142 
PROFESSOR C. RIVER OR THE CORDUCTIOR 
(2) Letr=l, n 
(3) Let r=2, n 
(1) For r= 0, n 
12 4 182 
/c=-e— e u--^ ^ - 
3 135 1 3 5 .5.7 1 3 7 .5 3 .7 3 
T Q7W' 7 3 C “ • 
e e 
a 
91 
1 6 189 1 2.3 4 .5 2 .7 2 
e 2 1 
€ S + • • 
a,= 
3 120 2.3 3 .5.11 
1 
6 3 + . . . 
a.,= 
4.3 2 .5.7 
€ 3 + • • 
= 2, cq the leading term put equal to unity. 
i,, 11 ,_?1 « 21388 
J +2i e + 33 y 3 e 3s.75.11 6 + • • • 
_ e _1_ , . 
^ 14~ f- 3.7 3 .ll e "t" ' 1 ' 
fflo = 
re s + . . . 
3 504 '2.3.7 s .9.15 
a " = -ik e+ vh e ° + • ■ • 
4, leading term a. 2 put equal to unity, 
/, _ 90 ,39 77674 0 2805228 
1 i ~77 e i "5.7 3 .ll 3 .13 e 7 5 .11 5 .13.15 
•e 3 + 
Ctq = 
«4= 
1 1 1 2 , 
°° € i_ 7.11 3 .13 e ' r ' ' 
22 
1 
8 
«,= — T^r-e 
1144 
16 
1715 3.5.7 5 .11 
8 
' 2.7.11 3 .13.19 
e 3 + • • • 
€ 3 + 
:5 3 .7 3 ' 
_32_ 
'3 2 .5 3 .7 5 .11 
€ 3 + 
II. Let m= 1. 
1, leading term a 0 put equal to unity 
1 4 „ . 24 
k 2 ^~5 € 5 3 .7 e “*"5 5 .7.9' eJ 
+ 
_ _£_1_ o , _31_ 3 
ct i 1 n ' k 3 721 n n e 
10 3 75 1 5 3 .7 2 .10.11 
e 2 3 
a 0 = 
70 
2.5 3 .7.13 
d 5 + 
