[ 56i ] 
It is manifeft, therefore, that 
Hyp. log. i 
i -f- * 
is = + b + + tl + £!, 
where, with refped: to the two figns prefixed to b, 
the fame obfervation may be made as in art. 3 . 
11 , 
Multiplying the laft equation by -, and taking the 
correct fluents, we have 
6 = 2 qj- — *-» — *_ 3 _ 9 , & c . 
From whence, by multiplying by -, and taking 
A* 
the fluents, we get 
11 n 
g = 2 qx4- 
b X 2 
_ +*- + 7 + 9 ’ 
Again, multiplying the laft equation by -, and 
taking the correct fluents, we find 
G = 2 Qd- QX 2 + ~ - *- 1 - - y, &c. 
And, by proceeding in the fame manner, we find 
IV 
IV 
*-s 
G = lQ x + 2 + + 
&C. 
&C. 
1 2. 
Now, it is obvious, that x 4- — 4- — , &c. the 
* 3 51 n 
value of G in art. 5 ?. muft be equal to 2 QJ- b X 
— x ~' — IF ~ V* & c ’ va * U€ ^ * n art ‘ 1 T * 
when both feries converge. 
There- 
