WITH APPLICATION TO SPIIEPICAL HARMONIC ANALYSIS 
213 
Table II.—Values of 11^(2?). 
11; 2 >: 
0. 
0 
4. 
6. 
8. 
10. 
12, 
1 
1 
1 
'o 
_ 
_ 
— 
— 
--- 
3 
1 
2 
— 
— 
— 
— 
1 
7 
2 1. 
O' = 1 
A 
A 
*- 
1 
,Q 
A 2 
I P. 2 
A 2 P 
i 
5 
2 5 
2 0 
o U" 
9 
1 
1 ' 
1 1 
fi <5 
A P 
A 2 '.) 
1 P (5 
7 1 n 
"y 8' 
2 A li I 
“1 y 0 
— 
11 
1 
o o 
Tin 
7 I 5 
2 A :l I 
4 1 P 0 
t 1 P P 
:i 1 
o 8 8 
A A 1 
8 8 2 
A A 1 
2 5 2 
3 
o 
O 
— 9 
1 
■y 
— 
— 
— 
_ _ 
o 
T 1 
0 
0 
O 
1 
A 
(7—3 
7 
3 
J - 
5 
— jLl 
5 
I A :i 
ao 
— 
— 
() 
3 
o 7 
1 0 
r, 0 
I o» 0 
2 2 1 
1 A 
• 
2 8 
1 A 
2 8 
11 
3 
8 
2 1 
I n 7 
8 A 
.A 
7 
1 7 
?)' 
5 2 8 
2 i' 
.5 2 5 
2"8 ■ 
1 r> 
.-1 
1 
5 
5 
i 
4 
7 
4- 
2 8 
1 A 
0 
5 
5 
5 
1 U 
' ■ 
iC) 
11 
b 
9 
5 
*; 
2 A 1 
"2 8‘ 
1 A 5 
1 A" 
8 5 
2 8 
— 
11 
5 
1 0 
a' 
n 
8 A' 
I T 7 
2 1 
17 17 
2 1 O' 
5 2:3 
2 1 
5 2 5 
"O’ 0 ■ 
7 
7 
•2 
5 
J-i 
_ 1 
o 
1 
10 
— 
— 
II 
b 
9 
7 
- \ 
^02 
^ tT 
“ TT 
I 7 
2’ 8 
— 
11 
7 
0 
_ 111 p 
2 8 
1 2 7 
2 1 
p p 
“I A" 
_ 5 7 
i 
I P 
IV 
9 
9 
- I -1 
219 
4 r> 
2 8 
Ta 
1 
2 8 
rr = d 
11 
9 
_ 0 
JmJ 
2 0 5 
2 S 
H 5 
7 
“ "4^' 
A :i 
2 1 
-1 
<T=n 
11 
11 
n a 
7" 
0 5 
"2 8 
" 2T 
1 1 
1 A' 
— 1 
1 
6 4 
