[ 563 ] 
vr 
— QJs 
VII 
q 
. IV II 
- h lSL _L h lQr 
Z 2.34 2... 3.4.5 
IV II 
vi _ 
£ 7 
*/— I 
<SV. 
+iLSr + 2L2, + . 
2.3 2.34.5 2.2.34.5.6’ 
&C. 
From whence (as well as from the theorems in. 
art. 8.) may the values of q t Q^, q] &c. be 
readily found, in terms of a. 
if- 
G being = x ~r ~z ~b &c. by art. 9. 
H = fluent of x xG is A ' A 
H *= fluent of-H 
V 3 vS „T 
4- + 4- + 4-» sv. 
1 -3 3"S 5-7 
.v 
A"* . A' 
4“ 
H = fluent of x iH = 
, . + — , &c. 
3-5 5-7 
L 
IV 
m HI c 
H =5 fluent of-H =. — r 
* ll -3 2 -5 z 3 2 -5 z -7 
&c. &c. & c . 
.*-3--s ^ FFT + sW 
. A 7 ( A 9 
i _ 2 . _ r) ^ C • 
5'-7*-9" 
Id. 
Moreover, G being — 2 Q^-f- — *-r If 
5 3 
"jr? by art. 11. we, by multiplying by xx, 
and taking the correct fluents, get H = ,v 2 Q—- q 
i b x z X b A 2 . b . , 11 . v~I .,-3 
+ r - + - — .v+i4-2S4-F_-f-l_ 
2 44 ^ ' I -3 i ‘ 35 s 
_ £ j 11 
+ —* S being put for the feries — . -f- 
s'-’ 
5-7 
1 
5 2 .' 
Vol. LI. 
&c. 
4 d 
Now, 
