KiRSTiNE Smith 
7 
from which we find 
0 
1 
1 
mo 
J"4 .. 
.... ma J, 
TOg .. 
.. 
0 ''^2j)+2 
*''2p+4 • 
mo 
ma 
m4 .... 
mo .... 
W4 
mg 
Wg .... 
tn2p 
*J*235+2 
m2p+4 — 
■ »hp 
N 
+ X2 
0 
] 
X* 
-j^23)-2 
1 
m,2 
Mi 
... 
... m.2p 
m,4 
m,, ... 
nig 
Ms 
mjo ... 
;2?)-2 
TO2J, 
m2p+2 
>H-2i)4 4 •■• 
■ • • ^4p-2 
m2 
m,j . . . 
... >/(2p 
m4 
mg ... 
mo 
mg 
mio ... 
. ■ • '"23)+4 
m2p+2 
*'^2j)+4 ••• 
.(13). 
For a function of the degree 2p — 1 we get the same determinant as in (12) 
except that it does not contain the row and column in which x^p is found. 
Hence we find 
0 
1 
X^ 
x" 
^2jj-2 
1 
Too 
771.2 
... 
... ■'»'2j)-2 
x^ 
m.2 
niQ ... 
... 7)12 J, 
mg 
■ TOg ... 
.2d-2 
Wo 
«2 
m4 .. 
''*''2d-2 
W2 
m4 
mg .. 
^22) 
m4 
mg 
Ms .. 
m22,_2 f^2Ti ''^2j)+2 "'42)-4 
