous month. `R[m/n]' is a remainder function such that it takes the remainder of `m' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Monthon=(Mod 12)' is a modulated function such that if Monthon>11 then `Monthon' becomes `Monthon-12' and if Monthon<0 then `Monthon' becomes `Monthon+12'. Thus, the value range of `Monthon=(Mod 12)' is from 0 to 11.If m=9, apply the Monthon Formula `Fu=2+m (Mod 12), Bu=12-m (Mod 12), Yin=7+m (Mod 12), Yiu=11+m (Mod 12), Tma=11-3(m-1) (Mod 12), Kai=6+2xI[m/2] (Mod 12), Yst=6-2m (Mod 12), Yee=3+m (Mod 12), Tmo=11-6xR[(m-1)/4]-3xI[{R[(m-1)/4]}/2] (Mod 12) or Tmo=10+m-7xI[m/2]+2xI[m/3]+8xI[m/5]-2xI[m/6]+2xI[m/7]+6xI[m/9]+4xI[m/10]+2xI[m/11] (Mod 12), Tyu=2-4(m-1)-I[(m-1)/2]+3xI[(m-1)/3]-9xI[(m-1)/4]-3xI[(m-1)/5]-2xI[(m-1)/6]-2xI[(m-1)/8]+6xI[(m-1)/9]+2xI[(m-1)/10]+8xI[(m-1)/11] (Mod 12) or Tyu=1+m+7xI[m/2]-6xI[m/3]+3xI[m/4]-3xI[m/5]+3xI[m/6]-5xI[m/7]+9xI[m/8]+I[m/9]+2xI[m/10]+3xI[m/11]+8xI[m/12] (Mod 12)', Fu=2+9 (Mod 12). Fu=11 (Mod 12). Fu=11. Bu=12-9 (Mod 12). Bu=3 (Mod 12). Bu=3. Yin=7+9 (Mod 12). Yin=16 (Mod 12). Yin=16-12. Yin=4. Yiu=11+9 (Mod 12). Yiu=20 (Mod 12). Yiu=20-12. Yiu=8. Tma=11-3x(9-1) (Mod 12). Tma=11-3x8 (Mod 12). Tma=11-24 (Mod 12). Tma=-13 (Mod 12). Tma=12x2-13. Tma=11. Kai=6+2xI[9/2] (Mod 12). Kai=6+2xI[4.5] (Mod 12). Kai=6+2x4 (Mod 12). Kai=6+8 (Mod 12). Kai=14 (Mod 12). Kai=14-12. Kai=2. Yst=6-2x9 (Mod 12). Yst=6-18 (Mod 12). Yst=-12 (Mod 12). Yst=12-12. Yst=0. Tmo=11-6xR[(9-1)/4]-3xI[{R[(9-1)/4]}/2] (Mod 12). Tmo=11-6xR[8/4]-3xI[{R[8/4]}/2] (Mod 12). Tmo=11-6x0-3xI[0/2] (Mod 12). Tmo=11-3xI[0] (Mod 12). Tmo=11-3x0 (Mod 12). Tmo=11 (Mod 12). Tmo=11. Tyu=2-4(9-1)-I[(9-1)/2]+3xI[(9-1)/3]-9xI[(9-1)/4]-3xI[(9-1)/5]-2xI[(9-1)/6]-2xI[(9-1)/8]+6xI[(9-1)/9]+2xI[(9-1)/10]+8xI[(9-1)/11] (Mod 12). Tyu=2-4x8-I[8/2]+3xI[8/3]-9xI[8/4]-3xI[8/5]-2xI[8/6]-2xI[8/8]+6xI[8/9]+2xI[8/10]+8xI[8/11] (Mod 12). Tyu=2-32-I[4]+3xI[2.666]-9xI[2]-3xI[1.6]-2xI[1.333]-2xI[1]+6xI[0.888]+2xI[0.8]+8xI[0.727] (Mod 12). Tyu=-30-4+3x2-9x2-3x1-2x1-2x1+6x0+2x0+8x0 (Mod 12). Tyu=26+6-18-3-2-2 (Mod 12). Tyu=7 (Mod 12). Tyu=7. Yee=3+9 (Mod 12). Yee=12 (Mod 12). Yee=12-12. Yee=0.
Yearon Formula: YearonThe Yearon Formulae for year in `y' A.D. are: Ff=Chzon/Houron/Monthon &C[U=1:Mo, U=2:Chz, U=3:Ch, U=4:Ke, U=5:Bu, U=6:Le, U=7:Fuo, U=8:Kk, U=9:Fu, U=10:Ym] or Ff=Chzon/Houron/Monthon &C[U=1:Mo, U=2:Chz, U=3:Ch, U=4:Ke, U=5:Bu, U=6:Le, U=7:Fuo, U=8:Kk, U=9:Fu, U=10:Ym]. Fk=Chzon &C[R=R[y/10]: R=0:Mo, R=1:Ta, R=2:Chz, R=3:Ku, R=4:Pr, R=5:Le, R=6:Ke, R=7:Tg, R=8:Ym, R=9:Tm] or Fk=Chzon &C[U=1:Pr, U=2:Le, U=3:Ke, U=4:Tg, U=5:Ym, U=6:Tm, U=7:Mo, U=8:Ta, U=9:Chz, U=10:Ku]. Fl=Chzon &C[R=R[y/10]: R=0:Ta, R=1:Ku, R=2:Le, R=3:Pr, R=4:Lm, R=5:Ke, R=6:Tg, R=7:Ym, R=8:Tm, R=9:Mo] or Fl=Chzon &C[U=1:Lm, U=2:Ke, U=3:Tg, U=4:Ym, U=5:Tm, U=6:Mo, U=7:Ta, U=8:Ku, U=9:Le, U=10:Pr]. Fj=Chzon/Houron &C[R=R[y/10]: R=0:Tg, R=1:Ch, R=2:Mo, R=3:Tm, R=4:Ta, R=5:Ym, R=6:Lm, R=7:Ku, R=8:Ke, R=9:Kk] or Fj=Chzon/Houron &C[U=1:Ta, U=2:Ym, U=3:Lm, U=4:Ku, U=5:Ke, U=6:Kk, U=7:Tg, U=8:Ch, U=9:Mo, U=10:Tm]. Luk=8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). Yeu=9+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). Tor=7+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). Remark: `Yeu' & `Tor' are interchangeable in pairs. If Yeu=9-R[y/10]+5xI[R[y/10]/2]-3xI[R[y/10]/8] (Mod 12 then Tor=7+3xR[y/10]-3xI[R[y/10]/2]-3xI[R[y/10]/8] (Mod 12). Fui=1+R[y/10]+I[{R[y/10]}/3]+I[{R[y/10]}/4]-I[{R[y/10]}/6]+I[{R[y/10]}/7]-3xI[{R[y/10]}/9] (Mod 12). Eut=7-R[y/10]-I[{R[y/10]}/3]-I[{R[y/10]}/4]+I[{R[y/10]}/6]-I[{R[y/10]}/7]+3xI[{R[y/10]}/9] (Mod 12). Gun=11-2xR[y/10]+3xI[{R[y/10]}/2]-2xI[{R[y/10]}/3]-I[{R[y/10]}/5]+2xI[{R[y/10]}/6]-I[{R[y/10]}/7]-2xI[{R[y/10]}/9] (Mod 12). Fuk=6-R[y/10]+2xI[{R[y/10]}/2]+3xI[{R[y/10]}/4]+3xI[{R[y/10]}/6]-4xI[{R[y/10]}/8]-8xI[{R[y/10]}/9] (Mod 12). Ckw=11+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). Kkw=3-R[y/10]-I[{R[y/10]}/2]+3xI[{R[y/10]}/8] (Mod 12). Hok=5-5xR[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). Har=4-R[y/10]+9xI[{R[y/10]}/2]-8xI[{R[y/10]}/3]-I[{R[y/10]}/4]+2xI[{R[y/10]}/5]-3xI[{R[y/10]}/6]+2xI[{R[y/10]}/7]+2xI[{R[y/10]}/8]-2xI[{R[y/10]}/9] (Mod 12). Yim=10-R[y/10]+4xI[{R[y/10]}/2]-3xI[{R[y/10]}/3]-5xI[{R[y/10]}/4]+3xI[{R[y/10]}/5]-8xI[{R[y/10]}/6]+8xI[{R[y/10]}/7]-I[{R[y/10]}/8]+4xI[{R[y/10]}/9] (Mod 12). Chu=2+4xR[y/10]-I[{R[y/10]}/2]-2xI[{R[y/10]}/3]+3xI[{R[y/10]}/4]-3xI[{R[y/10]}/5]+5xI[{R[y/10]}/6]+I[{R[y/10]}/7]-3xI[{R[y/10]}/8]-2xI[{R[y/10]}/9] (Mod 12). Yue=10+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). The general formula is Yue=3+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Jit=7-2xR[y/10]+9xI[{R[y/10]}/4]+3xI[{R[y/10]}/8]-I[{R[y/10]}/9] (Mod 12). Bos=8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). The standard formula is: Lis={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+1, R[(SC+y)/2]=1:-1}] (Mod 12) or Lis=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:9+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Lis=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:7+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Clu={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+2, R[(SC+y)/2]=1:-2}] (Mod 12) or Clu=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:10+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Clu=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:6+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Sho={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+3, R[(SC+y)/2]=1:-3}] (Mod 12) or Sho=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:11+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Sho=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:5+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Ckn={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+4, R[(SC+y)/2]=1:-4}] (Mod 12) or Ckn=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Ckn=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:4+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Csu={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+5, R[(SC+y)/2]=1:-5}] (Mod 12) or Csu=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:1+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Csu=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:3+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). Lim=2+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12). The standard formula is: Hee={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+7, R[(SC+y)/2]=1:-7}] (Mod 12) or Hee=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:3+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Hee=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:1+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Cbm={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+8, R[(SC+y)/2]=1:-8}] (Mod 12) or Cbm=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:4+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Cbm=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Bai={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+9, R[(SC+y)/2]=1:-9}] (Mod 12) or Bai=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:5+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Bai=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:11+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Fbg={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+10, R[(SC+y)/2]=1:-10}] (Mod 12) or Fbg=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:6+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Fbg=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:10+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). The standard formula is: Kfu={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+11, R[(SC+y)/2]=1:-11}] (Mod 12) or Kfu=&C[{SC:m=0, f=1 & R[(SC+y)/2]=0}:7+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12) and Kfu=&C[{SC:m=0, f=1 & R[(SC+y)/2]=1}:9+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]] (Mod 12). Hui=2+y (Mod 12). Huk=10-y (Mod 12). Chi=R[y/12] (Mod 12). Kok=2-R[y/12] (Mod 12). Lun=7-R[y/12] (Mod 12). Hei=1-R[y/12] (Mod 12). Hoo=9+R[y/12] (Mod 12). Ytk=1+R[y/12] (Mod 12). Psu=9-4xR[y/3] (Mod 12). Goo=11-9xI[{R[y/12]}/3] (Mod 12). Gwa=7+3xI[{R[y/12]}/3] (Mod 12). Fei=4+R[y/12]+6xI[{R[y/12]+2}/3] (Mod 12). Yei=7+R[y/12] (Mod 12) or Yei=11+Z (Mod 12). Kwy=2-3xR[y/4] (Mod 12). Lfo=8+9xR[y/4] (Mod 12). Cak=10-7xR[y/12] (Mod 12). Tdo=5+3xR[y/4] (Mod 12). Pik=6+4xR[y/12]+2xI[{R[y/12]}/3]+7xI[{R[y/12]}/4]-3xI[{R[y/12]}/6]+2xI[{R[y/12]}/7]+10xI[{R[y/12]}/9]-2xI[{R[y/12]}/11] (Mod 12). Sui=3+6xR[y/4]-3xI[{R[y/4]}/2] (Mod 12). Yng=2+7xR[y/12]+3xI[{R[y/12]}/2]+9xI[{R[y/12]}/3]-6xI[{R[y/12]}/4] (Mod 12). Hoi=11-R[y/12] (Mod 12). Aat=4-R[y/12] (Mod 12). Nik=10-9xI[{R[y/12]}/3] (Mod 12). Yuk=5-3xR[y/4] (Mod 12). Kam=9xR[y/4] (Mod 12). Can=9+R[(y+2)/6] (Mod 12). Bau=3+R[(y+2)/6] (Mod 12). Chm=9xR[y/4] (Mod 12). Pan=1+9xR[y/4] (Mod 12). Yik=2+9xR[y/4] (Mod 12). Sik=3+9xR[y/4] (Mod 12). Wah=4+9xR[y/4] (Mod 12). Cip=5+9xR[y/4] (Mod 12). Joi=6+9xR[y/4] (Mod 12). Tst=7+9xR[y/4] (Mod 12). Zhi=8+9xR[y/4] (Mod 12). Ham=9+9xR[y/4] (Mod 12). Yut=10+9xR[y/4] (Mod 12). Mon=11+9xR[y/4] (Mod 12). Kim=8+R[y/12] (Mod 12). Zee=8+R[y/12] (Mod 12). Fym=9+R[y/12] (Mod 12). Sog=10+R[y/12] (Mod 12). Sok=11+R[y/12] (Mod 12). Kun=R[y/12] (Mod 12). Sfu=1+R[y/12] (Mod 12). Tho=2+R[y/12] (Mod 12). Ark=3+R[y/12] (Mod 12). Foo=4+R[y/12] (Mod 12). Sit=5+R[y/12] (Mod 12). Diu=6+R[y/12] (Mod 12). Bag=7+R[y/12] (Mod 12). Coi=S+A[h/2] (Mod 12) or Coi=8+m-A[h/2]+R[y/12] (Mod 12). Sau=B+A[h/2] (Mod 12) or Sau=8+m+A[h/2]+R[y/12] (Mod 12). Chn & Chn2: Chn=10-2xI[{56+R[y/60]}/10] (Mod 12) & Chn2=11-2xI[{56+R[y/60]}/10] (Mod 12) or Chn2=Chn+1 (Mod 12).There are altogether eighty-five `Timeons' which are directly related to year. They are named as `Fate Particle' of `Year' or `Yearon'. The codes of these `Yearons' are: 1.`Ff', 2.`Fk', 3.`Fl', 4.`Fj', 5.`Luk', 6.`Yeu', 7.`Tor', 8.`Fui', 9.`Eut', 10.`Gun', 11.`Fuk', 12.`Ckw', 13.`Kkw', 14.`Hok', 15.`Har', 16.`Yim', 17.`Chu', 18.`Yue', 19.`Jit', 20.`Bos', 21.`Lis', 22.`Clu', 23.`Sho', 24.`Ckn', 25.`Csu', 26.`Lim', 27.`Hee', 28.`Cbm', 29.`Bai', 30.`Fbg', 31.`Kfu', 32.`Hui', 33.`Huk', 34.`Chi', 35.`Kok', 36.`Lun', 37.`Hei', 38.`Hoo', 39.`Ytk', 40.`Psu', 41.`Goo', 42.`Gwa', 43.`Fei', 44.`Yei', 45.`Kwy', 46.`Lfo', 47.`Cak', 48.`Tdo', 48.`Pik', 49.`Sui', 50.`Yng', 51.`Hoi', 52.`Aat', 53.`Nik', 54.`Yuk', 55.`Kam', 56.`Can', 57.`Bau', 58.`Chm', 59.`Pan', 60.`Yik', 61.`Sik', 62.`Wah', 63.`Cip', 64.`Joi', 65.`Tst', 66.`Zhi', 67.`Ham', 68.`Yut', 69.`Mon', 70.`Kim', 71.`Zee', 72.`Fym', 73.`Sog', 74.`Sok', 75.`Kun', 76.`Sfu', 77.`Tho', 78.`Ark', 79.`Foo', 80.`Sit', 81.`Diu', 82.`Bag', 83.`Coi', 84.`Sau', 85.`Chn' & `Chn2'. The `Yearons' each has fantastic power and lays invisible stress with different influence on human destiny within a year. In general, `Ff' means `Academy' or `Announcement'. `Fk' means `Authority' or `Ratification'. `Fl' means `Income' or `Money'. `Fj' means `Adversity' or `Apprehension'. `Luk' means `Power' or `Wealth'. `Yeu' means `Injury' or `Destruction'.`Tor' means `Injury' or `Destruction'. `Fui' means `Outstanding'. `Eut' means `Outstanding'. `Gun' means `Promotion' or `Childbirth'. `Fuk' means `Felicity' or `Childbirth'. `Ckw' means `Knowledge' or `Education'. `Kkw' means `Oration' or `Music'. `Hok' means `Learning' or `School'. `Har' means `Aboard' or `Childbirth'. `Yim' means `Lascivious', `Masturbation' or `Blood'. `Chu' means `Eating' or `Food'. `Yue' means `Vehicle' or `Transportation'. `Jit' means `Stop' or `Nil'. `Bos' means `Knoeledge' or `Culture'. `Lis' means `Strength'. `Clu' means `Protection'. `Sho' means `Loss'. `Ckn' means `Rudeness'. `Csu' means `Inform' or `Declare'. `Lim' means `Sickness',`Loneliness' or `Flight'. `Hee' means `Gathering'. `Cbm' means `Sickliness'. `Bai' means `Bankruptcy'. `Fbg' means `Ambush' or `Trap'. `Kfu' means `Court' or `Litigation'. `Hui' means `Sick', `Weakness' or `Empty'. `Huk' means `Cry', `Sorrow' or `Loss'. `Chi' means `Arts'. `Kok' means `Design'. `Lun' means `Female', `Marriage' or `Blood'. `Hei' means `Happiness' or `Pregnancy'. `Hoo' means `Consumption' or `Exhaustion'. `Ytk' means `Rescue'. `Psu' means `Puncture' or `Wounded'. `Goo' means `Loneliness' or `Detention'. `Gwa' means `Helplessness' or `Detention'. `Fei' means `Lonliness', `Plague' or `Flight'. `Yei' means `Medical treatment' or `Doctor'. `Kwy' means `Peerage'. `Lfo' means `Bombard' or `Gunshot'. `Cak' means `Thief' or `Steal'. `Tdo' means `Thief' or `Steal'. `Pik' means `Bang' or `Thunder'. `Sui' means `Flood' or `Fluid'. `Yng' means `Wounded' or `Surgery'. `Hoi' means `Disaster' or `Sickness'. `Aat' means `Collapse' or `Death'. `Nik' means `Water' or `Drown'. `Yuk' means `Detention' or `Imprison'. `Kam' means `Wealth' or `Money'. `Can' means `Parturition', `Reincarnation' or `Tumor'. `Bau' means `Pregnancy', `Childbirth' or `Tumor'. `Chm' means `Bravery'. `Pan' means `Promotion' or `Travel'. `Yik' means `Ride' or `Motion'. `Sik' means `Rest' or `Dead'. `Wah' means `Desolation' or `Devotion'. `Cip' means `Robbery' or `Kidnapping'. `Joi' means `Calamity' or `Disaster'. `Tst' means `Smite male'. `Zhi' means `Accusation'. `Ham' means `Lustful', `Masturbate' or `Adultery'. `Yut' means `Smite female'. `Mon' means `Death' or `Loss'. `Kim' means `War' or `Wound'. `Zee' means `Fall down' or `Dead body'. `Fym' means `Fire' or `Burning'. `Sog' means `Death' or `Mourning'. `Sok' means `Seizing', `Bondage', `Rope' or `Umbilical cord'. `Kun' means `Police' or `Litigation'. `Sfu' means `Death order' or `Sick'. `Tho' means `Loss' or `Destruction'. `Lon' means `Discharge'. `Ark' means `Danger' or `Disaster'. `Foo' means `Sick' or `Murder'. `Sit' means `Talk', `Quarrel', `Eat' or `Lick'. `Diu' means `Condolence' or `Console'. `Bag' means `Influenza' or `Sick'. `Coi' means `Genius'. `Sau' means `Life limit'. `Chn' & `Chn2' mean `Empty', `Loss' or `Extermination'. `U' is the alphabetical order of the stem of year and `Z' is the root of year. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `S' is the zone which marks the position of `Soul'. `B' is the zone which marks the position of `Body'. `y' is the year reckoning in a solar calender. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `R[m/n]' is a remainder function such that it takes the remainder of `m' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up the number. `Yearon=(Mod 12)' is a modulated function such that if Yearon>11 then `Yearon' becomes `Yearon-12' and if Yearon<0 then `Yearon' becomes `Yearon+12'. Thus, the value range of `Yearon=(Mod 12)' is from 0 to 11.If y=2012, S=9 and B=9, then R[y/10]=2 and R[y/12]=8. Apply the `Yearon Formula' for year `y' in A.D., `Ff=Chzon/Houron/Monthon &C[U=1:Mo, U=2:Chz, U=3:Ch, U=4:Ke, U=5:Bu, U=6:Le, U=7:Fuo, U=8:Kk, U=9:Fu, U=10:Ym] or Ff=Chzon/Houron/Monthon &C[U=1:Mo, U=2:Chz, U=3:Ch, U=4:Ke, U=5:Bu, U=6:Le, U=7:Fuo, U=8:Kk, U=9:Fu, U=10:Ym], Fk=Chzon &C[R=R[y/10]: R=0:Mo, R=1:Ta, R=2:Chz, R=3:Ku, R=4:Pr, R=5:Le, R=6:Ke, R=7:Tg, R=8:Ym, R=9:Tm] or Fk=Chzon &C[U=1:Pr, U=2:Le, U=3:Ke, U=4:Tg, U=5:Ym, U=6:Tm, U=7:Mo, U=8:Ta, U=9:Chz, U=10:Ku], Fl=Chzon &C[R=R[y/10]: R=0:Ta, R=1:Ku, R=2:Le, R=3:Pr, R=4:Lm, R=5:Ke, R=6:Tg, R=7:Ym, R=8:Tm, R=9:Mo] or Fl=Chzon &C[U=1:Lm, U=2:Ke, U=3:Tg, U=4:Ym, U=5:Tm, U=6:Mo, U=7:Ta, U=8:Ku, U=9:Le, U=10:Pr], Fj=Chzon/Houron &C[R=R[y/10]: R=0:Tg, R=1:Ch, R=2:Mo, R=3:Tm, R=4:Ta, R=5:Ym, R=6:Lm, R=7:Ku, R=8:Ke, R=9:Kk] or Fj=Chzon/Houron &C[U=1:Ta, U=2:Ym, U=3:Lm, U=4:Ku, U=5:Ke, U=6:Kk, U=7:Tg, U=8:Ch, U=9:Mo, U=10:Tm]'. Ff=Fu. Fk=Chz. Fl=Le. Fj=Mo. Luk=8+2+I[2/2]-3xI[2/8] (Mod 12). Luk=8+2+I[1]-3xI[0.25] (Mod 12). Luk=10+1-3x0 (Mod 12). Luk=11 (Mod 12). Luk=11. Yeu=9+2+I[2/2]-3xI[2/8] (Mod 12). Yeu=11+I[1]-3xI[0.25] (Mod 12). Yeu=11+1-3x0 (Mod 12). Yeu=12 (Mod 12). Yeu=12-12. Yeu=0. Tor=7+2+I[2/2]-3xI[2/8] (Mod 12). Tor=9+I[1]-3xI[0.25] (Mod 12). Tor=9+1-3x0 (Mod 12). Tor=10 (Mod 12). Tor=10. `Yeu' & `Tor' are interchangeable in pairs. If Yeu=9-R[y/10]+5xI[R[y/10]/2]-3xI[R[y/10]/8] (Mod 12) then Tor=7+3xR[y/10]-3xI[R[y/10]/2]-3xI[R[y/10]/8] (Mod 12). Yeu=9-R[2012/10]+5xI[R[2012/10]/2]-3xI[R[2012/10]/8] (Mod 12) & Tor=7+3xR[2012/10]-3xI[R[2012/10]/2]-3xI[R[2012/10]/8] (Mod 12). Yeu=9-2+5xI[2/2]-3xI[2/8] (Mod 12) & Tor=7+3x2-3xI[2/2]-3xI[2/8] (Mod 12). Yeu=7+5xI[1]-3xI[0.25] (Mod 12) & Tor=13-3xI[1]-3xI[0.25] (Mod 12). Yeu=7+5x1-3x0 (Mod 12) & Tor=13-3x1-3x0 (Mod 12). Yeu=12 (Mod 12) & Tor=10 (Mod 12). Yeu=12-12. Yeu=0 & Tor=10. [Remarks: `Yeu' and `Tor' must be interchanged in pairs. The values of `Yeu' and `Tor' for even solar year `y' are same as the original pairs.] Fui=1+R[2012/10]+I[{R[2012/10]}/3]+I[{R[2012/10]}/4]-I[{R[2012/10]}/6]+I[{R[2012/10]}/7]-3xI[{R[2012/10]}/9] (Mod 12). Fui=1+2+I[2/3]+I[2/4]-I[2/6]+I[2/7]-3xI[2/9] (Mod 12). Fui=3+I[0.666]+I[0.5]-I[0.333]+I[0.285]-3xI[0.222] (Mod 12). Fui=3+0+0-0+0-3x0 (Mod 12). Fui=3 (Mod 12). Fui=3. Eut=7-R[2012/10]-I[{R[2012/10]}/3]-I[{R[2012/10]}/4]+I[{R[2012/10]}/6]-I[{R[2012/10]}/7]+3xI[{R[2012/10]}/9] (Mod 12). Eut=7-2-I[2/3]-I[2/4]+I[2/6]-I[2/7]+3xI[2/9] (Mod 12). Eut=5-I[0.666]-I[0.5]+I[0.333]-I[0.285]+3xI[0.222] (Mod 12). Eut=5-0-0+0-0+3x0 (Mod 12). Eut=5 (Mod 12). Eut=5. Gun=11-2x2+3xI[2/2]-2xI[2/3]-I[2/5]+2xI[2/6]-I[2/7]-2xI[2/9] (Mod 12). Gun=11-4+3xI[1]-2xI[0.666]-I[0.4]+2xI[0.333]-I[0.285]-2xI[0.222] (Mod 12). Gun=7+3x1-2x0-0+2x0-0-2x0 (Mod 12). Gun=7+3 (Mod 12). Gun=10 (Mod 12). Gun=10. Fuk=6-2+2xI[2/2]+3xI[2/4]+3xI[2/6]-4xI[2/8]-8xI[2/9] (Mod 12). Fuk=4+2xI[1]+3xI[0.5]+3xI[0.333]-4xI[0.25]-8xI[0.222] (Mod 12). Fuk=4+2x1+3x0+3x0-4x0-8x0 (Mod 12). Fuk=4+2 (Mod 12). Fuk=6 (Mod 12). Fuk=6. Ckw=11+2+I[2/2]-3xI[2/8] (Mod 12). Ckw=13+I[1]-3xI[0.25] (Mod 12). Ckw=13+1-3x0 (Mod 12). Ckw=14 (Mod 12). Ckw=14-12. Ckw=2. Kkw=3-2-I[2/2]+3xI[2/8] (Mod 12). Kkw=1-I[1]+3xI[0.25] (Mod 12). Kkw=1-1+3x0 (Mod 12). Kkw=1-1+3x0 (Mod 12). Kkw=0 (Mod 12). Kkw=0. Hok=5-5x2+I[2/2]-3xI[2/8] (Mod 12). Hok=5-10+I[1]-3xI[0.25] (Mod 12). Hok=-5+1-3x0 (Mod 12). Hok=-4 (Mod 12). Hok=12-4. Hok=8. Har=4-2+9xI[2/2]-8xI[2/3]-I[2/4]+2xI[2/5]-3xI[2/6]+2xI[2/7]+2xI[2/8]-2xI[2/9] (Mod 12). Har=2+9xI[1]-8xI[0.666]-I[0.5]+2xI[0.4]-3xI[0.333]+2xI[0.285]+2xI[0.25]-2xI[0.222] (Mod 12). Har=2+9 (Mod 12). Har=11. Yim=10-2+4xI[2/2]-3xI[2/3]-5xI[2/4]+3xI[2/5]-8xI[2/6]+8xI[2/7]-I[2/8]+4xI[2/9] (Mod 12). Yim=8+4xI[1]-3xI[0.6666]-5xI[0.5]+3xI[0.4]-8xI[0.3333]+8xI[0.2857]-I[0.25]+4xI[0.2222] (Mod 12). Yim=8+4x1-3x0-5x0+3x0-8x0+8x0-0+4x0 (Mod 12). Yim=12 (Mod 12). Yim=12-12. Yim=0. Chu=2+4x2-I[2/2]-2xI[2/3]+3xI[2/4]-3xI[2/5]+5xI[2/6]+I[2/7]-3xI[2/8]-2xI[2/9] (Mod 12). Chu=2+8-I[1]-2xI[0.666]+3xI[0.25]-3xI[0.4]+5xI[0.333]+I[0.285]-3xI[0.25]-2xI[0.222] (Mod 12). Chu=10-1-2x0+3x0-3x0+5x0+0-3x0-2x0 (Mod 12). Chu=9 (Mod 12). Chu=9. Yue=10+2+I[2/2]-3xI[2/8] (Mod 12). Yue=12+I[1]-3xI[0.25] (Mod 12). Yue=12+1-3x0 (Mod 12). Yue=13 (Mod 12). Yue=13-12. Yue=1. Jit=7-2x2+9xI[2/4]+3xI[2/8]-I[2/9] (Mod 12). Jit=7-4+9xI[0.5]+3xI[0.25]-I[0.222] (Mod 12). Jit=3+9x0+3x0-0 (Mod 12). Jit=3 (Mod 12). Jit=3. If y=2012, then R[y/10]=2. Apply the Yearon Formula for year `y' in A.D., `Bos=8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12)'. Bos=8+R[2012/10]+I[{R[2012/10]}/2]-3xI[{R[2012/10]}/8] (Mod 12). Bos=8+2+I[2/2]-3xI[2/8] (Mod 12). Bos=10+I[1]-3xI[0.25] (Mod 12). Bos=10+1-3x0 (Mod 12). Bos=11 (Mod 12). Bos=11. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=2012, apply the formula `Lis={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+1, R[(SC+y)/2]=1:-1}] (Mod 12)'. Lis={8+R[2012/10]+I[{R[2012/10]}/2]-3xI[{R[2012/10]}/8]}&C[R[(0+2012)/2]=0:+1, R[(0+2012)/2]=1:-1] (Mod 12). Lis={8+2+I[2/2]-3xI[2/8]}&C[R[2012/2]=0:+1, R[2012/2]=1:-1] (Mod 12). Lis={10+I[1]-3xI[0.25]}&C[0=0:+1, 0=1:-1] (Mod 12). Lis={10+1-3x0}&C[0=0:+1, 0=1:-1] (Mod 12). Lis=11&C[0=0:+1, 0=1:-1] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+1' after the sign `:' should be operated. Thus, Lis=11+1 (Mod 12). Lis=12 (Mod 12). Lis=12-12. Lis=0. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=1987, apply the formula `Clu={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+2, R[(SC+y)/2]=1:-2}] (Mod 12)'. Clu={8+R[1987/10]+I[{R[1987/10]}/2]-3xI[{R[1987/10]}/8]}&C[R[(0+1987)/2]=0:+2, R[(0+1987)/2]=1:-2] (Mod 12). Clu={8+7+I[7/2]-3xI[7/8]}&C[R[1987/2]=0:+2, R[1987/2]=1:-2] (Mod 12). Clu={15+I[3.5]-3xI[0.875]}&C[1=0:+2, 1=1:-2] (Mod 12). Clu={15+3-3x0}&C[1=0:+2, 1=1:-2] (Mod 12). Clu=18&C[1=0:+2, 1=1:-2] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-2' after the sign `:' should be operated. Thus, Clu=18-2 (Mod 12). Clu=16 (Mod 12). Clu=16-12. Clu=4. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=1959, apply the formula `Sho={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+3, R[(SC+y)/2]=1:-3}] (Mod 12)'. Sho={8+R[1959/10]+I[{R[1959/10]}/2]-3xI[{R[1959/10]}/8]}&C[R[(1+1959)/2]=0:+3, R[(1+1959)/2]=1:-3] (Mod 12). Sho={8+9+I[9/2]-3xI[9/8]}&C[R[1960/2]=0:+3, R[1960/2]=1:-3] (Mod 12). Sho={17+I[4.5]-3xI[1.125]}&C[0=0:+3, 0=1:-3] (Mod 12). Sho={17+4-3x1}&C[0=0:+3, 0=1:-3] (Mod 12). Sho=18&C[0=0:+3, 0=1:-3] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+3' after the sign `:' should be operated. Thus, Sho=18+3 (Mod 12). Sho=21 (Mod 12). Sho=21-12. Sho=9. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=2000, apply the formula `Ckn={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+4, R[(SC+y)/2]=1:-4}] (Mod 12)'. Ckn={8+R[2000/10]+I[{R[2000/10]}/2]-3xI[{R[2000/10]}/8]}&C[R[(1+2000)/2]=0:+4, R[(1+2000)/2]=1:-4] (Mod 12). Ckn={8+0+I[0/2]-3xI[0/8]}&C[R[2001/2]=0:+4, R[2001/2]=1:-4] (Mod 12). Ckn={8+I[0]-3xI[0]}&C[1=0:+4, 1=1:-4] (Mod 12). Ckn={8+0-3x0}&C[1=0:+4, 1=1:-4] (Mod 12). Ckn=8&C[1=0:+4, 1=1:-4] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-4' after the sign `:' should be operated. Thus, Ckn=8-4 (Mod 12). Ckn=4 (Mod 12). Ckn=4. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=2012, apply the formula `Csu={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+5, R[(SC+y)/2]=1:-5}] (Mod 12)'. Csu={8+R[2012/10]+I[{R[2012/10]}/2]-3xI[{R[2012/10]}/8]}&C[R[(0+2012)/2]=0:+5, R[(0+2012)/2]=1:-5] (Mod 12). Csu={8+2+I[2/2]-3xI[2/8]}&C[R[2012/2]=0:+5, R[2012/2]=1:-5] (Mod 12). Csu={10+I[1]-3xI[0.25]}&C[0=0:+5, 0=1:-5] (Mod 12). Csu={10+1-3x0}&C[0=0:+5, 0=1:-5] (Mod 12). Csu=11&C[0=0:+5, 0=1:-5] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+5' after the sign `:' should be operated. Thus, Csu=11+5 (Mod 12). Csu=16 (Mod 12). Csu=16-12. Csu=4. If y=2012, then R[y/10]=2. Apply the Yearon Formula for year `y' in A.D., `Lim=2+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8] (Mod 12)'. Lim=2+R[2012/10]+I[{R[2012/10]}/2]-3xI[{R[2012/10]}/8] (Mod 12). Lim=2+2+I[2/2]-3xI[2/8] (Mod 12). Lim=4+I[1]-3xI[0.25] (Mod 12). Lim=4+1-3x0 (Mod 12). Lim=5 (Mod 12). Lim=5. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=1987, apply the formula `Hee={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+7, R[(SC+y)/2]=1:-7}] (Mod 12)'. Hee={8+R[1987/10]+I[{R[1987/10]}/2]-3xI[{R[1987/10]}/8]}&C[R[(0+1987)/2]=0:+7, R[(0+1987)/2]=1:-7] (Mod 12). Hee={8+7+I[7/2]-3xI[7/8]}&C[R[1987/2]=0:+7, R[1987/2]=1:-7] (Mod 12). Hee={15+I[3.5]-3xI[0.875]}&C[1=0:+7, 1=1:-7] (Mod 12). Hee={15+3-3x0}&C[1=0:+7, 1=1:-7] (Mod 12). Hee=18&C[1=0:+7, 1=1:-7] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-7' after the sign `:' should be operated. Thus, Hee=18-7 (Mod 12). Hee=11 (Mod 12). Hee=11. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=1959, apply the formula `Cbm={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+8, R[(SC+y)/2]=1:-8}] (Mod 12)'. Cbm={8+R[1959/10]+I[{R[1959/10]}/2]-3xI[{R[1959/10]}/8]}&C[R[(1+1959)/2]=0:+8, R[(1+1959)/2]=1:-8] (Mod 12). Cbm={8+9+I[9/2]-3xI[9/8]}&C[R[1960/2]=0:+8, R[1960/2]=1:-8] (Mod 12). Cbm={17+I[4.5]-3xI[1.125]}&C[0=0:+8, 0=1:-8] (Mod 12). Cbm={17+4-3x1}&C[0=0:+8, 0=1:-8] (Mod 12). Cbm=18&C[0=0:+8, 0=1:-8] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+8' after the sign `:' should be operated. Thus, Cbm=18+8 (Mod 12). Cbm=26 (Mod 12). Cbm=26-12x2. Cbm=2. For female, the Sex Code (SC) is `f' and f=1, then SC=1. If y=2000, apply the formula `Bai={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+9, R[(SC+y)/2]=1:-9}] (Mod 12)'. Bai={8+R[2000/10]+I[{R[2000/10]}/2]-3xI[{R[2000/10]}/8]}&C[R[(1+2000)/2]=0:+9, R[(1+2000)/2]=1:-9] (Mod 12). Bai={8+0+I[0/2]-3xI[0/8]}&C[R[2001/2]=0:+9, R[2001/2]=1:-9] (Mod 12). Bai={8+I[0]-3xI[0]}&C[1=0:+9, 1=1:-9] (Mod 12). Bai={8+0-3x0}&C[1=0:+9, 1=1:-9] (Mod 12). Bai=8&C[1=0:+9, 1=1:-9] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-9' after the sign `:' should be operated. Thus, Bai=8-9 (Mod 12). Bai=-1 (Mod 12). Bai=12-1. Bai=11. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=2012, apply the formula `Fbg={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+10, R[(SC+y)/2]=1:-10}] (Mod 12)'. Fbg={8+R[2012/10]+I[{R[2012/10]}/2]-3xI[{R[2012/10]}/8]}&C[R[(0+2012)/2]=0:+10, R[(0+2012)/2]=1:-10] (Mod 12). Fbg={8+2+I[2/2]-3xI[2/8]}&C[R[2012/2]=0:+10, R[2012/2]=1:-10] (Mod 12). Fbg={10+I[1]-3xI[0.25]}&C[0=0:+10, 0=1:-10] (Mod 12). Fbg={10+1-3x0}&C[0=0:+10, 0=1:-10] (Mod 12). Fbg=11&C[0=0:+10, 0=1:-10] (Mod 12). Since the truth value of `&C[0=0]' is true and the truth value of `&C[0=1]' is false, the mathematical expression `+10' after the sign `:' should be operated. Thus, Fbg=11+10 (Mod 12). Fbg=21 (Mod 12). Fbg=21-12. Fbg=9. For male, the Sex Code (SC) is `m' and m=0, then SC=0. If y=1987, apply the formula `Kfu={8+R[y/10]+I[{R[y/10]}/2]-3xI[{R[y/10]}/8]}&C[(SC:m=0, f=1) & {R[(SC+y)/2]=0:+11, R[(SC+y)/2]=1:-11}] (Mod 12)'. Kfu={8+R[1987/10]+I[{R[1987/10]}/2]-3xI[{R[1987/10]}/8]}&C[R[(0+1987)/2]=0:+11, R[(0+1987)/2]=1:-11] (Mod 12). Kfu={8+7+I[7/2]-3xI[7/8]}&C[R[1987/2]=0:+11, R[1987/2]=1:-11] (Mod 12). Kfu={15+I[3.5]-3xI[0.875]}&C[1=0:+11, 1=1:-11] (Mod 12). Kfu={15+3-3x0}&C[1=0:+11, 1=1:-11] (Mod 12). Kfu=18&C[1=0:+11, 1=1:-11] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, the mathematical expression `-11' after the sign `:' should be operated. Thus, Kfu=18-11 (Mod 12). Kfu=7 (Mod 12). Kfu=7. If y=1976, Apply the Yearon Formula for year `y' in A.D., `Hui=2+y (Mod 12)'. Hui=2+1976 (Mod 12). Hui=1978 (Mod 12). Hui=1978-164x12. Hui=10. If y=1976, Apply the Yearon Formula for year `y' in A.D., `Huk=10-y (Mod 12)'. Huk=10-1976 (Mod 12). Huk=-1966 (Mod 12). Huk=164x12-1966. Huk=2. If y=2008, Apply the Yearon Formula for year `y' in A.D., `Chi=R[y/12] (Mod 12)'. Chi=R[2008/12] (Mod 12). Chi=4 (Mod 12). Chi=4. If y=1943, Apply the Yearon Formula for year `y' in A.D., `Kok=2-R[y/12] (Mod 12)'. Kok=2-R[1943/12] (Mod 12). Kok=2-11 (Mod 12). Kok=-9 (Mod 12). Kok=12-9. Kok=3. If y=2031, Apply the Yearon Formula for year `y' in A.D., `Lun=7-R[y/12] (Mod 12)'. Lun=7-R[2031/12] (Mod 12). Lun=7-3 (Mod 12). Lun=4 (Mod 12). Lun=4. If y=2016, Apply the Yearon Formula for year `y' in A.D., `Hei=1-R[y/12] (Mod 12)'. Hei=1-R[2016/12] (Mod 12). Hei=1-0 (Mod 12). Hei=1 (Mod 12). Hei=1. If y=1957, Apply the Yearon Formula for year `y' in A.D., `Hoo=9+R[y/12] (Mod 12)'. Hoo=9+R[1957/12] (Mod 12). Hoo=9+1 (Mod 12). Hoo=10 (Mod 12). Hoo=10. If y=2001, Apply the Yearon Formula for year `y' in A.D., `Ytk=1+R[y/12] (Mod 12)'. Ytk=1+R[2001/12] (Mod 12). Ytk=1+9 (Mod 12). Ytk=10 (Mod 12). Ytk=10. If y=2015, Apply the Yearon Formula for year `y' in A.D., `Psu=9-4xR[y/3] (Mod 12)'. Psu=9-4x2 (Mod 12). Psu=1 (Mod 12). Psu=1. If y=1945, Apply the Yearon Formula for year `y' in A.D., `Goo=11-9xI[{R[y/12]}/3] (Mod 12)'. Goo=11-9xI[{R[1945/12]}/3] (Mod 12). Goo=11-9xI[1/3] (Mod 12). Goo=11-9xI[0.33333] (Mod 12). Goo=11-9x0 (Mod 12). Goo=11 (Mod 12). Goo=11. If y=1937, Apply the Yearon Formula for year `y' in A.D., `Gwa=7+3xI[{R[y/12]}/3] (Mod 12)'. Gwa=7+3xI[{R[1937/12]}/3] (Mod 12). Gwa=7+3xI[5/3] (Mod 12). Gwa=7+3xI[1.66666] (Mod 12). Gwa=7+3x1 (Mod 12). Gwa=10 (Mod 12). Gwa=10. If y=1914, Apply the Yearon Formula for year `y' in A.D., `Fei=4+R[y/12]+6xI[{R[y/12]+2}/3] (Mod 12)'. Fei=4+R[1914/12]+6xI[{R[1914/12]+2}/3] (Mod 12). Fei=4+6+6xI[{6+2}/3] (Mod 12). Fei=10+6xI[8/3] (Mod 12). Fei=10+6xI[2.66666] (Mod 12). Fei=10+6x2 (Mod 12). Fei=22 (Mod 12). Fei=22-12. Fei=10. If y=1946, Apply the Yearon Formula for year `y' in A.D., `Yei=7+R[y/12] (Mod 12)'. Yei=7+R[1946/12] (Mod 12). Yei=7+2 (Mod 12). Yei=9 (Mod 12). Yei=9. If y=2003, Apply the Yearon Formula for year `y' in A.D., `Kwy=2-3xR[y/4] (Mod 12)'. Kwy=2-3xR[2003/4] (Mod 12). Kwy=2-3x3 (Mod 12). Kwy=-7 (Mod 12). Kwy=12-7 (Mod 12). Kwy=5 (Mod 12). Kwy=5. If y=1973, Apply the Yearon Formula for year `y' in A.D., `Lfo=8+9xR[y/4] (Mod 12)'. Lfo=8+9xR[1973/4] (Mod 12). Lfo=8+9x1 (Mod 12). Lfo=17 (Mod 12). Lfo=17-12. Lfo=5. If y=2008, Apply the Yearon Formula for year `y' in A.D., `Cak=10-7xR[y/12] (Mod 12)'. Cak=10-7xR[2008/12] (Mod 12). Cak=10-7x4 (Mod 12). Cak=-18 (Mod 12). Cak=12x2-18 (Mod 12). Cak=6. If y=2008, Apply the Yearon Formula for year `y' in A.D., `Tdo=5+3xR[y/4] (Mod 12)'. Tdo=5+3xR[2008/4] (Mod 12). Tdo=5+3x0 (Mod 12). Tdo=5 (Mod 12). Tdo=5. If y=2034, Apply the Yearon Formula for year `y' in A.D., `Pik=6+4xR[y/12]+2xI[{R[y/12]}/3]+7xI[{R[y/12]}/4]-3xI[{R[y/12]}/6]+2xI[{R[y/12]}/7]+10xI[{R[y/12]}/9]-2xI[{R[y/12]}/11] (Mod 12)'. Pik=6+4xR[2034/12]+2xI[{R[2034/12]}/3]+7xI[{R[2034/12]}/4]-3xI[{R[2034/12]}/6]+2xI[{R[2034/12]}/7]+10xI[{R[2034/12]}/9]-2xI[{R[2034/12]}/11] (Mod 12). Pik=6+4x6+2xI[6/3]+7xI[6/4]-3xI[6/6]+2xI[6/7]+10xI[6/9]-2xI[6/11] (Mod 12). Pik=10x6+2xI[2]+7xI[1.5]-3xI[1]+2xI[0.85714]+10xI[0.66666]-2xI[0.54545] (Mod 12). Pik=60+2x2+7x1-3x1+2x0+10x0-2x0 (Mod 12). Pik=68 (Mod 12). Pik=68-12x5. Pik=8. If y=2004, Apply the Yearon Formula for year `y' in A.D., `Sui=3+6xR[y/4]-3xI[{R[y/4]}/2] (Mod 12)'. Sui=3+6xR[2004/4]-3xI[{R[2004/4]}/2] (Mod 12). Sui=3+6x0-3xI[0/2] (Mod 12). Sui=3-3xI[0] (Mod 12). Sui=3-3x0 (Mod 12). Sui=3 (Mod 12). Sui=3. If y=2054, Apply the Yearon Formula for year `y' in A.D., `Yng=2+7xR[y/12]+3xI[{R[y/12]}/2]+9xI[{R[y/12]}/3]-6xI[{R[y/12]}/4] (Mod 12)'. Yng=2+7xR[2054/12]+3xI[{R[2054/12]}/2]+9xI[{R[2054/12]}/3]-6xI[{R[2054/12]}/4] (Mod 12). Yng=2+7x2+3xI[2/2]+9xI[2/3]-6xI[2/4] (Mod 12). Yng=16+3xI[1]+9xI[0.66666]-6xI[0.5] (Mod 12). Yng=16+3x1+9x0-6x0 (Mod 12). Yng=19 (Mod 12). Yng=19-12. Yng=7. If y=1993, Apply the Yearon Formula for year `y' in A.D., `Hoi=11-R[y/12] (Mod 12)'. Hoi=11-R[1993/12] (Mod 12). Hoi=11-1 (Mod 12). Hoi=10 (Mod 12). Hoi=10. If y=1973, Apply the Yearon Formula for year `y' in A.D., `Aat=4-R[y/12] (Mod 12)'. Aat=4-R[1973/12] (Mod 12). Aat=4-5 (Mod 12). Aat=-1 (Mod 12). Aat=12-1. Aat=11. If y=1976, Apply the Yearon Formula for year `y' in A.D., `Nik=10-9xI[{R[y/12]}/3] (Mod 12)'. Nik=10-9xI[8/3] (Mod 12). Nik=10-9xI[2.66666] (Mod 12). Nik=10-9x2 (Mod 12). Nik=-8 (Mod 12). Nik=12-8. Nik=4. If y=1944, Apply the Yearon Formula for year `y' in A.D., `Yuk=5-3xR[y/4] (Mod 12)'. Yuk=5-3xR[1944/4] (Mod 12). Yuk=5-3x0 (Mod 12). Yuk=5 (Mod 12). Yuk=5. If y=1997, Apply the Yearon Formula for year `y' in A.D., `Kam=9xR[y/4] (Mod 12)'. Kam=9xR[1997/4] (Mod 12). Kam=9x1 (Mod 12). Kam=9 (Mod 12). Kam=9. If y=1987, Apply the Yearon Formula for year `y' in A.D., `Can=9+R[(y+2)/6] (Mod 12)'. Can=9+R[(1987+2)/6] (Mod 12). Can=9+R[1989/6] (Mod 12). Can=9+3 (Mod 12). Can=12 (Mod 12). Can=12-12. Can=0. If y=1990, Apply the Yearon Formula for year `y' in A.D., `Bau=3+R[(y+2)/6] (Mod 12)'. Bau=3+R[(1990+2)/6] (Mod 12). Bau=3+R[1992/6] (Mod 12). Bau=3+0 (Mod 12). Bau=3 (Mod 12). Bau=3. If y=1967, Apply the Yearon Formula for year `y' in A.D., `Chm=9xR[y/4] (Mod 12)'. Chm=9xR[1967/4] (Mod 12). Chm=9x3 (Mod 12). Chm=27 (Mod 12). Chm=27-12x2. Chm=3. If y=1980, Apply the Yearon Formula for year `y' in A.D., `Pan=1+9xR[y/4] (Mod 12)'. Pan=1+9xR[1980/4] (Mod 12). Pan=1+9x0 (Mod 12). Pan=1 (Mod 12). Pan=1. If y=1998, Apply the Yearon Formula for year `y' in A.D., `Yik=2+9xR[y/4] (Mod 12)'. Yik=2+9xR[1998/4] (Mod 12). Yik=2+9x2 (Mod 12). Yik=20 (Mod 12). Yik=20-12. Yik=8. If y=1969, Apply the Yearon Formula for year `y' in A.D., `Sik=3+9xR[y/4] (Mod 12)'. Sik=3+9xR[1969/4] (Mod 12). Sik=3+9x1 (Mod 12). Sik=12 (Mod 12). Sik=12-12. Sik=0. If y=1979, Apply the Yearon Formula for year `y' in A.D., `Wah=4+9xR[y/4] (Mod 12)'. Wah=4+9xR[1979/4] (Mod 12). Wah=4+9x3 (Mod 12). Wah=31 (Mod 12). Wah=31-12x2. Wah=7. If y=1974, Apply the Yearon Formula for year `y' in A.D., `Cip=5+9xR[y/4] (Mod 12)'. Cip=5+9xR[1974/4] (Mod 12). Cip=5+9x2 (Mod 12). Cip=23 (Mod 12). Cip=23-12. Cip=11. If y=1976, Apply the Yearon Formula for year `y' in A.D., `Joi=6+9xR[y/4] (Mod 12)'. Joi=6+9xR[1976/4] (Mod 12). Joi=6+9x0 (Mod 12). Joi=6 (Mod 12). Joi=6. If y=1919, Apply the Yearon Formula for year `y' in A.D., `Tst=7+9xR[y/4] (Mod 12)'. Tst=7+9xR[1919/4] (Mod 12). Tst=7+9x3 (Mod 12). Tst=34 (Mod 12). Tst=34-12x2. Tst=10. If y=2003, Apply the Yearon Formula for year `y' in A.D., `Zhi=8+9xR[y/4] (Mod 12)'. Zhi=8+9xR[2003/4] (Mod 12). Zhi=8+9x3 (Mod 12). Zhi=35 (Mod 12). Zhi=35-12x2. Zhi=11. If y=1980, Apply the Yearon Formula for year `y' in A.D., `Ham=9+9xR[y/4] (Mod 12)'. Ham=9+9xR[1980/4] (Mod 12). Ham=9+9x0 (Mod 12). Ham=9 (Mod 12). Ham=9. If y=1972, Apply the Yearon Formula for year `y' in A.D., `Yut=10+9xR[y/4] (Mod 12)'. Yut=10+9xR[1972/4] (Mod 12). Yut=10+9x0 (Mod 12). Yut=10 (Mod 12). Yut=10. If y=1969, Apply the Yearon Formula for year `y' in A.D., `Mon=11+9xR[y/4] (Mod 12)'. Mon=11+9xR[1969/4] (Mod 12). Mon=11+9x1 (Mod 12). Mon=20 (Mod 12). Mon=20-12. Mon=8. If y=1976, Apply the Yearon Formula for year `y' in A.D., `Kim=8+R[y/12] (Mod 12)'. Kim=8+R[1976/12] (Mod 12). Kim=8+8 (Mod 12). Kim=16 (Mod 12). Kim=16-12. Kim=4. If y=1976, Apply the Yearon Formula for year `y' in A.D., `Zee=8+R[y/12] (Mod 12)'. Zee=8+R[1976/12] (Mod 12). Zee=8+8 (Mod 12). Zee=16 (Mod 12). Zee=16-12. Zee=4. If y=1919, Apply the Yearon Formula for year `y' in A.D., `Fym=9+R[y/12] (Mod 12)'. Fym=9+R[1919/12] (Mod 12). Fym=9+11 (Mod 12). Fym=20 (Mod 12). Fym=20-12. Fym=8. If y=1941, Apply the Yearon Formula for year `y' in A.D., `Sog=10+R[y/12] (Mod 12)'. Sog=10+R[1941/12] (Mod 12). Sog=10+9 (Mod 12). Sog=19 (Mod 12). Sog=19-12. Sog=7. If y=2006, Apply the Yearon Formula for year `y' in A.D., `Sok=11+R[y/12] (Mod 12)'. Sok=11+R[2006/12] (Mod 12). Sok=11+2 (Mod 12). Sok=13 (Mod 12). Sok=13-12. Sok=1. If y=2000, Apply the Yearon Formula for year `y' in A.D., `Kun=R[y/12] (Mod 12)'. Kun=R[2000/12] (Mod 12). Kun=8 (Mod 12). Kun=8. If y=2014, Apply the Yearon Formula for year `y' in A.D., `Sfu=1+R[y/12] (Mod 12)'. Sfu=1+R[2014/12] (Mod 12). Sfu=1+10 (Mod 12). Sfu=11 (Mod 12). Sfu=11. If y=1952, Apply the Yearon Formula for year `y' in A.D., `Tho=2+R[y/12] (Mod 12)'. Tho=2+R[1952/12] (Mod 12). Tho=2+8 (Mod 12). Tho=10 (Mod 12). Tho=10. If y=1948, Apply the Yearon Formula for year `y' in A.D., `Lon=3+R[y/12] (Mod 12)'. Lon=3+R[1948/12] (Mod 12). Lon=3+4 (Mod 12). Lon=7 (Mod 12). Lon=7. If y=1956, Apply the Yearon Formula for year `y' in A.D., `Ark=3+R[y/12] (Mod 12)'. Ark=3+R[1956/12] (Mod 12). Ark=3+0 (Mod 12). Ark=3 (Mod 12). Ark=3. If y=1978, Apply the Yearon Formula for year `y' in A.D., `Foo=4+R[y/12] (Mod 12)'. Foo=4+R[1978/12] (Mod 12). Foo=4+10 (Mod 12). Foo=14 (Mod 12). Foo=14-12. Foo=2. If y=1988, Apply the Yearon Formula for year `y' in A.D., `Sit=5+R[y/12] (Mod 12)'. Sit=5+R[1988/12] (Mod 12). Sit=5+8 (Mod 12). Sit=13 (Mod 12). Sit=13-12. Sit=1. If y=1982, Apply the Yearon Formula for year `y' in A.D., `Diu=6+R[y/12] (Mod 12)'. Diu=6+R[1982/12] (Mod 12). Diu=6+2 (Mod 12). Diu=8 (Mod 12). Diu=8. If y=1985, Apply the Yearon Formula for year `y' in A.D., `Bag=7+R[y/12] (Mod 12)'. Bag=7+R[1985/12] (Mod 12). Bag=7+5 (Mod 12). Bag=12 (Mod 12). Bag=12-12. Bag=0. Assume a person was born at 6a.m. on 29th May,1917. y=1917 and R[y/12]=9. m=5 and h=6. Apply the Yearon Formula for year `y' in A.D., `Coi=8+m-A[h/2]+R[y/12] (Mod 12)'. Coi=8+5-A[6/2]+R[1917/12] (Mod 12). Coi=13-A[3]+9 (Mod 12). Coi=13-3+9 (Mod 12). Coi=19 (Mod 12). Coi=19-12. Coi=7. If y=1976 and S=9, then R[y/12]=8. Apply the Yearon Formula for year `y' in A.D., `Coi=S+8+R[y/12] (Mod 12)'. Coi=9+8+R[1976/12] (Mod 12). Coi=17+8 (Mod 12). Coi=25 (Mod 12). Coi=25-12x2. Coi=1. Assume a person was born at 6a.m. on 29th May,1917. y=1917 and R[y/12]=9. m=5 and h=6. Apply the Yearon Formula for year `y' in A.D., `Sau=8+m+A[h/2]+R[y/12] (Mod 12)'. Sau=8+5+A[6/2]+R[1917/12] (Mod 12). Sau=13+A[3]+9 (Mod 12). Sau=13+3+9 (Mod 12). Sau=25 (Mod 12). Sau=25-12x2. Sau=1. If y=1976 and B=1, then R[y/12]=8. Apply the Yearon Formula for year `y' in A.D., `Sau=B+8+R[y/12] (Mod 12)'. Sau=1+8+R[1976/12] (Mod 12). Sau=9+8 (Mod 12). Sau=17 (Mod 12). Sau=17-12. Sau=5. If y=2012, then R[y/60]=32. Apply the Yearon Formula for year `y' in A.D., `Chn & Chn2: Chn=10-2xI[{56+R[y/60]}/10] (Mod 12) & Chn2=11-2xI[{56+R[y/60]}/10] (Mod 12) or Chn2=Chn+1 (Mod 12)'. Chn=10-2xI[{56+R[2012/60]}/10] (Mod 12). Chn=10-2xI[{56+32}/10] (Mod 12). Chn=10-2xI[88/10] (Mod 12). Chn=10-2xI[8.8] (Mod 12). Chn=10-2x8 (Mod 12). Chn=10-16 (Mod 12). Chn=-6 (Mod 12). Chn=12-6. Chn=6. Chn2=11-2xI[{56+R[2012/60]}/10] (Mod 12). Chn2=11-2xI[{56+32}/10] (Mod 12). Chn2=11-2xI[88/10] (Mod 12). Chn2=11-2xI[8.8] (Mod 12). Chn2=11-2x8 (Mod 12). Chn2=11-16 (Mod 12). Chn2=-5 (Mod 12). Chn2=12-5. Chn2=7. Or, calculate `Chn2' from `Chn'. Since Chn=6 and `Chn2=Chn+1 (Mod 12)', Chn2=6+1 (Mod 12). Chn2=7 (Mod 12). Chn2=7. Hence, Chn=6 and Chn2=7.
Timeon General Formula: TimeonTimeon General Formulae are: Luk=1+U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). Yeu=2+U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). Tor=U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). Remark: `Yeu' & `Tor' are interchangeable in pairs. If Yeu=2+R[U/2]+3xI[U/3]-3xI[U/6]+3xI[U/7] (Mod 12) then Tor=U+2xI[U/2]-I[U/3]-4xI[U/5]+I[U/6]-I[U/7]-8xI[U/10] (Mod 12). Fui=6+U+I[U/4]+I[U/5]-2xI[U/6]-I[U/7] (Mod 12). Eut=2-U-I[U/4]-I[U/5]+2xI[U/6]+I[U/7] (Mod 12). Gun=6+U-4xI[U/2]+9x[U/6]+I[U/7]+I[U/8]-I[U/10] (Mod 12). Fuk=10-U+5xI[U/3]-7xI[U/5]-5xI[U/6]+5xI[U/7]-3xI[U/9]+7xI[U/10] (Mod 12). Ckw=4+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Kkw=10-U-I[U/3]+2xI[U/5]+I[U/6]-I[U/7]-2xI[U/10] (Mod 12). Hok=11-5xI[U/2]-4xI[U/3]+5xI[U/5]+4xI[U/6]-4xI[U/7]+7xI[U/10] (Mod 12). Har=2+7U-6xI[U/2]-10xI[U/3]+2xI[U/5]-2xI[U/6]+3xI[U/7]-2xI[U/8]-I[U/9] (Mod 12). Yim=4+2U-8xI[U/3]+3xI[U/4]-5xI[U/5]+6xI[U/6]+4xI[U/7]-6xI[U/8]-3xI[U/9]-I[U/10] (Mod 12). Chu=4+U+5xI[U/3]+4xI[U/4]+8xI[U/6]-7xI[U/7]-I[U/8]-3xI[U/9]+I[U/10] (Mod 12). Yue=3+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Jit=10-2U-I[U/6] (Mod 12). Bos=1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12) or Bos=Luk. Lis=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-1, R[(SC+U)/2]=1:+1}]+Bos (Mod 12) or Lis={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-1, R[(SC+U)/2]=1:+1}] (Mod 12). Clu=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-2, R[(SC+U)/2]=1:+2}]+Bos (Mod 12) or Clu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-2, R[(SC+U)/2]=1:+2}] (Mod 12). Sho=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-3, R[(SC+U)/2]=1:+3}]+Bos (Mod 12) or Sho={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-3, R[(SC+U)/2]=1:+3}] (Mod 12). Ckn=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-4, R[(SC+U)/2]=1:+4}]+Bos (Mod 12) or Ckn={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-4, R[(SC+U)/2]=1:+4}] (Mod 12). Csu=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-5, R[(SC+U)/2]=1:+5}]+Bos (Mod 12) or Csu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-5, R[(SC+U)/2]=1:+5}] (Mod 12). Lim=7+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12) or Lim=6+Luk (Mod 12) or Lim=6+Bos (Mod 12). Hee=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-7, R[(SC+U)/2]=1:+7}]+Bos (Mod 12) or Hee={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-7, R[(SC+U)/2]=1:+7}] (Mod 12). Cbm=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-8, R[(SC+U)/2]=1:+8}]+Bos (Mod 12) or Cbm={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-8, R[(SC+U)/2]=1:+8}] (Mod 12). Bai=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-9, R[(SC+U)/2]=1:+9}]+Bos (Mod 12) or Bai={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-9, R[(SC+U)/2]=1:+9}] (Mod 12). Fbg=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-10, R[(SC+U)/2]=1:+10}]+Bos (Mod 12) or Fbg={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-10, R[(SC+U)/2]=1:+10}] (Mod 12). Kfu=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-11, R[(SC+U)/2]=1:+11}]+Bos (Mod 12) or Kfu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-11, R[(SC+U)/2]=1:+11}] (Mod 12). Hui=6+Z (Mod 12). Huk=6-Z (Mod 12). Chi=Z-8 (Mod 12). Kok=10-Z (Mod 12). Lun=3-Z (Mod 12). Hei=9-Z (Mod 12). Hoo=1+Z (Mod 12). Ytk=5+Z (Mod 12). Psu=5+8Z (Mod 12). Goo=2+3xI[(Z+1)/3] (Mod 12). Gwa=10+3xI[(Z+1)/3] (Mod 12). Fei=8+Z-6xI[Z/3] (Mod 12). Yei=11+Z (Mod 12). Kwy=2-3xR[Z/4] (Mod 12). Lfo=8-3xR[Z/4] (Mod 12). Cak=6-7Z+9xI[Z/4]-9xI[Z/5]+3xI[Z/8]-3xI[Z/10] (Mod 12). Tdo=5+3xR[Z/4] (Mod 12). Pik=7+4Z-I[Z/2]+2xI[Z/3]-4xI[Z/4]-I[Z/6]-2xI[Z/7]+2xI[Z/8]+10xI[Z/9]+I[Z/10]+2xI[Z/11] (Mod 12). Sui=3+6Z+9xI[Z/2]-6xI[Z/4] (Mod 12). Yng=3-5Z+9xI[Z/4]-3xI[Z/5]+3xI[Z/6]-3xI[Z/8]+6xI[Z/10]+9xI[Z/11] (Mod 12). Hoi=7-Z (Mod 12). Aat=12-Z (Mod 12). Nik=1+3xI[{Z+1 (Mod 12)}/3] (Mod 12). Yuk=5+9xR[Z/4] (Mod 12). Kam=9xR[Z/4] (Mod 12). Can=9+R[Z/6] (Mod 12). Bau=3+R[Z/6] (Mod 12). Chm=9xR[Z/4] (Mod 12). Pan=1+9xR[Z/4] (Mod 12). Yik=2+9xR[Z/4] (Mod 12). Sik=3+9xR[Z/4] (Mod 12). Wah=4+9xR[Z/4] (Mod 12). Cip=5+9xR[Z/4] (Mod 12). Joi=6+9xR[Z/4] (Mod 12). Tst=7+9xR[Z/4] (Mod 12). Zhi=8+9xR[Z/4] (Mod 12). Ham=9+9xR[Z/4] (Mod 12). Yut=10+9xR[Z/4] (Mod 12). Mon=11+9xR[Z/4] (Mod 12). Kim=Z. Zee=Z. Fym=1+Z (Mod 12). Sog=2+Z (Mod 12). Sok=3+Z (Mod 12). Kun=4+Z (Mod 12). Sfu=5+Z (Mod 12). Tho=6+Z (Mod 12). Lon=7+Z (Mod 12). Ark=7+Z (Mod 12). Foo=8+Z (Mod 12). Sit=9+Z (Mod 12). Diu=10+Z (Mod 12). Bag=11+Z (Mod 12). Fu=2+Z (Mod 12). Bu=12-Z (Mod 12). Yin=7+Z (Mod 12). Yiu=11+Z (Mod 12). Tma=2+9xR[Z/4] (Mod 12). Kai=6+2xI[Z/2] (Mod 12). Yst=6-2Z (Mod 12). Tmo=2+9Z-3xI[Z/2]-6xI[Z/3]-6xI[Z/6]+6xI[Z/7]+6xI[Z/9]+6xI[Z/11] (Mod 12). Tyu=10-8Z+4xI[Z/2]-9xI[Z/3]+3xI[Z/4]+6xI[Z/5]+6xI[Z/6]-8xI[Z/7]+9xI[Z/8]+I[Z/9]-7xI[Z/10] (Mod 12). Ch=10-Z (Mod 12). Kk=4+Z (Mod 12). Hun=11-Z (Mod 12). Kip=11+Z (Mod 12). Tfu=6+Z (Mod 12). Fgo=2+Z (Mod 12). Chn=10-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or Chn=10-2xI[(N-1)/10] (Mod 12) and N=5x{11-[(Z-U) (Mod 12)]}+U. `N' is the `Sequence Code of Time Co-ordinates' (Numerology). Chn2=11-2xI[{U+5[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or Chn2=Chn+1 (Mod 12). Im=2+R[Z/4]-3xI[Z/2]+7xI[Z/3]-I[Z/4]-7xI[Z/6]+7xI[Z/7]-7xI[Z/9]+7xI[Z/11]+A[h/2] (Mod 12). `Z' is the root of year after `Joint of Year'. `Joint of Year' is same as `Joint of February' in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. `h' is the time reckoning on a 24-hour base. The unit is hour. Li=10+R[Z/4]+3xI[Z/2]-6xI[Z/3]-I[Z/5]-5xI[Z/6]+6xI[Z/7]+5xI[Z/9]+2xI[Z/10]+6xI[Z/11]+A[h/2] (Mod 12). `Z' is the root of year after `Joint of Year'. `Joint of Year' is same as `Joint of February' in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. `h' is the time reckoning on a 24-hour base. The unit is hour. Rlu=1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12). Rye=2+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12). Rto=U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12). Rfu=6+U+I[U/4]+I[U/5]-2xI[U/6]-I[U/8] (Mod 12). Rut=2-U-I[U/4]-I[U/5]+2xI[U/6]+I[U/8] (Mod 12). Rch=4+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Rkk=10-U-I[U/3]+2xI[U/5]+I[U/6]-I[U/7]-2xI[U/10] (Mod 12). Rok=11-5xI[U/2]-4xI[U/3]+5xI[U/5]+4xI[U/6]-4xI[U/7]+7xI[U/10] (Mod 12). Ryu=3+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Rce=4+U+5xI[U/3]+4xI[U/4]+8xI[U/6]-7xI[U/7]-I[U/8]-3xI[U/9]+I[U/10] (Mod 12). Rym=4+2U-8xI[U/3]+3xI[U/4]-5xI[U/5]+6xI[U/6]+4xI[U/7]-6xI[U/8]-3xI[U/9]-I[U/10] (Mod 12). Rln=3-Z (Mod 12). Rhe=9-Z (Mod 12). Rhm=9+9xR[Z/4] (Mod 12). Ryi=11+Z (Mod 12). Rkm=9xR[Z/4] (Mod 12). Rik=2+9xR[Z/4] (Mod 12). Rwa=4+9xR[Z/4] (Mod 12). Rhu=6+Z (Mod 12). Rst=6+9xR[Z/4] (Mod 12). Rcp=5+9xR[Z/4] (Mod 12). Rsu=5+8Z (Mod 12). Rho=1+Z (Mod 12). Rmn=11+9xR[Z/4] (Mod 12). Sam=1+m+d+I[h/23] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. Bat=1-m-d-I[h/23] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. Yan=8+d-A[h/2]+I[h/23] (Mod 12). `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. Kwi=2+d+A[h/2]+I[h/23] (Mod 12). `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. See=5+m-A[h/2] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. Seu=7+m-A[h/2] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. Coi=m-A[h/2]+Z (Mod 12). `Z' is the root of year after `Joint of Year'. `Joint of Year' is same as `Joint of February' in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. Sau=m+A[h/2]+Z (Mod 12). `Z' is the root of year after `Joint of Year'. `Joint of Year' is same as `Joint of February' in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. By observation, some timeons were proved also have influences on different time intervals. Their formulae can be generalized to apply in differnt time intervals like millennium, century, decade, year, month, day, 2 hours, 10 minutes, 50 seconds and 4.17 seconds. These timeons are: 1.`Luk', 2.`Yeu', 3.`Tor', 4.`Fui', 5.`Eut', 6.`Gun', 7.`Fuk', 8.`Ckw', 9.`Kkw', 10.`Hok', 11.`Har', 12.`Yim', 13.`Chu', 14.`Yue', 15.`Jit', 16.`Bos', 17.`Lis', 18.`Clu', 19.`Sho', 20.`Ckn', 21.`Csu', 22.`Lim', 23.`Hee', 24.`Cbm', 25.`Bai', 26.`Fbg', 27.`Kfu', 28.`Hui', 29.`Huk', 30.`Chi', 31.`Kok', 32.`Lun', 33.`Hei', 34.`Hoo', 35.`Ytk', 36.`Psu', 37.`Goo', 38.`Gwa', 39.`Fei', 40.`Yei', 41.`Kwy', 42.`Lfo', 43.`Cak', 44.`Tdo', 45.`Pik', 46.`Sui', 47.`Yng', 48.`Hoi', 49.`Aat', 50.`Nik', 51.`Yuk', 52.`Kam', 53.`Can', 54.`Bau', 55.`Chm', 56.`Pan', 57.`Yik', 58.`Sik', 59.`Wah', 60.`Cip', 61.`Joi', 62.`Tst', 63.`Zhi', 64.`Ham', 65.`Yut', 66.`Mon', 67.`Kim', 68.`Zee', 69.`Fym', 70.`Sog', 71.`Sok', 72.`Kun', 73.`Sfu', 74.`Tho', 75.`Ark', 76.`Foo', 77.`Sit', 78.`Diu', 79.`Bag', 80.`Fu', 81.`Bu', 82.`Yin', 83.`Yiu', 84.`Tma', 85.`Kai', 86.`Yst', 87.`Tmo', 88.`Tyu', 89.`Ch', 90.`Kk', 91.`Hun', 92.`Kip', 93.`Tfu', 94.`Fgo', 95.`Chn' & `Chn2', 96.`Im', 97.`Li', 98.`Rlu', 99.`Rye', 100.`Rto', 101.`Rfu', 102.`Rut', 103.`Rch', 104.`Rkk', 105.`Rok', 106.`Ryu', 107.`Rce', 108.`Rym', 109.`Rln', 110.`Rhe', 111.`Rhm', 112.`Ryi', 113.`Rkm', 114.`Rik', 115.`Rwa', 116.`Rhu', 117.`Rst', 118.`Rcp', 119.`Rsu', 120.`Rho', 121.`Rmn', 122.`Sam', 123.`Bat', 124.`Yan', 125.`Kwi', 126.`See', 127.`Seu', 128.`Coi', 129.`Sau'. In general, `Luk' means `Power' or `Wealth'. `Yeu' means `Injury' or `Destruction'.`Tor' means `Injury' or `Destruction'. `Fui' means `Outstanding'. `Eut' means `Outstanding'. `Gun' means `Promotion' or `Childbirth'. `Fuk' means `Felicity' or `Childbirth'. `Ckw' means `Knowledge' or `Education'. `Kkw' means `Oration' or `Music'. `Hok' means `Learning' or `School'. `Har' means `Aboard' or `Childbirth'. `Yim' means `Lascivious', `Masturbation' or `Blood'. `Chu' means `Eating' or `Food'. `Yue' means `Vehicle' or `Transportation'. `Jit' means `Stop' or `Nil'. `Bos' means `Knoeledge' or `Culture'. `Lis' means `Strength'. `Clu' means `Protection'. `Sho' means `Loss'. `Ckn' means `Rudeness'. `Csu' means `Inform' or `Declare'. `Lim' means `Sickness',`Loneliness' or `Flight'. `Hee' means `Gathering'. `Cbm' means `Sickliness'. `Bai' means `Bankruptcy'. `Fbg' means `Ambush' or `Trap'. `Kfu' means `Court' or `Litigation'. `Hui' means `Weakness' or `Empty'. `Huk' means `Sorrow' or `Loss'. `Chi' means `Arts'. `Kok' means `Design'. `Lun' means `Female', `Marriage' or `Blood'. `Hei' means `Happiness' or `Pregnancy'. `Hoo' means `Consumption' or `Exhaustion'. `Ytk' means `Rescue'. `Psu' means `Puncture' or `Wounded'. `Goo' means `Loneliness' or `Detention'. `Gwa' means `Helplessness' or `Detention'. `Fei' means `Lonliness', `Plague' or `Flight'. `Yei' means `Doctor' or `Severe sickness'. `Kwy' means `Peerage'. `Lfo' means `Bombard' or `Gunshot'. `Cak' means `Thief' or `Steal'. `Tdo' means `Thief' or `Steal'. `Pik' means `Bang' or `Thunder'. `Sui' means `Flood' or `FPikd'. `Yng' means `Wounded' or `Surgery'. `Hoi' means `Disaster' or `Sickness'. `Aat' means `Collapse' or `Death'. `Nik' means `Water' or `Drown'. `Yuk' means `Detention' or `Imprison'. `Kam' means `Wealth' or `Money'. `Can' means `Parturition', `Reincarnation' or `Tumor'. `Bau' means `Pregnancy', `Childbirth' or `Tumor'. `Chm' means `Bravery'. `Pan' means `Promotion' or `Travel'. `Yik' means `Ride' or `Motion'. `Sik' means `Rest' or `Dead'. `Wah' means `Desolation' or `Devotion'. `Cip' means `Robbery' or `Kidnapping'. `Joi' means `Calamity' or `Disaster'. `Tst' means `Smite male'. `Zhi' means `Accusation'. `Ham' means `Lustful', `Masturbate' or `Adultery'. `Yut' means `Smite female'. `Mon' means `Death' or `Loss'. `Kim' means `War' or `Wound'. `Zee' means `Fall down' or `Dead body'. `Fym' means `Fire' or `Burning'. `Sog' means `Death' or `Mourning'. `Sok' means `Seizing', `Bondage', `Rope' or `Umbilical cord'. `Kun' means `Police' or `Litigation'. `Sfu' means `Death order' or `Sick'. `Tho' means `Loss' or `Destruction'. `Ark' means `Danger' or `Disaster'. `Foo' means `Sick' or `Murder'. `Sit' means `Talk', `Quarrel', `Eat' or `Lick'. `Diu' means `Condolence' or `Console'. `Bag' means `Influenza' or `Sick'. `Fu' means `Money' or `Support'. `Bu' means `Money' or `Support'. `Yin' means `Penalty' or `Surgery'. `Yiu' means `Coquetry' or `Sex'. `Tma' means `Flight' or `Movement'. `Kai' means `Release' or `Subsitution'. `Yst' means `Conspiracy' or `Plot'. `Tmo' means `Religion'. `Tyu' means `Sick' or `Disease'. `Ch' means `Literacy'. `Kk' means `Speech'. `Hun' means `Loss',`Nil' or `Flight'. `Kip' means `Robbery' or `Disaster'. `Tfu' means `Success' or `Award'. `Fgo' means `Entitlement', `Mandate' or `Achieve'. `Chn' & `Chn2' mean `Empty', `Loss' or `Extermination'. `Im' means `Vicious' or `Kill'. `Li' means `Malevolent' or `Kill'. `Rlu' means `Power' or `Wealth'. `Rye' means `Injury' or `Destruction'.`Rto' means `Injury' or `Destruction'. `Rfu' means `Outstanding'. `Rut' means `Outstanding'. `Rch' means `Knowledge' or `Education'. `Rkk' means `Oration' or `Music'. `Rok' means `Learning' or `School'. `Ryu' means `Vehicle' or `Transportation'. `Rce' means `Eating' or `Food'. `Rym' means `Lascivious' or `Masturbation'. `Rln' means `Marriage' or `Female'. `Rhe' means `Happiness' or `Pregnancy'. `Rhm' means `Lustful' or `Adultery'. `Ryi' means `Coquetry' or `Sex'. `Rkm' means `Wealth' or `Money'. `Rik' means `Ride' or `Motion'. `Rwa' means `Desolation' or `Devotion'. `Rhu' means `Weakness' or `Empty'. `Rst' means `Calamity' or `Death'. `Rcp' means `Robbery' or `Disaster'. `Rsu' means `Puncture' or `Wounded'. `Rho' means `Consumption' or `Exhaustion'. `Rmn' means `Death' or `Loss'. Sam' means `Elevation' or `Sitting'. `Bat' means `Ride' or `Sitting'. `Yan' means `Grace'. `Kwi' means `Prestigious' or `Nobility'. `See' means `Execute' or `Appoint'. `Seu' means `Injure' or `Sick'. `Coi' means `Genius'. `Sau' means `Life limit'. `U' is the alphabetical order of the stem of time interval and `Z' is the root of time interval. In case of year, `U' and `Z' stands for the stem and root of it, only if the time is after `Joint of Year'. If the time is before `Joint of Year', it is regarded as previous year. `Joint of Year' is same as `Joint of February' in Gregorian calendar. Usually, it is on a day between 3rd to 5th of February in Gregorian calendar. In case of month, `U' and `Z' stands for the stem and root of it, only if the time is after `Joint of Month'. If the time is before `Joint of Month', it is regarded as previous month. `y' is the year after `Joint of Year' in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. `SC' is the `Sex Code' of a person. The `Sex Code' of male is `m' and that of female is `f'. In general, the value of `m' is assigned to `0' and the value of `f' is `1'. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite or people have no sex could be either `m' or `f'. In this case, both sex codes should be used to check out which one is more accurate. `R[m/n]' is a remainder function such that it takes the remainder of `m' divided by `n'. `n' is a natural number. `I[n]' is an integer function such that it takes the integral part of number `n' without rounding up it. `A[n]' is an approximated integer function such that it takes the nearest whole number of `n'. `&C[ ]' is a conditional function of an event such that the mathematical expression after the `:' sign must be operated if the event occurs (i.e. The conditional `&C[ ]' becomes true.). `T=(Mod 12)' is a modulated function such that if T>11 then `T' becomes `T-12'. If T<0 then `T' becomes `T+12'. Hence, the value of `T' always lies from 0 to 11.Assume the time is 12:32 p.m. on 19th February of 2005. It is the nineteenth day in the eleventh month in lunar calendar. The `Year Code' (YC) is (2,9). The `Month Code' (MC) is (5,0). The `Day Code' (DC) is (4,1). The `Hour Code' (HC) is (3,6). Find the location (zone number) of timeons of a male at that time. The `Sex Code' (SC) of male is `m' and `m=0'. SC=0. Since 12:32 p.m. on 19th February of 2005 is after `Joint of Year', y=2005. It is also after `Joint of December' which is at 8:34 a.m. on 7th December of 2005. Thus, m=12. The lunar day is d=19. h=12+32/60 and h=12.533 . The stem of hour is U=3. The root of hour is Z=6. Apply the `Timeon General Formulae' as follows: Luk=1+U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). Luk=1+3+I[3/3]-2xI[3/5]-2xI[3/6]+2xI[3/7]+2xI[3/10] (Mod 12). Luk=4+I[1]-2xI[0.6]-2xI[0.5]+2xI[0.42857]+2xI[0.3] (Mod 12). Luk=4+1-2x0-2x0+2x0+2x0 (Mod 12). Luk=5 (Mod 12). Luk=5. Yeu=2+U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). Yeu=2+3+I[3/3]-2xI[3/5]-2xI[3/6]+2xI[3/7]+2xI[3/10] (Mod 12). Yeu=5+I[1]-2xI[0.6]-2xI[0.5]+2xI[0.42857]+2xI[0.3] (Mod 12). Yeu=5+1-2x0-2x0+2x0+2x0 (Mod 12). Yeu=6 (Mod 12). Yeu=6. Tor=U+I[U/3]-2xI[U/5]-2xI[U/6]+2xI[U/7]+2xI[U/10] (Mod 12). Tor=3+I[3/3]-2xI[3/5]-2xI[3/6]+2xI[3/7]+2xI[3/10] (Mod 12). Tor=3+I[1]-2xI[0.6]-2xI[0.5]+2xI[0.42857]+2xI[0.3] (Mod 12). Tor=3+1-2x0-2x0+2x0+2x0 (Mod 12). Tor=4 (Mod 12). Tor=4. `Yeu' & `Tor' are interchangeable in pairs. If Yeu=2+R[U/2]+3xI[U/3]-3xI[U/6]+3xI[U/7] (Mod 12) then Tor=U+2xI[U/2]-I[U/3]-4xI[U/5]+I[U/6]-I[U/7]-8xI[U/10] (Mod 12). Yeu=2+R[3/2]+3xI[3/3]-3xI[3/6]+3xI[3/7] (Mod 12) & Tor=3+2xI[3/2]-I[3/3]-4xI[3/5]+I[3/6]-I[3/7]-8xI[3/10] (Mod 12). Yeu=2+1+3xI[1]-3xI[0.5]+3xI[0.42857] (Mod 12) & Tor=3+2xI[1.5]-I[1]-4xI[0.6]+I[0.5]-I[0.42857]+8xI[0.3] (Mod 12). Yeu=3+3x1-3x0+3x0 (Mod 12) & Tor=3+2x1-1-4x0+0-0-8x0 (Mod 12). Yeu=6 (Mod 12) & Tor=4 (Mod 12). Yeu=6 & Tor=4. [Remarks: `Yeu' and `Tor' must be interchanged in pairs. The values of `Yeu' and `Tor' for odd values of `U' are same as the original pairs.] Fui=6+U+I[U/4]+I[U/5]-2xI[U/6]-I[U/7] (Mod 12). Fui=6+3+I[3/4]+I[3/5]-2xI[3/6]-I[3/7] (Mod 12). Fui=9+I[0.75]+I[0.6]-2xI[0.5]-I[0.42857] (Mod 12). Fui=9+0+0-2x0-0 (Mod 12). Fui=9 (Mod 12). Fui=9. Eut=2-U-I[U/4]-I[U/5]+2xI[U/6]+I[U/7] (Mod 12). Eut=2-3-I[3/4]-I[3/5]+2xI[3/6]+I[3/7] (Mod 12). Eut=-1-I[0.75]-I[0.6]+2xI[0.5]+I[0.42857] (Mod 12). Eut=-1-0-0+2x0+0 (Mod 12). Eut=-1 (Mod 12). Eut=12-1. Eut=11. Gun=6+U-4xI[U/2]+9x[U/6]+I[U/7]+I[U/8]-I[U/10] (Mod 12). Gun=6+3-4xI[3/2]+9x[3/6]+I[3/7]+I[3/8]-I[3/10] (Mod 12). Gun=9-4xI[1.5]+9x[0.5]+I[0.42857]+I[0.375]-I[0.3] (Mod 12). Gun=9-4x1+9x0+0+0-0 (Mod 12). Gun=5 (Mod 12). Gun=5. Fuk=10-U+5xI[U/3]-7xI[U/5]-5xI[U/6]+5xI[U/7]-3xI[U/9]+7xI[U/10] (Mod 12). Fuk=10-3+5xI[3/3]-7xI[3/5]-5xI[3/6]+5xI[3/7]-3xI[3/9]+7xI[3/10] (Mod 12). Fuk=7+5xI[1]-7xI[0.6]-5xI[0.5]+5xI[0.42857]-3xI[0.33333]+7xI[0.3] (Mod 12). Fuk=7+5x1-7x0-5x0+5x0-3x0+7x0 (Mod 12). Fuk=12 (Mod 12). Fuk=12-12. Fuk=0. Ckw=4+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Ckw=4+3+I[3/3]-2xI[3/5]-I[3/6]+I[3/7]+2xI[3/10] (Mod 12). Ckw=7+I[1]-2xI[0.6]-I[0.5]+I[0.42857]+2xI[0.3] (Mod 12). Ckw=7+1-2x0-0+0+2x0 (Mod 12). Ckw=8 (Mod 12). Ckw=8. Kkw=10-U-I[U/3]+2xI[U/5]+I[U/6]-I[U/7]-2xI[U/10] (Mod 12). Kkw=10-3-I[3/3]+2xI[3/5]+I[3/6]-I[3/7]-2xI[3/10] (Mod 12). Kkw=7-I[1]+2xI[0.6]+I[0.5]-I[0.42857]-2xI[0.3] (Mod 12). Kkw=7-1+2x0+0-0-2x0 (Mod 12). Kkw=6 (Mod 12). Kkw=6. Hok=11-5xI[U/2]-4xI[U/3]+5xI[U/5]+4xI[U/6]-4xI[U/7]+7xI[U/10] (Mod 12). Hok=11-5xI[3/2]-4xI[3/3]+5xI[3/5]+4xI[3/6]-4xI[3/7]+7xI[3/10] (Mod 12). Hok=11-5xI[1.5]-4xI[1]+5xI[0.6]+4xI[0.5]-4xI[0.42857]+7xI[0.3] (Mod 12). Hok=11-5x1-4x1+5x0+4x0-4x0+7x0 (Mod 12). Hok=2 (Mod 12). Hok=2. Har=2+7U-6xI[U/2]-10xI[U/3]+2xI[U/5]-2xI[U/6]+3xI[U/7]-2xI[U/8]-I[U/9] (Mod 12). Har=2+7x3-6xI[3/2]-10xI[3/3]+2xI[3/5]-2xI[3/6]+3xI[3/7]-2xI[3/8]-I[3/9] (Mod 12). Har=23-6xI[1.5]-10xI[1]+2xI[0.6]-2xI[0.5]+3xI[0.42857]-2xI[0.375]-I[0.33333] (Mod 12). Har=23-6x1-10x1+2x0-2x0+3x0-2x0-0 (Mod 12). Har=7 (Mod 12). Har=7. Yim=4+2U-8xI[U/3]+3xI[U/4]-5xI[U/5]+6xI[U/6]+4xI[U/7]-6xI[U/8]-3xI[U/9]-I[U/10] (Mod 12). Yim=4+2x3-8xI[3/3]+3xI[3/4]-5xI[3/5]+6xI[3/6]+4xI[3/7]-6xI[3/8]-3xI[3/9]-I[3/10] (Mod 12). Yim=10-8xI[1]+3xI[0.75]-5xI[0.6]+6xI[0.5]+4xI[0.42857]-6xI[0.375]-3xI[0.33333]-I[0.3] (Mod 12). Yim=10-8x1+3x0-5x0+6x0+4x0-6x0-3x0-0 (Mod 12). Yim=2 (Mod 12). Yim=2. Chu=4+U+5xI[U/3]+4xI[U/4]+8xI[U/6]-7xI[U/7]-I[U/8]-3xI[U/9]+I[U/10] (Mod 12). Chu=4+3+5xI[3/3]+4xI[3/4]+8xI[3/6]-7xI[3/7]-I[3/8]-3xI[3/9]+I[3/10] (Mod 12). Chu=7+5xI[1]+4xI[0.75]+8xI[0.5]-7xI[0.42857]-I[0.375]-3xI[0.33333]+I[0.3] (Mod 12). Chu=7+5x1+4x0+8x0-7x0-0-3x0+0 (Mod 12). Chu=12 (Mod 12). Chu=12-12. Chu=0. Yue=3+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12). Yue=3+3+I[3/3]-2xI[3/5]-I[3/6]+I[3/7]+2xI[3/10] (Mod 12). Yue=6+I[1]-2xI[0.6]-I[0.5]+I[0.42857]+2xI[0.3] (Mod 12). Yue=6+1-2x0-0+0+2x0 (Mod 12). Yue=7 (Mod 12). Yue=7. Jit=10-2U-I[U/6] (Mod 12). Jit=10-2x3-I[3/6] (Mod 12). Jit=4-I[0.5] (Mod 12). Jit=4-0 (Mod 12). Jit=4 (Mod 12). Jit=4. Bos=1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12) or Bos=Luk. Bos=1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10] (Mod 12). Bos=4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3] (Mod 12). Bos=4+1-0-2x0+0+0 (Mod 12). Bos=5 (Mod 12). Bos=5. Lis=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-1, R[(SC+U)/2]=1:+1}]+Bos (Mod 12) or Lis={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-1, R[(SC+U)/2]=1:+1}] (Mod 12). Lis={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-1, R[(SC+U)/2]=1:+1}] (Mod 12). Lis={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-1, R[(0+3)/2]=1:+1] (Mod 12). Lis={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-1, R[3/2]=1:+1] (Mod 12). Lis={4+1-0-2x0+0+0}&C[1=0:-1, 1=1:+1] (Mod 12). Lis=5&C[1=0:-1, 1=1:+1] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Lis=5+1 (Mod 12). Lis=6 (Mod 12). Lis=6. Clu=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-2, R[(SC+U)/2]=1:+2}]+Bos (Mod 12) or Clu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-2, R[(SC+U)/2]=1:+2}] (Mod 12). Clu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-2, R[(SC+U)/2]=1:+2}] (Mod 12). Clu={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-2, R[(0+3)/2]=1:+2] (Mod 12). Clu={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-2, R[3/2]=1:+2] (Mod 12). Clu={4+1-0-2x0+0+0}&C[1=0:-1, 1=1:+1] (Mod 12). Clu=5&C[1=0:-2, 1=1:+2] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Clu=5+2 (Mod 12). Clu=7 (Mod 12). Clu=7. Sho=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-3, R[(SC+U)/2]=1:+3}]+Bos (Mod 12) or Sho={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-3, R[(SC+U)/2]=1:+3}] (Mod 12). Sho={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-3, R[(SC+U)/2]=1:+3}] (Mod 12). Sho={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-3, R[(0+3)/2]=1:+3] (Mod 12). Sho={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-3, R[3/2]=1:+3] (Mod 12). Sho={4+1-0-2x0+0+0}&C[1=0:-3, 1=1:+3] (Mod 12). Sho=5&C[1=0:-3, 1=1:+3] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Sho=5+3 (Mod 12). Sho=8 (Mod 12). Sho=8. Ckn=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-4, R[(SC+U)/2]=1:+4}]+Bos (Mod 12) or Ckn={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-4, R[(SC+U)/2]=1:+4}] (Mod 12). Ckn={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-4, R[(SC+U)/2]=1:+4}] (Mod 12). Ckn={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-4, R[(0+3)/2]=1:+4] (Mod 12). Ckn={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-4, R[3/2]=1:+4] (Mod 12). Ckn={4+1-0-2x0+0+0}&C[1=0:-4, 1=1:+4] (Mod 12). Ckn=5&C[1=0:-4, 1=1:+4] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Ckn=5+4 (Mod 12). Ckn=9 (Mod 12). Ckn=9. Csu=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-5, R[(SC+U)/2]=1:+5}]+Bos (Mod 12) or Csu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-5, R[(SC+U)/2]=1:+5}] (Mod 12). Csu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-5, R[(SC+U)/2]=1:+5}] (Mod 12). Csu={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-5, R[(0+3)/2]=1:+5] (Mod 12). Csu={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-5, R[3/2]=1:+5] (Mod 12). Csu={4+1-0-2x0+0+0}&C[1=0:-5, 1=1:+5] (Mod 12). Csu=5&C[1=0:-5, 1=1:+5] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Csu=5+5 (Mod 12). Csu=10 (Mod 12). Csu=10. Lim=7+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12) or Lim=6+Luk (Mod 12) or Lim=6+Bos (Mod 12). Lim=7+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10] (Mod 12). Lim=10+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3] (Mod 12). Lim=10+1-0-2x0+0+0 (Mod 12). Lim=11 (Mod 12). Lim=11. Hee=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-7, R[(SC+U)/2]=1:+7}]+Bos (Mod 12) or Hee={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-7, R[(SC+U)/2]=1:+7}] (Mod 12). Hee={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-7, R[(SC+U)/2]=1:+7}] (Mod 12). Hee={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-7, R[(0+3)/2]=1:+7] (Mod 12). Hee={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-7, R[3/2]=1:+7] (Mod 12). Hee={4+1-0-2x0+0+0}&C[1=0:-7, 1=1:+7] (Mod 12). Hee=5&C[1=0:-7, 1=1:+7] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Hee=5+7 (Mod 12). Hee=12 (Mod 12). Hee=12-12. Hee=0. Cbm=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-8, R[(SC+U)/2]=1:+8}]+Bos (Mod 12) or Cbm={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-8, R[(SC+U)/2]=1:+8}] (Mod 12). Cbm={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-8, R[(SC+U)/2]=1:+8}] (Mod 12). Cbm={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-8, R[(0+3)/2]=1:+8] (Mod 12). Cbm={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-8, R[3/2]=1:+8] (Mod 12). Cbm={4+1-0-2x0+0+0}&C[1=0:-8, 1=1:+8] (Mod 12). Cbm=5&C[1=0:-8, 1=1:+8] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Cbm=5+8 (Mod 12). Cbm=13 (Mod 12). Cbm=13-12. Cbm=1. Bai=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-9, R[(SC+U)/2]=1:+9}]+Bos (Mod 12) or Bai={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-9, R[(SC+U)/2]=1:+9}] (Mod 12). Bai={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-9, R[(SC+U)/2]=1:+9}] (Mod 12). Bai={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-9, R[(0+3)/2]=1:+9] (Mod 12). Bai={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-9, R[3/2]=1:+9] (Mod 12). Bai={4+1-0-2x0+0+0}&C[1=0:-9, 1=1:+9] (Mod 12). Bai=5&C[1=0:-9, 1=1:+9] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Bai=5+9 (Mod 12). Bai=14 (Mod 12). Bai=14-12. Bai=2. Fbg=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-10, R[(SC+U)/2]=1:+10}]+Bos (Mod 12) or Fbg={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-10, R[(SC+U)/2]=1:+10}] (Mod 12). Fbg={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-10, R[(SC+U)/2]=1:+10}] (Mod 12). Fbg={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-10, R[(0+3)/2]=1:+10] (Mod 12). Fbg={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-10, R[3/2]=1:+10] (Mod 12). Fbg={4+1-0-2x0+0+0}&C[1=0:-10, 1=1:+10] (Mod 12). Fbg=5&C[1=0:-10, 1=1:+10] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Fbg=5+10 (Mod 12). Fbg=15 (Mod 12). Fbg=15-12. Fbg=3. Kfu=&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-11, R[(SC+U)/2]=1:+11}]+Bos (Mod 12) or Kfu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-11, R[(SC+U)/2]=1:+11}] (Mod 12). Kfu={1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10]}&C[(SC:m=0, f=1) & {R[(SC+U)/2]=0:-11, R[(SC+U)/2]=1:+11}] (Mod 12). Kfu={1+3+I[3/3]-I[3/5]-2xI[3/6]+I[3/7]+I[3/10]}&C[R[(0+3)/2]=0:-11, R[(0+3)/2]=1:+11] (Mod 12). Kfu={4+I[1]-I[0.6]-2xI[0.5]+I[0.42857]+I[0.3]}&C[R[3/2]=0:-11, R[3/2]=1:+11] (Mod 12). Kfu={4+1-0-2x0+0+0}&C[1=0:-11, 1=1:+11] (Mod 12). Kfu=5&C[1=0:-10, 1=1:+10] (Mod 12). Since the truth value of `&C[1=0]' is false and the truth value of `&C[1=1]' is true, Kfu=5+11 (Mod 12). Kfu=16 (Mod 12). Kfu=16-12. Kfu=34. Hui=6+Z (Mod 12). Hui=6+6 (Mod 12). Hui=12 (Mod 12). Hui=12-12. Hui=0. Huk=6-Z (Mod 12). Huk=6-6 (Mod 12). Huk=0 (Mod 12). Huk=0. Chi=Z-8 (Mod 12). Chi=6-8 (Mod 12). Chi=-2 (Mod 12). Chi=12-2. Chi=10. Kok=10-Z (Mod 12). Kok=10-6 (Mod 12). Kok=4 (Mod 12). Kok=4. Lun=3-Z (Mod 12). Lun=3-6 (Mod 12). Lun=-3 (Mod 12). Lun=12-3. Lun=9. Hei=9-Z (Mod 12). Hei=9-6 (Mod 12). Hei=3 (Mod 12). Hei=3. Hoo=1+Z (Mod 12). Hoo=1+6 (Mod 12). Hoo=7 (Mod 12). Hoo=7. Ytk=5+Z (Mod 12). Ytk=5+6 (Mod 12). Ytk=11 (Mod 12). Ytk=11. Psu=5+8Z (Mod 12). Psu=5+8x6 (Mod 12). Psu=5+48 (Mod 12). Psu=53 (Mod 12). Psu=53-12x4. Psu=5. Goo=2+3xI[(Z+1)/3] (Mod 12). Goo=2+3xI[(6+1)/3] (Mod 12). Goo=2+3xI[7/3] (Mod 12). Goo=2+3xI[2.33333] (Mod 12). Goo=2+3x2 (Mod 12). Goo=8 (Mod 12). Goo=8. Gwa=10+3xI[(Z+1)/3] (Mod 12). Gwa=10+3xI[(6+1)/3] (Mod 12). Gwa=10+3xI[7/3] (Mod 12). Gwa=10+3xI[2.33333] (Mod 12). Gwa=10+3x2 (Mod 12). Gwa=16 (Mod 12). Gwa=16-12. Gwa=4. Fei=8+Z-6xI[Z/3] (Mod 12). Fei=8+6-6xI[6/3] (Mod 12). Fei=14-6xI[2] (Mod 12). Fei=14-6x2 (Mod 12). Fei=2 (Mod 12). Fei=2. Yei=11+Z (Mod 12). Yei=11+6 (Mod 12). Yei=17 (Mod 12). Yei=17-12. Yei=5. Kwy=2-3xR[Z/4] (Mod 12). Kwy=2-3xR[6/4] (Mod 12). Kwy=2-3x2 (Mod 12). Kwy=2-6 (Mod 12). Kwy=-4 (Mod 12). Kwy=12-4. Kwy=8. Lfo=8-3xR[Z/4] (Mod 12). Lfo=8-3xR[6/4] (Mod 12). Lfo=8-3x2 (Mod 12). Lfo=2 (Mod 12). Lfo=2. Cak=6-7Z+9xI[Z/4]-9xI[Z/5]+3xI[Z/8]-3xI[Z/10] (Mod 12). Cak=6-7x6+9xI[6/4]-9xI[6/5]+3xI[6/8]-3xI[6/10] (Mod 12). Cak=-36+9xI[1.5]-9xI[1.2]+3xI[0.75]-3xI[0.6] (Mod 12). Cak=-36+9xI[1.5]-9xI[1.2]+3xI[0.75]-3xI[0.6] (Mod 12). Cak=-36+9x1-9x1+3x0-3x0 (Mod 12). Cak=-36 (Mod 12). Cak=12x3-36. Cak=0. Tdo=5+3xR[Z/4] (Mod 12). Tdo=5+3xR[6/4] (Mod 12). Tdo=5+3x2 (Mod 12). Tdo=5+6 (Mod 12). Tdo=11. Pik=7+4Z-I[Z/2]+2xI[Z/3]-4xI[Z/4]-I[Z/6]-2xI[Z/7]+2xI[Z/8]+10xI[Z/9]+I[Z/10]+2xI[Z/11] (Mod 12). Pik=7+4x6-I[6/2]+2xI[6/3]-4xI[6/4]-I[6/6]-2xI[6/7]+2xI[6/8]+10xI[6/9]+I[6/10]+2xI[6/11] (Mod 12). Pik=31-I[3]+2xI[2]-4xI[1.5]-I[1]-2xI[0.85714]+2xI[0.75]+10xI[0.66666]+I[0.6]+2xI[0.54545] (Mod 12). Pik=31-3+2x2-4x1-1-2x0+2x0+10x0+0+2x0 (Mod 12). Pik=31-3+2x2-4x1-1-2x0+2x0+10x0+0+2x0 (Mod 12). Pik=27 (Mod 12). Pik=27-12x2. Pik=3. Sui=3+6Z+9xI[Z/2]-6xI[Z/4] (Mod 12). Sui=3+6x6+9xI[6/2]-6xI[6/4] (Mod 12). Sui=39+9xI[3]-6xI[1.5] (Mod 12). Sui=39+9x3-6x1 (Mod 12). Sui=60 (Mod 12). Sui=60-12x5. Sui=0. Yng=3-5Z+9xI[Z/4]-3xI[Z/5]+3xI[Z/6]-3xI[Z/8]+6xI[Z/10]+9xI[Z/11] (Mod 12). Yng=3-5x6+9xI[6/4]-3xI[6/5]+3xI[6/6]-3xI[6/8]+6xI[6/10]+9xI[6/11] (Mod 12). Yng=-27+9xI[1.5]-3xI[1.2]+3xI[1]-3xI[0.75]+6xI[0.6]+9xI[0.54545] (Mod 12). Yng=-27+9x1-3x1+3x1-3x0+6x0+9x0 (Mod 12). Yng=-18 (Mod 12). Yng=12x2-18. Yng=6. Hoi=7-Z (Mod 12). Hoi=7-6 (Mod 12). Hoi=1 (Mod 12). Hoi=1. Aat=12-Z (Mod 12). Aat=12-6 (Mod 12). Aat=6 (Mod 12). Aat=6. Nik=1+3xI[{Z+1 (Mod 12)}/3] (Mod 12). Nik=1+3xI[{6+1 (Mod 12)}/3] (Mod 12). Nik=1+3xI[{7 (Mod 12)}/3] (Mod 12). Nik=1+3xI[7/3] (Mod 12). Nik=1+3xI[2.33333] (Mod 12). Nik=1+3x2 (Mod 12). Nik=7 (Mod 12). Nik=7. Yuk=5+9xR[Z/4] (Mod 12). Yuk=5+9xR[6/4] (Mod 12). Yuk=5+9x2 (Mod 12). Yuk=23 (Mod 12). Yuk=23-12. Yuk=11. Kam=9xR[Z/4] (Mod 12). Kam=9xR[6/4] (Mod 12). Kam=9x2 (Mod 12). Kam=18 (Mod 12). Kam=18-12. Kam=6. Can=9+R[Z/6] (Mod 12). Can=9+R[6/6] (Mod 12). Can=9+0 (Mod 12). Can=9 (Mod 12). Can=9. Bau=3+R[Z/6] (Mod 12). Bau=3+R[6/6] (Mod 12). Bau=3+0 (Mod 12). Bau=3 (Mod 12). Bau=3. Chm=9xR[Z/4] (Mod 12). Chm=9xR[6/4] (Mod 12). Chm=9x2 (Mod 12). Chm=18 (Mod 12). Chm=18-12. Chm=6. Pan=1+9xR[Z/4] (Mod 12). Pan=1+9xR[6/4] (Mod 12). Pan=1+9x2 (Mod 12). Pan=19 (Mod 12). Pan=19-12. Pan=7. Yik=2+9xR[Z/4] (Mod 12). Yik=2+9xR[6/4] (Mod 12). Yik=2+9x2 (Mod 12). Yik=20 (Mod 12). Yik=20-12. Yik=8. Sik=3+9xR[Z/4] (Mod 12). Sik=3+9xR[6/4] (Mod 12). Sik=3+9x2 (Mod 12). Sik=21 (Mod 12). Sik=21-12. Sik=9. Wah=4+9xR[Z/4] (Mod 12). Wah=4+9xR[6/4] (Mod 12). Wah=4+9x2 (Mod 12). Wah=22 (Mod 12). Wah=22-12. Wah=10. Cip=5+9xR[Z/4] (Mod 12). Cip=5+9xR[6/4] (Mod 12). Cip=5+9x2 (Mod 12). Cip=23 (Mod 12). Cip=23-12. Cip=11. Joi=6+9xR[Z/4] (Mod 12). Joi=6+9xR[6/4] (Mod 12). Joi=6+9x2 (Mod 12). Joi=24 (Mod 12). Joi=24-12x2. Joi=0. Tst=7+9xR[Z/4] (Mod 12). Tst=7+9xR[6/4] (Mod 12). Tst=7+9x2 (Mod 12). Tst=25 (Mod 12). Tst=25-12x2. Tst=1. Zhi=8+9xR[Z/4] (Mod 12). Zhi=8+9xR[6/4] (Mod 12). Zhi=8+9x2 (Mod 12). Zhi=26 (Mod 12). Zhi=26-12x2. Zhi=2. Ham=9+9xR[Z/4] (Mod 12). Ham=9+9xR[6/4] (Mod 12). Ham=9+9x2 (Mod 12). Ham=27 (Mod 12). Ham=27-12x2. Ham=3. Yut=10+9xR[Z/4] (Mod 12). Yut=10+9xR[6/4] (Mod 12). Yut=10+9x2 (Mod 12). Yut=28 (Mod 12). Yut=28-12x2. Yut=4. Mon=11+9xR[Z/4] (Mod 12). Mon=11+9xR[6/4] (Mod 12). Mon=11+9x2 (Mod 12). Mon=29 (Mod 12). Mon=29-12x2. Mon=5. Kim=Z. Kim=6. Zee=Z. Zee=6. Fym=1+Z (Mod 12). Fym=1+6 (Mod 12). Fym=7 (Mod 12). Fym=7. Sog=2+Z (Mod 12). Sog=2+6 (Mod 12). Sog=8 (Mod 12). Sog=8. Sok=3+Z (Mod 12). Sok=3+6 (Mod 12). Sok=9 (Mod 12). Sok=9. Kun=4+Z (Mod 12). Kun=4+6 (Mod 12). Kun=10 (Mod 12). Kun=10. Sfu=5+Z (Mod 12). Sfu=5+6 (Mod 12). Sfu=11 (Mod 12). Sfu=11. Tho=6+Z (Mod 12). Tho=6+6 (Mod 12). Tho=12 (Mod 12). Tho=12-12. Tho=0. Lon=7+Z (Mod 12). Lon=7+6 (Mod 12). Lon=13 (Mod 12). Lon=13-12. Lon=1. Ark=7+Z (Mod 12). Ark=7+6 (Mod 12). Ark=13 (Mod 12). Ark=13-12. Ark=1. Foo=8+Z (Mod 12). Foo=8+6 (Mod 12). Foo=14 (Mod 12). Foo=14-12. Foo=2. Sit=9+Z (Mod 12). Sit=9+6 (Mod 12). Sit=15 (Mod 12). Sit=15-12. Sit=3. Diu=10+Z (Mod 12). Diu=10+6 (Mod 12). Diu=16 (Mod 12). Diu=16-12. Diu=4. Bag=11+Z (Mod 12). Bag=11+6 (Mod 12). Bag=17 (Mod 12). Bag=17-12. Bag=5. Fu=2+Z (Mod 12). Fu=2+6 (Mod 12). Fu=8 (Mod 12). Fu=8. Bu=12-Z (Mod 12). Bu=12-6 (Mod 12). Bu=6 (Mod 12). Bu=6. Yin=7+Z (Mod 12). Yin=7+6 (Mod 12). Yin=13 (Mod 12). Yin=13-12. Yin=1. Yiu=11+Z (Mod 12). Yiu=11+6 (Mod 12). Yiu=17 (Mod 12). Yiu=17-12. Yiu=5. Tma=2+9xR[Z/4] (Mod 12). Tma=2+9xR[6/4] (Mod 12). Tma=2+9x2 (Mod 12). Tma=20 (Mod 12). Tma=20-12. Tma=8. Kai=6+2xI[Z/2] (Mod 12). Kai=6+2xI[6/2] (Mod 12). Kai=6+2xI[3] (Mod 12). Kai=6+2x3 (Mod 12). Kai=12 (Mod 12). Kai=12-12. Kai=0. Yst=6-2Z (Mod 12). Yst=6-2x6 (Mod 12). Yst=-6 (Mod 12). Yst=12-6. Yst=6. Tmo=2+9Z-3xI[Z/2]-6xI[Z/3]-6xI[Z/6]+6xI[Z/7]+6xI[Z/9]+6xI[Z/11] (Mod 12). Tmo=2+9x6-3xI[6/2]-6xI[6/3]-6xI[6/6]+6xI[6/7]+6xI[6/9]+6xI[6/11] (Mod 12). Tmo=56-3xI[3]-6xI[2]-6xI[1]+6xI[0.85714]+6xI[0.66666]+6xI[0.54545] (Mod 12). Tmo=56-3x3-6x2-6x1+6x0+6x0+6x0 (Mod 12). Tmo=29 (Mod 12). Tmo=29-12x2. Tmo=5. Tyu=10-8Z+4xI[Z/2]-9xI[Z/3]+3xI[Z/4]+6xI[Z/5]+6xI[Z/6]-8xI[Z/7]+9xI[Z/8]+I[Z/9]-7xI[Z/10] (Mod 12). Tyu=10-8x6+4xI[6/2]-9xI[6/3]+3xI[6/4]+6xI[6/5]+6xI[6/6]-8xI[6/7]+9xI[6/8]+I[6/9]-7xI[6/10] (Mod 12). Tyu=-38+4xI[3]-9xI[2]+3xI[1.5]+6xI[1.2]+6xI[1]-8xI[0.85714]+9xI[0.75]+I[0.66666]-7xI[0.6] (Mod 12). Tyu=-38+4x3-9x2+3x1+6x1+6x1-8x0+9x0+0-7x0 (Mod 12). Tyu=-29 (Mod 12). Tyu=12x3-29. Tyu=7. Ch=10-Z (Mod 12). Ch=10-6 (Mod 12). Ch=4 (Mod 12). Ch=4. Kk=4+Z (Mod 12). Kk=4+6 (Mod 12). Kk=10 (Mod 12). Kk=10. Hun=11-Z (Mod 12). Hun=11-6 (Mod 12). Hun=5 (Mod 12). Hun=5. Kip=11+Z (Mod 12). Kip=11+6 (Mod 12). Kip=17 (Mod 12). Kip=17-12. Kip=5. Tfu=6+Z (Mod 12). Tfu=6+6 (Mod 12). Tfu=12 (Mod 12). Tfu=12-12. Tfu=0. Fgo=2+Z (Mod 12). Fgo=2+6 (Mod 12). Fgo=8 (Mod 12). Fgo=8. Chn=10-2xI[{U+5x[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or Chn=10-2xI[(N-1)/10] (Mod 12) and N=5x{11-[(Z-U) (Mod 12)]}+U. `N' is the `Sequence Code of Time Co-ordinates' (Numerology). Chn=10-2xI[{3+5x[3-6-1 (Mod 12)]-1}/10] (Mod 12). Chn=10-2xI[{3+5x[-4 (Mod 12)]-1}/10] (Mod 12). Chn=10-2xI[{3+5x[12-4]-1}/10] (Mod 12). Chn=10-2xI[{3+5x8-1}/10] (Mod 12). Chn=10-2xI[42/10] (Mod 12). Chn=10-2xI[4.2] (Mod 12). Chn=10-2x4 (Mod 12). Chn=2 (Mod 12). Chn=2. Chn2=11-2xI[{U+5[U-Z-1 (Mod 12)]-1}/10] (Mod 12) or Chn2=Chn+1 (Mod 12). Chn2=11-2xI[{3+5x[3-6-1 (Mod 12)]-1}/10] (Mod 12). Chn2=11-2xI[{3+5x[-4 (Mod 12)]-1}/10] (Mod 12). Chn2=11-2xI[{3+5x[12-4]-1}/10] (Mod 12). Chn2=11-2xI[{3+5x8-1}/10] (Mod 12). Chn2=11-2xI[42/10] (Mod 12). Chn2=11-2xI[4.2] (Mod 12). Chn2=11-2x4 (Mod 12). Chn2=3 (Mod 12). Chn2=3. Or, calculate `Chn2' from `Chn'. Since Chn=2 and `Chn2=Chn+1 (Mod 12)', Chn2=2+1 (Mod 12). Chn2=3 (Mod 12). Chn2=3. Hence. Chn=2 and Chn2=3. Im=2+R[Z/4]-3xI[Z/2]+7xI[Z/3]-I[Z/4]-7xI[Z/6]+7xI[Z/7]-7xI[Z/9]+7xI[Z/11]+A[h/2] (Mod 12). `Z' is the root of year after `Joint of Year'. If the time is before `Joint of Year', it is regarded as previous year. `Joint of Year' is same as `Joint of February' in Gregorian calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. The `Year Code' (YC) of the time at 12:32 p.m. on 19th February of 2005 is (2,9). Thus, Z=9. Im=2+R[9/4]-3xI[9/2]+7xI[9/3]-I[9/4]-7xI[9/6]+7xI[9/7]-7xI[9/9]+7xI[9/11]+A[12.53333/2] (Mod 12). Im=2+1-3xI[4.5]+7xI[3]-I[2.25]-7xI[1.5]+7xI[1.285714]-7xI[1]+7xI[0.81818]+A[6.26666] (Mod 12). Im=3-3x4+7x3-2-7x1+7x1-7x1+7x0+6 (Mod 12). Im=9 (Mod 12). Im=9. Li=10+R[Z/4]+3xI[Z/2]-6xI[Z/3]-I[Z/5]-5xI[Z/6]+6xI[Z/7]+5xI[Z/9]+2xI[Z/10]+6xI[Z/11]+A[h/2] (Mod 12). `Z' is the root of year after `Joint of Year'. If the time is before `Joint of Year', it is regarded as previous year. `Joint of Year' is same as `Joint of February' in Gregorian calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. The `Year Code' (YC) of the time at 12:32 p.m. on 19th February of 2005 is (2,9). Thus, Z=9. Li=10+R[9/4]+3xI[9/2]-6xI[9/3]-I[9/5]-5xI[9/6]+6xI[9/7]+5xI[9/9]+2xI[9/10]+6xI[9/11]+A[12.53333/2] (Mod 12). Li=10+1+3xI[4.5]-6xI[3]-I[1.8]-5xI[1.5]+6xI[1.28571]+5xI[1]+2xI[0.9]+6xI[0.81818]+A[6.26666] (Mod 12). Li=11+3x4-6x3-1-5x1+6x1+5x1+2x0+6x0+6 (Mod 12). Li=16 (Mod 12). Li=16-12. Li=4. If U=9, apply the formula `Rlu=1+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12)'. Rlu=1+9+I[9/3]-I[9/5]-2xI[9/6]+I[9/7]+I[9/10] (Mod 12). Rlu=10+I[3]-I[1.8]-2xI[1.5]+I[1.2857]+I[0.9] (Mod 12). Rlu=10+3-1-2x1+1+0 (Mod 12). Rlu=11 (Mod 12). Rlu=11. If U=9, apply the formula `Rye=2+U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12)'. Rye=2+9+I[9/3]-I[9/5]-2xI[9/6]+I[9/7]+I[9/10] (Mod 12). Rye=11+I[3]-I[1.8]-2xI[1.5]+I[1.2857]+I[0.9] (Mod 12). Rye=11+3-1-2x1+1+0 (Mod 12). Rye=12 (Mod 12). Rye=12-12. Rye=0. If U=9, apply the formula `Rto=U+I[U/3]-I[U/5]-2xI[U/6]+I[U/7]+I[U/10] (Mod 12)'. Rto=9+I[9/3]-I[9/5]-2xI[9/6]+I[9/7]+I[9/10] (Mod 12). Rto=9+I[3]-I[1.8]-2xI[1.5]+I[1.2857]+I[0.9] (Mod 12). Rto=9+3-1-2x1+1+0 (Mod 12). Rto=10 (Mod 12). Rto=10. If U=9, apply the formula `Rfu=6+U+I[U/4]+I[U/5]-2xI[U/6]-I[U/8] (Mod 12)'. Rfu=6+9+I[9/4]+I[9/5]-2xI[9/6]-I[9/8] (Mod 12). Rfu=15+I[2.25]+I[1.8]-2xI[1.5]-I[1.125] (Mod 12). Rfu=15+2+1-2x1-1 (Mod 12). Rfu=15 (Mod 12). Rfu=15-12. Rfu=3. If U=9, apply the formula `Rut=2-U-I[U/4]-I[U/5]+2xI[U/6]+I[U/8] (Mod 12)'. Rut=2-9-I[9/4]-I[9/5]+2xI[9/6]+I[9/8] (Mod 12). Rut=-7-I[2.25]-I[1.8]+2xI[1.5]+I[1.125] (Mod 12). Rut=-7-2-1+2x1+1 (Mod 12). Rut=-7 (Mod 12). Rut=12-7. Rut=5. If U=9, apply the formula `Rch=4+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12)'. Rch=4+9+I[9/3]-2xI[9/5]-I[9/6]+I[9/7]+2xI[9/10] (Mod 12). Rch=13+I[3]-2xI[1.8]-I[1.5]+I[1.2857]+2xI[0.9] (Mod 12). Rch=13+3-2x1-1+1+2x0 (Mod 12). Rch=14 (Mod 12). Rch=14-12. Rch=2. If U=9, apply the formula `Rkk=10-U-I[U/3]+2xI[U/5]+I[U/6]-I[U/7]-2xI[U/10] (Mod 12)'. Rkk=10-9-I[9/3]+2xI[9/5]+I[9/6]-I[9/7]-2xI[9/10] (Mod 12). Rkk=1-I[3]+2xI[1.8]+I[1.5]-I[1.2857]-2xI[0.9] (Mod 12). Rkk=1-3+2x1+1-1-2x0 (Mod 12). Rkk=0 (Mod 12). Rkk=0. If U=9, apply the formula `Rok=11-5xI[U/2]-4xI[U/3]+5xI[U/5]+4xI[U/6]-4xI[U/7]+7xI[U/10] (Mod 12)'. Rok=11-5xI[9/2]-4xI[9/3]+5xI[9/5]+4xI[9/6]-4xI[9/7]+7xI[9/10] (Mod 12). Rok=11-5xI[4.5]-4xI[3]+5xI[1.8]+4xI[1.5]-4xI[1.2857]+7xI[0.9] (Mod 12). Rok=11-5x4-4x3+5x1+4x1-4x1+7x0 (Mod 12). Rok=-16 (Mod 12). Rok=12x2-16. Rok=8. If U=9, apply the formula `Ryu=3+U+I[U/3]-2xI[U/5]-I[U/6]+I[U/7]+2xI[U/10] (Mod 12)'. Ryu=3+9+I[9/3]-2xI[9/5]-I[9/6]+I[9/7]+2xI[9/10] (Mod 12). Ryu=12+I[3]-2xI[1.8]-I[1.5]+I[1.2857]+2xI[0.9] (Mod 12). Ryu=12+3-2x1-1+1+2x0 (Mod 12). Ryu=1 (Mod 12). Ryu=1. If U=9, apply the formula `Rce=4+U+5xI[U/3]+4xI[U/4]+8xI[U/6]-7xI[U/7]-I[U/8]-3xI[U/9]+I[U/10] (Mod 12)'. Rce=4+9+5xI[9/3]+4xI[9/4]+8xI[9/6]-7xI[9/7]-I[9/8]-3xI[9/9]+I[9/10] (Mod 12). Rce=13+5xI[3]+4xI[2.25]+8xI[1.5]-7xI[1.2857]-I[1.125]-3xI[1]+I[0.9] (Mod 12). Rce=13+5x3+4x2+8x1-7x1-1-3x1+0 (Mod 12). Rce=33 (Mod 12). Rce=33-12x2. Rce=9. If U=9, apply the formula `Rym=4+2U-8xI[U/3]+3xI[U/4]-5xI[U/5]+6xI[U/6]+4xI[U/7]-6xI[U/8]-3xI[U/9]-I[U/10] (Mod 12)'. Rym=4+2x9-8xI[9/3]+3xI[9/4]-5xI[9/5]+6xI[9/6]+4xI[9/7]-6xI[9/8]-3xI[9/9]-I[9/10] (Mod 12). Rym=22-8xI[3]+3xI[2.25]-5xI[1.8]+6xI[1.5]+4xI[1.2857]-6xI[1.125]-3xI[1]-I[0.9] (Mod 12). Rym=22-8x3+3x2-5x1+6x1+4x1-6x1-3x1-0 (Mod 12). Rym=0 (Mod 12). Rym=0. If Z=6, apply the formula `Rln=3-Z (Mod 12)'. Rln=3-6 (Mod 12). Rln=-3 (Mod 12). Rln=12-3. Rln=9. If Z=6, apply the formula `Rhe=9-Z (Mod 12)'. Rhe=9-6 (Mod 12). Rhe=3 (Mod 12). Rhe=3. If Z=6, apply the formula `Rhm=9+9xR[Z/4] (Mod 12)'. Rhm=9+9xR[6/4] (Mod 12). Rhm=9+9x2 (Mod 12). Rhm=27 (Mod 12). Rhm=27-12x2. Rhm=3. If Z=6, apply the formula `Ryi=11+Z (Mod 12)'. Ryi=11+6 (Mod 12). Ryi=17 (Mod 12). Ryi=17-12. Ryi=5. If Z=6, apply the formula `Rkm=9xR[Z/4] (Mod 12)'. Rkm=9xR[6/4] (Mod 12). Rkm=9x2 (Mod 12). Rkm=18 (Mod 12). Rkm=18-12. Rkm=6. If Z=6, apply the formula `Rik=2+9xR[Z/4] (Mod 12)'. Rik=2+9xR[6/4] (Mod 12). Rik=2+9x2 (Mod 12). Rik=20 (Mod 12). Rik=20-12. Rik=8. If Z=6, apply the formula `Rwa=4+9xR[Z/4] (Mod 12)'. Rwa=4+9xR[6/4] (Mod 12). Rwa=4+9x2 (Mod 12). Rwa=22 (Mod 12). Rwa=22-12. Rwa=10. If Z=6, apply the formula `Rhu=6+Z (Mod 12)'. Rhu=6+6 (Mod 12). Rhu=12 (Mod 12). Rhu=12-12. Rhu=0. If Z=6, apply the formula `Rst=6+9xR[Z/4] (Mod 12)'. Rst=6+9xR[6/4] (Mod 12). Rst=6+9x2 (Mod 12). Rst=24 (Mod 12). Rst=24-12x2. Rst=0. If Z=6, apply the formula `Rcp=5+9xR[Z/4] (Mod 12)'. Rcp=5+9xR[6/4] (Mod 12). Rcp=5+9x2 (Mod 12). Rcp=23 (Mod 12). Rcp=23-12. Rcp=11. If Z=6, apply the formula `Rsu=5+8Z (Mod 12)'. Rsu=5+8x6 (Mod 12). Rsu=53 (Mod 12). Rsu=53-12x4. Rsu=5. If Z=6, apply the formula `Rho=1+Z (Mod 12). Rho=1+6 (Mod 12). Rho=7 (Mod 12). Rho=7. If Z=6, apply the formula `Rmn=11+9xR[Z/4] (Mod 12)'. Rmn=11+9xR[6/4] (Mod 12). Rmn=11+9x2 (Mod 12). Rmn=29 (Mod 12). Rmn=29-12x2. Rmn=5. Sam=1+m+d+I[h/23] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. Assume m=12, d=19 and h=23. Sam=1+12+19+I[23/23] (Mod 12). Sam=32+I[1] (Mod 12). Sam=32+1 (Mod 12). Sam=33-12x2. Sam=9. Bat=1-m-d-I[h/23] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. Assume m=12, d=19 and h=23. Bat=1-12-19-I[23/23] (Mod 12). Bat=-30-1 (Mod 12). Bat=12x3-31. Bat=5. Yan=8+d-A[h/2]+I[h/23] (Mod 12). `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. If d=19 and h=12.53333, Yan=8+19-A[12.53333/2]+I[12.53333/23] (Mod 12), Yan=27-A[6.266665]+I[0.544927] (Mod 12), Yan=27-6+0 (Mod 12), Yan=21 (Mod 12), Yan=21-12, Yan=9. Kwi=2+d+A[h/2] (Mod 12). `d' is the day of a month in lunar calendar. `h' is the time reckoning on a 24-hour base. The unit is hour. If the time is after 11:00 p.m., the day is regarded as next day and the time is regarded as 0:00 a.m.. If d=19 and h=12.53333, Kwi=2+19+A[12.53333/2]+I[12.53333/23] (Mod 12), Kwi=21+A[6.266665]+I[0.544927] (Mod 12), Kwi=21+6+0 (Mod 12), Kwi=27 (Mod 12), Kwi=27-12x2, Kwi=3. See=5+m-A[h/2] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. See=5+12-A[12.533/2] (Mod 12). See=17-13 (Mod 12). See=4 (Mod 12). See=4. Seu=7+m-A[h/2] (Mod 12). `m' is the month after `Joint of Month' in Gregorian calendar. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. Seu=7+12-A[12.533/2] (Mod 12). Seu=19-13 (Mod 12). Seu=6 (Mod 12). Seu=6. Assume `Z' is the root of year and `m' is month in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. The root of year is Z=9 because 12:32 p.m. on 19th February of 2005 is after `Joint of Year'. Since the time is also after `Joint of Month', m=12. Coi=m-A[h/2]+Z (Mod 12). Coi=12-A[12.533/2]+9 (Mod 12). Coi=12-13+9 (Mod 12). Coi=8 (Mod 12). Coi=8. Assume `Z' is the root of year and `m' is month in Gregorian calendar. If the time is before `Joint of Year', it is regarded as previous year. If the time is before `Joint of Month', it is regarded as previous month. `h' is the time reckoning on a 24-hour base. The unit is hour. The root of year is Z=9 because 12:32 p.m. on 19th February of 2005 is after `Joint of Year'. Since the time is also after `Joint of Month', m=12. Sau=m+A[h/2]+Z (Mod 12). Sau=12+A[12.533/2]+9 (Mod 12). Sau=12+13+9 (Mod 12). Sau=34 (Mod 12). Sau=34-12x2. Sau=10.