Karl Pearson and David Heron 
17!) 
Now combine b and c, h and i. Proceeding in the same way to rind the Yulean 
pseudo-ranks r, we have now for the following table : 
(B) 
CL 
b + c 
d 
Q 
f 
J 
if 
h + i 
J 
Totals 
(I 
40 
0 
0 
0 
0 
0 
0 
0 
40 
0 
0 
200 
0 
0 
10 
110 
40 
0 
360 
y 
0 
0 
0 
0 
10 
440 
120 
0 
570 
8 
0 
0 
0 
0 
10 
20 
0 
0 
30 
f 
0 
0 
20 
10 
0 
0 
0 
0 
30 
<T 
0 
120 
440 
10 
0 
0 
0 
0 
570 
n 
0 
40 
110 
10 
0 
0 
200 
0 
360 
6 
0 
0 
0 
0 
0 
0 
0 
40 
40 
Totals 
40 
360 
570 
30 
30 
570 
360 
40 
2000 
the value is positive and equal to + - 0050. 
Now club d and e, / and g, y and B, e and f together, and we have 
(C) 
a 
b + c 
d + e 
f+9 
h + i 
3 
Totals 
a 
40 
0 
0 
0 
0 
0 
40 
0 
200 
0 
120 
40 
0 
360 
r+s 
0 
0 
0 
480 
120 
0 
600 
<+{ 
0 
120 
480 
0 
0 
0 
600 
i 
0 
40 
120 
0 
200 
0 
360 
6 
0 
0 
0 
0 
0 
40 
40 
Totals 
40 
360 
600 
600 
360 
40 
2000 
The Yulean pseudo-ranks r is now + - 2562. 
Combine a and b + c, h + i and j, a and ft, rj and 9, and we find 
(D) 
a + b + c 
d+e 
f+9 
h+i+j 
Totals 
a + /3 
240 
0 
120 
40 
400 
y+5 
0 
0 
480 
120 
600 
*+£ 
120 
480 
0 
600 
v + e 
40 
120 
0 
240 
400 
Totals 
400 
600 
600 
400 
2000 
The Yulean now drops down to + "1429 ! 
Combine d + e and f+g, y + & and e + f to give 
(E) 
a + b + c 
d+e+f+g 
h + i+j 
Totals 
a+/3 
y+8+e+( 
r) + 6 
240 
120 
40 
120 
960 
120 
40 
120 
240 
400 
1200 
400 
Totals 
400 
1200 
400 
2000 
The Yulean is now + '5000. 
