I 96 ) 
« • 
The Area- KLM P is equal to the Flu- 
ent of^j/ or of^;J;j'but 
• ' *• . ' • /, i - - 
Cjy = ± -^yy J- £_ 
X ^X ' %X^X ^ 
« 
c 
« • 
i ^jy=(;yT ~p y + — r y'yU.c. 
|And confequently by finding the Fluents 
f. • 
KLM;P ~cy+ ~y^ -I ~yi y. L_j 4 See. 
2-X3 XX3X4^^‘ 
,J-f. 
* 
orKLMP = ^j; + — . i/'o. 
! r 2, a; xX3AT*' 2X3X4 at 
Theorem ’ publifhed by the learn- 
e Mr. Bernouilli in the Ltpji ^ , i.<> 94 . Jt fV 
now high Time to conclude, this long ^errert I bej? 
you may accept of it as 'a Proof of that Refpedl' and' 
tiireera with which " ' ^ ^ 
- . * * 
^ •*'. J • .— I . I ■ - ■ ; . J.. 'f 
- •- -j- i^~. 
r f ' 
■ xr - r 
I ami ' 
J: : . -rS I R ' 
\- f> ^ 
s • 
Tour moj Obedient^ 
MqP Humble Servant^ 
V X 
* f 
Colin Mac Laurin, 
