President: John Wong

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

Analysis of Origin of Millennial Bounds Fortune Co-ordinates (U,Z) and Numerology (N)
 N=01:(1,0) N=02:(2,1) N=03:(3,2) N=04:(4,3) N=05:(5,4) N=06:(6,5) N=07:(7,6) N=08:(8,7) N=09:(9,8) N=10:(10,9) N=11:(1,10) N=12:(2,11) N=13:(3,0) N=14:(4,1) N=15:(5,2) N=16:(6,3) N=17:(7,4) N=18:(8,5) N=19:(9,6) N=20:(10,7) N=21:(1,8) N=22:(2,9) N=23:(3,10) N=24:(4,11) N=25:(5,0) N=26:(6,1) N=27:(7,2) N=28:(8,3) N=29:(9,4) N=30:(10,5) N=31:(1,6) N=32:(2,7) N=33:(3,8) N=34:(4,9) N=35:(5,10) N=36:(6,11) N=37:(7,0) N=38:(8,1) N=39:(9,2) N=40:(10,3) N=41:(1,4) N=42:(2,5) N=43:(3,6) N=44:(4,7) N=45:(5,8) N=46:(6,9) N=47:(7,10) N=48:(8,11) N=49:(9,0) N=50:(10,1) N=51:(1,2) N=52:(2,3) N=53:(3,4) N=54:(4,5) N=55:(5,6) N=56:(6,7) N=57:(7,8) N=58:(8,9) N=59:(9,10) N=60:(10,11)

The `U-coordinate' of Millennial Bounds Origin (U,Z) on X-axis
 U=1 U=2 U=3 U=4 U=5 U=6 U=7 U=8 U=9 U=10 A B C D E F G H I J GAP EUT BIM DIM MOO GAI GEN SUN YAM QUI

The `Z-coordinate' of Millennial Bounds Origin (U,Z) on Y-axis
 Z=0 Z=1 Z=2 Z=3 Z=4 Z=5 Z=6 Z=7 Z=8 Z=9 Z=10 Z=11 A B C D E F G H I J K L CHI CHO YAN MOU SEN CHJ NGG MEI SAN YAU SHT HOI

Analysis of 60 Millennial Bounds Origins: Table #1
 A0:GAP-CHI B1:EUT-CHO C2:BIM-YAN D3:DIM-MOU E4:MOO-SEN F5:GAI-CHJ G6:GEN-NGG H7:SUN-MEI I8:YAM-SAN J9:QUI-YAU A10:GAP-SHT B11:EUT-HOI C0:BIM-CHI D1:DIM-CHO E2:MOO-YAN F3:GAI-MOU G4:GEN-SEN H5:SUN-CHJ I6:YAM-NGG J7:QUI-MEI A8:GAP-SAN B9:EUT-YAU C10:BIM-SHT D11:DIM-HOI E0:MOO-CHI F1:GAI-CHO G2:GEN-YAN H3:SUN-MOU I4:YAM-SEN J5:QUI-CHJ A6:GAP-NGG B7:EUT-MEI C8:BIM-SAN D9:DIM-YAU E10:MOO-SHT F11:GAI-HOI G0:GEN-CHI H1:SUN-CHO I2:YAM-YAN J3:QUI-MOU A4:GAP-SEN B5:EUT-CHJ C6:BIM-NGG D7:DIM-MEI E8:MOO-SAN F9:GAI-YAU G10:GEN-SHT H11:SUN-HOI I0:YAM-CHI J1:QUI-CHO A2:GAP-YAN B3:EUT-MOU C4:BIM-SEN D5:DIM-CHJ E6:MOO-NGG F7:GAI-MEI G8:GEN-SAN H9:SUN-YAU I10:YAM-SHT J11:QUI-HOI

Analysis of 60 Millennial Bounds Origins: Table #2
 1A:GAP-CHI 2B:EUT-CHO 3C:BIM-YAN 4D:DIM-MOU 5E:MOO-SEN 6F:GAI-CHJ 7G:GEN-NGG 8H:SUN-MEI 9I:YAM-SAN 10J:QUI-YAU 1K:GAP-SHT 2L:EUT-HOI 3A:BIM-CHI 4B:DIM-CHO 5C:MOO-YAN 6D:GAI-MOU 7E:GEN-SEN 8F:SUN-CHJ 9G:YAM-NGG 10H:QUI-MEI 1I:GAP-SAN 2J:EUT-YAU 3K:BIM-SHT 4L:DIM-HOI 5A:MOO-CHI 6B:GAI-CHO 7C:GEN-YAN 8D:SUN-MOU 9E:YAM-SEN 10F:QUI-CHJ 1G:GAP-NGG 2H:EUT-MEI 3I:BIM-SAN 4J:DIM-YAU 5K:MOO-SHT 6L:GAI-HOI 7A:GEN-CHI 8B:SUN-CHO 9C:YAM-YAN 10D:QUI-MOU 1E:GAP-SEN 2F:EUT-CHJ 3G:BIM-NGG 4H:DIM-MEI 5I:MOO-SAN 6J:GAI-YAU 7K:GEN-SHT 8L:SUN-HOI 9A:YAM-CHI 10B:QUI-CHO 1C:GAP-YAN 2D:EUT-MOU 3E:BIM-SEN 4F:DIM-CHJ 5G:MOO-NGG 6H:GAI-MEI 7I:GEN-SAN 8J:SUN-YAU 9K:YAM-SHT 10L:QUI-HOI

Analysis of 60 Millennial Bounds Origins: Table #3
 01: AA 02: BB 03: CC 04: DD 05: EE 06: FF 07: GG 08: HH 09: II 10: JJ 11: AK 12: BL 13: CA 14: DB 15: EC 16: FD 17: GE 18: HF 19: IG 20: JH 21: AI 22: BJ 23: CK 24: DL 25: EA 26: FB 27: GC 28: HD 29: IE 30: JF 31: AG 32: BH 33: CI 34: DJ 35: EK 36: FL 37: GA 38: HB 39: IC 40: JD 41: AE 42: BF 43: CG 44: DH 45: EI 46: FJ 47: GK 48: HL 49: IA 50: JB 51: AC 52: BD 53: CE 54: DF 55: EG 56: FH 57: GI 58: HJ 59: IK 60: JL

Analysis of 60 Millennial Bounds Origins: Table #4
 01:GAP-CHI 02:EUT-CHO 03:BIM-YAN 04:DIM-MOU 05:MOO-SEN 06:GAI-CHJ 07:GEN-NGG 08:SUN-MEI 09:YAM-SAN 10:QUI-YAU 11:GAP-SHT 12:EUT-HOI 13:BIM-CHI 14:DIM-CHO 15:MOO-YAN 16:GAI-MOU 17:GEN-SEN 18:SUN-CHJ 19:YAM-NGG 20:QUI-MEI 21:GAP-SAN 22:EUT-YAU 23:BIM-SHT 24:DIM-HOI 25:MOO-CHI 26:GAI-CHO 27:GEN-YAN 28:SUN-MOU 29:YAM-SEN 30:QUI-CHJ 31:GAP-NGG 32:EUT-MEI 33:BIM-SAN 34:DIM-YAU 35:MOO-SHT 36:GAI-HOI 37:GEN-CHI 38:SUN-CHO 39:YAM-YAN 40:QUI-MOU 41:GAP-SEN 42:EUT-CHJ 43:BIM-NGG 44:DIM-MEI 45:MOO-SAN 46:GAI-YAU 47:GEN-SHT 48:SUN-HOI 49:YAM-CHI 50:QUI-CHO 51:GAP-YAN 52:EUT-MOU 53:BIM-SEN 54:DIM-CHJ 55:MOO-NGG 56:GAI-MEI 57:GEN-SAN 58:SUN-YAU 59:YAM-SHT 60:QUI-HOI

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).
 Explanation `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. The 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). `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. Example 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).