| Explanation | `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 clockwisely according to the sequence of zones. It moves to the next zone annually. For female, the `Small Bounds' spin anti-clockwisely 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 m=0. The `Sex code' of female is `F' and f=1. The `Sex Code' of transsexual is the original sex at birth. The `Sex Code' of hermaphrodite (H), people have neutral sex (N) or genderless (N) 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. The 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. `&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. |
| Example | 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'. |
