546 Mr. Gompertz 07i the nature of the function 
-1 
1,05 
table for I gives a: = 62,41 for the corresponding age 
seek the logarithm of accommodated ratios for an unlimited 
term, corresponding to this for Carlisle, for the age 6,241, 
and we have T.9723, agreeing with the table given. 
Previously to concluding this chapter, I shall add a small 
table, which will be found very useful in the application of 
the methods here proposed. 
n 
Log. of 1,03 ^ 
Log. of i,o35~” 
Log. of 1,04"” 
Log. of 1,045-”^ 
Log. of 1,05“” 
I 
I. 9871628 
7.9850597 
7.9829667 
7.9808837 
7.9788107 
2 
T. 9743256 
1.9701193 
1-9659333 
7.9617674 
1.9576214 
3 
I .g6i4-88? 
1. 955 1 790 
I .9489000 
7.9426511 
1.9364321 
4 
T.g 4865 i I 
I .9402386 
7.9318666 
7.9235348 
I .9152428 
5 
T. 9358139 
7.9252983 
i- 9 H *333 
I .9044185 
1-8940535 
6 
T. 9229767 
I. 9103579 
1 .8978000 
7.8853023 
I .8728642 
7 
I. 9101394 
I .8954176 
7.8807666 
I .8661860 
I .8516749 
8 
1.8973022 
7.8804772 
7-8637333 
r. 8470697 
I .8304856 
9 
7.8844650 
7.8655369 
I . 8466999 
7-8279534 
1.8092963 
10 
7,8716278 
I .8505965 
7.8296666 
I . 8088371 
1 .7881070 
ft tv 
