134
Anhang
[Kap. 6
E [<*«•;?'<*<']-y+-
E l d p' w dm n]
EW lli *<l=f+-
E i dm 'n] = $-+•••
E W, i dm n] = ^ Pi „ bi - m \ il+• • •
E[d< , <,o]=f+--
E W 2] = wIe!» + 2 Ki-Jei«!+• • • =
= i ^ 2 p i k W- m o 1 J 3_ [“! 1 - m ». J № - Ki - m « 1J 3 } + • ■ •
E \d Kiff d il[ , J = ^ p ( — 0 ] [y j — m», J —
- [«“> - m„, J 2 p, „ [*, ■—m 1 , J [», ■—m 0 „Jj+ • • ■ =
= i {DV- m i 10] 2 p l? ~ m o 1EF - [*i'— ro i 1 o'J [*»i 1 - TO o 1J 2 } +' 4 ' =
i
= ±\x-m 1 , 0 ]^ + ---
E‘ a /i0 = f
2" /(/ l)/*/_2|0‘ a 2IO 2^9{9~~ 1)^/ I <7 — 2^0 12 * " *
E = f{^2/|2!7 fy-l|p / i 2IO^Ö f /*/10 — 1 /^012
^ / Pf + 110 . U /-l |0 ^ g /*/1g —}-1 fylj-l + ^ /ö' /*/_i 10 /^/10-1 ^lll} 4
§ 4, 3., B. und C. Beachtet man, daß bei geradliniger Regres
sion von y in bezug auf X
m fi - m o] 1 = r i[ 1 l/^f 2 [*<- m i | J>
so erhält man
2 P< | K - ™i1 0 ] Ki - w o | if = ^ r i 11H10= N12 Yp 2 10 r l 11 r 310
’VT' r (i) n4 2 4
KKK^OiJ = #*0|2 r i|i r 4|0
2 Pi i 0<- ™i1 ol 2 Kl “ m 01 J = /^012 /^2; 0 r i 11 r 410
2 P» I [x-m 1, 0 ] K> - m o | J 8 = VP2! 0 f*! s 2 r i 11 r 410 •