Karl Pkarson and Egon S. Pearson 
151 
TABLE XV. 
Correlation of Stature in 1000 pairs, Father and Son. 
Stature of Father. 
1 
1 
00 
1 
00 
i 
1 
00 
■J! 
1 
I 
1 
?^ 
1 
1 
00 
1 
1 
5o 
'5 
1 
00 
e~ 
[ 
1 
^1 
=0 
"o 
1 
1 
"it) 
?^ 
00 
CO 
1 
1 
?^ 
00 
■o 
1 
1 
00 
1 
^° 
1 
1 
?^ 
00 
1 
1 
1 
oo 
Totals 
2 
1 
Gl"'875 — 
1 
3 
— 
1 
1 
— 
— 
— 
— ■ 
■ — 

6 
62" '87 5 — 
4 
4 
3 
1 
3 
2 
— 
1 
20 
63" -875 — 
1 

1 
5 
6 
5 
9 
2 
2 
1 
32 
64-"'875 — 
2 
3 
3 
5 
11 
11 
10 
17 
4 
1 
2 
1 
70 
65"-875— 
1 
1 
2 
6 
9 
10 
20 
17 
15 
7 
6 
94 
66"-875— 
1 
6 
4 
11 
24 
21 
28 
10 
12 
7 
4 
1 
129 
67"-875— 
2 
2 
7 
9 
20 
16 
33 
27 
26 
20 
13 
6 
— 


— 
181 
68" -87 5 — 
1 
1 
4 
1 
12 
13 
10 
22 
26 
24 
6 
2 
2 
1 
125 
69"-875 
* 
5 
11 
15 
18 
18 
23 
18 
13 
4 
4 
1 
1 
131 
70"-875 
2 
5 
13 
12 
12 
13 
8 
7 
3 
1 
80 
71"-875~ 
4 
7 
7 
9 
9 
9 
7 
3 
1 
57 
7^'-875— 
1 
■2 
13 
4 
2 
9 
1 
1 
1 
2 
36 
73"-875— 
1 
i 
4 
1 
5 
4 
3 
2 
21 
74"-875— 
2 
2 
1 
2 
1 
8 
75"-87r)— 
1 
1 
76''-875 
1 
1 
2 
77"-875 
1 
1 
1 
3 
78"-875~- 
1 
1 
Totals 
7 
6 
17 
3G 
63 
109 
111 
149 
139 
125 
109 
67 
34 
18 
7 1 
3 
0 
1000 • 
array for the same correlation coefficient, and we took for the value of that 
coefficient "5000, somewhat under the value found by either polychoric coefficient. 
Table XVI gives our results. It involved finding a new series of values for 
\'ss', but those for nss'/ngi,' have already been comj^uted under {h) in Table IV. The 
results are given in terms of inches. 
TABLE XVI. 
Columnar Means by Different Processes. 
s 
hg, X 
kg. X ffif 
Common base 
Each column 
its own ?• 
Each column 
for r=-50 
Each column 
assumed Normal 
1 
-5-8379 
-2-5881 
-2-6498 
-2-4809 
2' 
2 
-2-4292 
- 1 -3633 
- 1 -3531 
- 1 -4357 
3' 
3 
- -0678 
- -0276 
- -0176 
- -0701 
3' 
4 
+ 1 -5040 
+ -8138 
+ -8087 
+ -7632 
3' 
5 
+ 2-6133 
+ 1-1439 
+ 1-1511 
+ 1 -0866 
3' + 4' 
6 
+ 3-8462 
+ 2-1192 
+ 2-1122 
+ 2-1744 
4' + 5' 
7 
+ 6-0982 
+ 3-.3267 
+ 3-3194 
+ 3-1109 
5' 
