32
33
In each section quantities are given for consecutive ages of the husband, and for every fifth ages of the wife.
Age of the wife younger than the youngest or older than the oldest age quoted in whichever section of Table Bis applicable in the circumstance of the case in question are lo be dealt with as if identical with the youngest and oldest age respectively as shown in the Tablo.
For the intermediate ages of wives, interpolate by exact fifths in the manner indicated in the example given for Table A in this section, but where to do so would give a figure of more than two decimal points, that figure shall be taken to its nearest hundredth part of a unit. Thus, the quantity found from the first section of Table B (age 55 next birthday) corresponding to the ages of a husband and wife aged respectively 40 and 33 next birthday is three-fifths of 4 added to 2.39, which gives 2.63.
For officers who commence to contribute al an earlier age than 20 next birthday the method of calculation given in the subjoined example is to be followed,
EXAMPLE (1)
An officer aged 17 next birthday, having a wife aged 17 next birthday, commences to contribute. Assume that the officer is aged 20 next birthday and apply the Brst section of Table B. The quantity thus found is 7.67 (Le. 7.23+ two-fifths of 1.1).
This officer receives an increment of salary at age 22 next birth- day, when his wife's age is also 22 next birthday. Assume that his age is 25 next birthday (ie, his actual age next birthday plus the difference between his actual age next birthday at date of commence- ment of contribution and the age of 20 next birthday, which in this Example is 3) On this assumption, the quantity found from the same section of Table I will be 6.44 (Le. 604 + two-fifths of l
EXAMPLE (2)
An officer aged 19 next birthday commences to contribute as a bachelor, and five years later, when aged 24 next birthday, merries, bis wife's age being 20 next birthday. The quantity found from Table A in accordance with mule 1(a) will be taken for the actual ages text birthday (husband 24 and wife 20) and will be 351. With respect to the current annual contribution al marriage, assume that the officer's age next birthday is 25 (Le. his actual age next birthday plus the difference between his actual age next birthday al date of commencement of contribution and the age of 20 next birthday, which in this Example is 1) so that the quantity found from the first section of Table B will be 6.04.
This officer receives an increment of salary when aged 39 next birthday, when his wife's age is 35 next birthday. Assume as befort that the ages next birthday are 40 and 35, so that the quandty found from the same section of Table I will be 2.79.
Note-It will be observed that the method given in the above two examples takes account of the actual number of years for which the annual contribution will run. In Example (D), when the officer receives the increment of salary at the age 22 next birthday be
has contributed for five years, so that at the expiration of 30 years from then his contribution will cease. Similarly, in Example (2), when the officer marries at age 24 next birthday, he also has con- tributed for five years, so that although he is two years older than the officer in Example (1) yet the unexpired period of contribulida is the same in each case. (If the wife's age were also the same in each of these two cases, no important error would be involved in using the same tabular quantity for the two cases).
TABLE C-The quantities are given for the same ages as in Table A. Ages of husbands and wives younger than the youngest or older than the oldest age quoted in the Table are to be dealt with as in using Table A.
For the intermediate ages of wives, interpolate by exact fifths, but where to do so would give a figure of more than two decimal points, that figure shall be taken to its nearest hundredth part of a unit. It must be noted, however, that in this Table an addition to the age of the wife results in a deduction from the quantity given in the Table.
EXAMPLE-
To find the quantity corresponding to the ages of a husband and wife aged respectively 37 and 29 next birthday-
The quantity for ages 37 and 25 next birthday given în the
Table is *****+++*•
4.58
The quantity for ages 37 and 30 next birthday given in the
Table is
4.08
So that the addition of five years to the age of the wife results in a deduction of .6 from the quantity given in the Table for ages 37 and 25 next birthday.
An addition of four years to the age of the wife accordingly results by proportion in a deduction of four-fifths of 6 from the quantity given in the Table for ages 37 and 25 next birthday.
Four-fifths of 6 48, which deducted from 4.68 Icaves 42. which is the required quantity corresponding to the ages 37 and 29 next birthday.
SECTION G-CONTRIBUTOR (EXCLUDING A CONTRIBUTOR WHO WAS A BACHELOR ON 30TH JUNE 1939) WHO COMMENCED TO CONTRIBUTE BEFORE. AND WAS STILL A CONTRIBUTOR ON, IST JULY 1959.
Note The registered pension of such an officer is to be calculated in two parts, namely, the part purchased by contributions which fell due on or before the 30th June 1959, and the part purchased by con- tributions Falling due on or after 1st day of July 1959, the first part on the Table in force on 30th June 1959 and the second part on the Tables in Part 1 of this Schedule, unless the registered pen- sion at the 30th June 1959 (calculated on the Table in force on 30th June 1959) exceeds the registered pension as calculated in two parts as stated in this Nole, in which case the former is to be