Choice ii) the Distribution of Observations 
0 
1 
X* 
2;2j)-2 
1 
ma 
... 
... m^j, 
ms ... 
We 
TOio ... 
;2p-2 
fn2v 
*''^23)+4 ••. 
■ . • '^4j)-2 
?«6 
Wig 
m 
7)1 
2p 
2j)+2 
2p+i 
m 
2v 
m 
2}) -1-2 
P-l-4 
.(14). 
(6) The last two determinant ratios of (13) and (M) are identical, and when 
the numerator of the first fraction of (13) is indicated by S we therefore find 
»+2, J)+2 
1, J>+2, J)+2 
or as 8 is orthosymmetrical and therefore 
^1, 1 ■ ^))+2, J)+2 ^ S . J j,^2, 35+2 =-" S,%2, 1» 
2 _ _ K + 
2v'^!l 2V-1^U ~ TV • ^ ? • 
°1, l,"j)+2, J)+2, 1, 1 
Comparing 2p-2^]j and 2j)-io-;^, we see that they have the first determinant ratio 
in common and that when y stands for the numerator of the other fraction of 
2v-i^]i we have 
25,-1 ct;, - 2.p-2<^'„ =- - - 
3)+l, »+l 
y 
or again, since y is orthosymmetrical. 
22)-lO-,, — 2P-20'!'/ 
yi. 1 • Yp+i, 1, 1 
The general formula (11) hence for any Wa^+i = 0 takes the shape 
2 a2 f 1 1 
N [mo 
1 7tlo 
2 
X^ 
2 
1 
W?2 
m 
+ a;2 
1 TO2 
2 
^2 
w?.4 mg 
+ 
2p-2 
7nA 
7)1, 
m 
2p 
7iU 
7)ls 
.2P-2 
7)} A 
2p 
7n. 
2p+2 
'2p-2 
7)1. 
2p 
)))., 
7)li 
711 c 
2p 
m 
2p+2 
7)1 0. 
7)1. 
7)1 
7)ln 
7n<) 
7)1 
4P-2 
