126 The Correlation Coefficient of a Polyclioric Table 
H = 
•482 
•4840 ± •0170 
A.P.E. 
•50346 ± -02094 ^ 
rn = 
•498 ± -02872 
(•0290) 
n" 
'e — 
•48594 ± -04918 
• 510 -4- -O^^IO 
/.0303'i 
•5050 ± ^0246 
-OUo ± -UoDUO 
/.riQO 1 \ 
(•UoZi ) 
'^w ~ 
•5045 ± ^0211 , 
'22 — 
•504 ± -03259 
(•0340) 
re = 
•5145 
Mean 
Individual 
dispersion 
dispersion 
%i 
•5031 
•4950 
%a 
•5057 
•4975 
•5045 
•4955 
•5058 
•4942 
I here insert as an illustration of the new method the constants required in 
finding for the above table, and the calculation of Si2-2i> Pn ^^^^ ^n> ^'^^ 
equations to find the C"s. 
Table A 
/ij ki 
Kk^ 
r 
•498 
•510 
•508 
•504 
h 
-•36381 
-■36381 
•84879 
•84879 
rh 
-•18118 
-■18554 
•43117 
•42779 
Eh 
■3733945 
■3733945 
•2782707 
•2782707 
k 
-■42615 
•69349 
-■42615 
■69349 
rk 
-■21222 
■35368 
-•21648 
•34952 
Ek 
•3643145 
■3136735 
•3643145 
•3136735 
h - rk 
-■15159 
-■71749 
1^06527 
•49927 
h-rk 
-■1748086 
-■8341218 
b236735 
•5780570 
h-rk 
E 
VI -r- 
•3928931 
■2817266 
■1856865 
•3375594 
^ h — rk 
B^dB-j— — 
VI -J-2 
•4306151 
■2021063 
■8919072 
•7183872 
k - rh 
-•24497 
•87903 
- ^85732 
•26570 
k - rh 
VT-T^ 
-■2824913 
1-021920 
-■9953132 
•3076287 
k - rh 
VI -f^ 
•3833377 
■2366676 
•2431048 
•3805048 
. ^ k-rh 
Vl -r2 
•3887835 
■8465906 
•1597920 
•6208174 
X- 
165^0602 
102^7353 
78^53720 
122^5923 
n 
-■1806014 
•0486969 
■0516992 
•3392046 
p 
90^44050 
128^8716 
111 9422 
383^0020 
Sirlx X:* 
•001812696 
■000692554 
■0006728030 
■0001333663 
■002265285 
■0003626002 
■0007349840 
S,JX:X: 
■002700292 
■0008662932 
SiJx.X: 
-002335123 
G: 
1 
•51333 
•3859 
-71892 
* The suffix : indicates that appropriate suffix is to be taken from the column. 
