t = t ∗ 1 ∗ 2, ∗ 3 ∗ K4 ∗ 5, | (2.3.2.8) | |
K | - | |
, K4- .
:
K4 = | A1∗4(1)+A2∗4(2)+A3∗4(3)+⋯+An∗4(n) | (2.3.2.9) | |
A1+A2+A3+⋯+An | |||
1, 2, - ,
, .;
4(1), 4(2), ⋯ 4(n)-
- 2.3.3
1000
d− = d− ∗ K4n | ||
(2.3.2.10) | ||
1000 |
( ) , ,
Kn4 , .. .
Kn4 , .
K4n = | A1∗K4(1)n+A2∗K4(2)n+A3∗K4(3)n+⋯+An∗K4(n)n | (2.3.2.11) | |
A1+A2+A3+⋯+An
n(), n(), ⋯ n()- -
4 1 4 2 4 n
2.3.3
(, -1, -2) 1000 , -. :
, | , | ∗ | ||||
tEO() = tEO() | ∗ 2 | ∗ 5 | ||||
t−1() = t−1() ∗ 2, ∗ 5, ∗ −1 | ||||||
t−2() = t−2() ∗ 2, ∗ 5, ∗ −2 | ||||||
t() = t() ∗ 1 ∗ 2, ∗ 3 ∗ K4 ∗ 5, | ||||||
d | ||||||
. -, , , .. :
|
|
d− = d− + d−
d−- 1000
( 20% d−()).