6-25
(MSe) ﻊﻴﺑﺮﺘﻟﺍ ﻂﺳﻮﺘﻣ ﺄﻄﺧ ﻭ (r
2
) ﺪﻳﺪﺤﺘﻟﺍ ﻞﻣﺎﻌﻣ ﻭ،(r) ﻁﺎﺒﺗﺭﻻﺍ ﻞﻣﺎﻌﳌ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ u
ﹰ
ﺎﻀﻳﺍ ﺔﻴﻟﺎﺘﻟﺍ ﺕﻼﻣﺎﻌﳌﺍ ﺮﻬﻈﺗ ،ﺔﻴﻌﺟﺍﺮﺘﻟﺍ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ ﺔﺠﻴﺘﻧ ﺔﺷﺎﺸﻟﺍ ﻰﻠﻋ ﻊﺟﺍﺮﺘﻟﺍ ﺔﻐﻴﺻ ﺕﻼﻣﺎﻌﻣ ﺮﻬﻈﺗ ﺎﻣﺪﻌﺑ
.ﻊﺟﺍﺮﺘﻟﺍ ﺔﻐﻴﺻ ﻰﻠﻋ ﺽﺮﻌﻟﺍ ﺔﺷﺎﺷ ﻰﻠﻋ ﺮﻬﻈﺗ ﻲﺘﻟﺍ ﺕﻼﻣﺎﻌﳌﺍ ﺪﻤﺘﻌﺗ .ﺽﺮﻌﻟﺍ ﺔﺷﺎﺷ ﻰﻠﻋ
(
r) ﻁﺎﺒﺗﺭﻻﺍ ﺕﻼﻣﺎﻌﻣ
.ﺓﻮﻘﻟﺍ ﻊﺟﺍﺮﺘﻟ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ ﻭﺃ ،ﻲﺳﻷﺍ ﻊﺟﺍﺮﺘﻟﺍ ﻭﺃ ، ،ﻲﻣﺎﺘﻳﺭﺎﻏﻮﻠﻟﺍ ﻊﺟﺍﺮﺘﻟﺍ ﻭﺃ ،ﻲﻄﳋﺍ ﻊﺟﺍﺮﺘﻟﺍ :ﻲﻠﻳ ﺎﻣ ﺽﺮﻌﺑ ﻡﻮﻘﺗ
(
r
2
) ﺪﻳﺪﺤﺘﻟﺍ ﺕﻼﻣﺎﻌﻣ
،ﻲﺳﺃ ﻊﺟﺍﺮﺗ ﻭ ،ﻲﻣﺎﺘﻳﺭﺎﻏﻮﻟ ﻊﺟﺍﺮﺗ ،ﻲﻋﺎﺑﺭ ﻊﺟﺍﺮﺗ ﻭ ﻲﺒﻴﻌﻜﺗ ﻊﺟﺍﺮﺑ ﻭ ،ﻲﻌﻴﺑﺮﺗ ﻊﺟﺍﺮﺗﻭ ،ﻲﻄﺧ ﻊﺟﺍﺮﺗ :ﻲﻠﻳ ﺎﻣ ﺽﺮﻌﺑ ﻡﻮﻘﺗ
.ﺓﻮﻘﻟﺍ ﻊﺟﺍﺮﺘﻟ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ
(
MSe) ﻊﻴﺑﺮﺘﻟﺍ ﻂﺳﻮﺘﻣ ﺄﻄﺧ
.ﻂﺳﻮﺘﻣ-ﻂﺳﻮﺘﻣ ﺍﺪﻋ ﺎﻣ ﺔﻴﻌﺟﺍﺮﺘﻟﺍ ﺔﻴﺑﺎﺴﳊﺍ ﺕﺎﻴﻠﻤﻌﻟﺍ ﻦﻣ ﻱﺃ ﺽﺮﻌﺑ ﻡﻮﻘﺗ
ﻎﻴﺼﻟﺍ ﻡﺍﺪﺨﺘﺳﺎﺑ (MSe) ﻊﻴﺑﺮﺘﻟﺍ ﻂﺳﻮﺘﻣ ﺄﻄﺧ ﺏﺎﺴﺣ ﻢﺘﻳ ،ﺔﻴﻟﺎﺘﻟﺍ ﺔﻴﻌﺟﺍﺮﺘﻟﺍ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ ﻉﻮﻧ ﻰﻠﻋ ﺩﺎﻤﺘﻋﻻﺎﺑ
.ﺔﻴﻟﺎﺘﻟﺍ
...................... ( ax + b ) ﺔﻴﻄﺧ ﺔﻴﻌﺟﺍﺮﺗ •
...................... ( a + bx )
.................................. ﺔﻴﻌﻴﺑﺮﺗ ﺔﻴﻌﺟﺍﺮﺗ •
.................................ﺔﻴﺒﻴﻌﻜﺗ ﺔﻴﻌﺟﺍﺮﺗ •
....................................ﺔﻴﻋﺎﺑﺭ ﺔﻴﻌﺟﺍﺮﺗ •
.............................. ﺔﻴﻤﺘﻳﺭﺎﻏﻮﻟ ﺔﻴﻌﺟﺍﺮﺗ •
.......................... (
a · e
bx
) ﺔﻴﺳﺃ ﺔﻴﻌﺟﺍﺮﺗ •
.......................... (
a · b
x
)
Se =
Σ
1
n – 2
i=1
n
(y
i
– (ax
i
+ b))
2
Se =
Σ
1
n – 2
i=1
n
(yi – (a + bxi))
2
Se =
Σ
1
n – 3
i=1
n
(y
i
– (ax
i
+ bx
i
+ c))
2
2
Se =
Σ
1
n – 4
i=1
n
(y
i
– (ax
i
3
+ bx
i
+ cx
i
+ d ))
2
2
Se =
Σ
1
n – 5
i=1
n
(y
i
– (ax
i
4
+ bx
i
3
+ cx
i
+ dx
i
+ e))
2
2
Se =
Σ
1
n – 2
i=1
n
(y
i
– (a + b ln x
i
))
2
Se =
Σ
1
n – 2
i=1
n
(ln y
i
– (ln a + bx
i
))
2
Se =
Σ
1
n – 2
i=1
n
(ln yi – (ln a + (ln b) · xi ))
2
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