C 301 J 
tsf that ratio taken as ufual, and then inftead of f 
and q patting n a and nb becaufe a = — and h 1 . 
(Vid. Art. r.) you will find to be 2 n multiplied by 
the feries — — - X 2’ + -~^z s I — x 
3* a “ S*- 4 «* 1 n 6 Xz ^ 
which logarithm when q is greater than />, and there- 
fore b greater than a has all its terms pof.tive, and fo 
much the greater as 2 is greater ; and therefore it is 
the logarithm of a ratio greater than that of equality, 
and which increafes as z increafes. 7 
_5- By Art. 3. Ft is to C/as 3 » is to 
V + zl? ~ And b >- Art. 4. 7/7V x i-rr^tis 
greater than 7 = 3 / x . 7/3 ?, and the ratio between 
them increafes as 2 increafes, if q is greater than 
p. Wherefore, upon this fuppofition, alfo F t- is 
greater than Cfi and the ratio^ between them ml 
creafes as ^ or A /-and ^/increafes, and confequently 
his will be true alfo concerning the -areas defcribed 
by them. as their equal abfcilfes ht and hf increafe. 
Wherefoi e, when q is greater than p, Dht F is 
greater than D^/ C,. and the ratio between them in- 
creafes as h f ~ h t increafes. 
6. Becaufe Ah is to Hh as p is to q, when a is 
greater than p H h is greater than A b. In H h thfre- 
fore taking b l equal to A h, by the preceding Art. 
fire part of the figure H Di which infills upon hi 
of H *rfi A - P h ’ and tlle ratio of 'hat part 
D bt Ftt n tPn ^ b£ Sre! “ er than ,he ratio «* 
DA/FtoDA/C. Confequently, much more (q- 
being greater, than p) the whole figure H D A is , 
greater c 
