78
After some elementary calculations we find
b(p— n) i=» pie n —pi-»
By = = > dx ——b à {n — +) dx, + À dby; —
n e nu T n 4T
pedes h (p — n) i» ph i-n
"mmu dg: , > do; + = + dw, (321)
num n e pil
The corresponding weight number is
D (n — py i-p p p i-n
1 J hy \ #0; 1 |
Qnyn, == 9 Q x - e + 9 Qux = (n m L^ TIT
n^ i1 n^ i=p+1
p (n — py p? (n — p) 2 b (n — py i=p
of i Ls Y 2
T^ n? Q,by I n? Quy n? Quy = 0 [
2 bp? i=n h? (n—p?p p? h? (n — p)
b3 > |
F 9 Qu, — (n reid ) ET. 2 Qoo I~ 2 Quo m
n pil n n
2 h (n — pf» 2 hp? (n — p)
M uc Quy (322)
After substitution of the weight- and correlation numbers from (174),
(175), (178), (179), (181) and development of the terms of summation
we find
2 p (n — p)
On
(p (n p) 4- 2] (323)
Qn vR r
The corresponding standard error is then
my = So) Qryr, (324)
See diagram 17.
Also in this case there are some approximations in the final weight
number (323). The measurements in the control points and in arbitrary
points along the center line of the strip can be taken into account in
adding the weight number (317) to (323). For points along the edges
of the strip the corresponding weight number can easily be found.
Since the effect of these additional weight numbers usually can be
