6-66
ﻊﻳﺯﻮﺘﻟﺍﻭ ﺔﻘﺜﻟﺍ ﻞﺻﺎﻓ ،ﺭﺎﺒﺘﺧﻻﺍ ﺕﺎﺟﺮﺨﻣﻭ ﺕﻼﺧﺪﻣ ﺕﺎﺤﻠﻄﺼﻣ .8
.ﻊﻳﺯﻮﺘﻟﺍﻭ ﺔﻘﺜﻟﺍ ﻞﺻﺎﻓﻭ ﺕﺍﺭﺎﺒﺘﺧﻻﺍ ﻲﻓ ﺎﻬﻣﺪﺨﺘﺴﺗ ﻲﺘﻟﺍ ﺕﺎﺟﺮﺍﻭ ﺕﻼﺧﺪﳌﺍ ﺕﺎﺤﻠﻄﺼﻣ ﻲﻠﻳ ﺎﻣ ﲔﺒﻳ
ﺕﻼﺧﺪﳌﺍ ﺕﺎﺤﻠﻄﺼﻣ k
ﺕﺎﻧﺎﻴﺒﻟﺍ ﻉﻮﻧ .................................. Data
ﺩﺪﺤﻳ "
< μ
0
" ،ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "≠
μ
0
") ﻥﺎﻜﺴﻟﺍ ﻂﺳﻮﺘﻣ ﺔﻤﻴﻗ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ ............. (ﺔﻨﻴﻌﻟ Z ﺭﺎﺒﺘﺧﺍ-1) μ
(.ﻰﻠﻋﺍ ﺪﺣﺍﻭ – ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﲢ "
> μ
0
"
،ﻰﻧﺩﺃ ﺪﺣﺍﻭ-ﻞﻳﺫ ﺭﺎﺒﺘﺧﺍ
ﺩﺪﺤﻳ "
< μ
2
" ،ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
≠ μ
2
") ﻥﺎﻜﺴﻟﺍ ﻂﺳﻮﺘﻣ ﺔﻤﻴﻗ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ .......... (ﲔﺘﻨﻴﻌﻟ Z ﺭﺎﺒﺘﺧﺍ-2) μ
1
-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
> μ
2
" ،2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﻐﺻﺍ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ
(
2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﺒﻛﺍ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ
-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
< p
0
" ،ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
≠ p
0
") ﺔﻨﻴﻌﻟﺍ ﺔﺒﺴﻧ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ .......(ﺔﺒﺴﻨﻟ Z ﺭﺎﺒﺘﺧﺍ-1) Prop
(.ﻰﻠﻋﺍ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "> p
0
" ،ﻰﻧﺩﺍ ﺪﺣﺍﻭ
-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
< p
2
" ،ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ " ≠ p
2
") ﺔﻨﻴﻌﻟﺍ ﺔﺒﺴﻧ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ .........
(ﲔﺘﺒﺴﻨﻟ Z ﺭﺎﺒﺘﺧﺍ-2) p
1
ﺚﻴﺣ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
> p
2
" ،2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﻐﺻﺍ ﻲﻫ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ
(
2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﺒﻛﺍ ﻲﻫ 1 ﺔﻨﻴﻌﻟﺍ
ﺩﺪﺤﻳ "
< μ
0
" ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ
"
≠ μ
0
" ) ﻥﺎﻜﺴﻟﺍ ﻂﺳﻮﺘﻣ ﺔﻤﻴﻗ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ .............. (ﺔﻨﻴﻌﻟ t ﺭﺎﺒﺘﺧﺍ-1) μ
(ﻰﻠﻋﺍ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
> μ
0
" ،ﻰﻧﺩﺍ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ
ﺩﺪﺤﻳ "
< μ
2
" ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
≠ μ
2
") ﺔﻨﻴﻌﻟﺍ ﻂﺳﻮﺘﻣ ﺔﻤﻴﻗ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ ............. (ﺔﻨﻴﻌﻟ t ﺭﺎﺒﺘﺧﺍ-2) μ
1
ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
> μ
2
" ،2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﻐﺻﺍ ﻲﻫ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ
(2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﺒﻛﺍ ﻲﻫ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ-ﻑﺮﻃ
ﺪﺣﺍﻭ-ﻞﻳﺫ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
< 0" ،ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ " ≠ 0")
ρ
-ﺔﻤﻴﻘﻟﺍ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ ..(t ﺭﺎﺒﺘﺧﺍ LinearReg)
β
&
ρ
(ﻰﻠﻋﺍ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "> 0" ،ﻰﻧﺩﺃ
ﺩﺪﺤﻳ "
< σ
2
" ،ﲔﻓﺮﻃ ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "
≠ σ
2
") ﻥﺎﻜﺴﻠﻟ ﻱﺭﺎﻴﻌﳌﺍ ﻑﺍﺮﺤﻧﻻﺍ ﺭﺎﺒﺘﺧﺍ ﻁﻭﺮﺷ ........ (ﲔﺘﺒﺴﻨﻟ F ﺭﺎﺒﺘﺧﺍ-2) σ
1
ﺭﺎﺒﺘﺧﺍ ﺩﺪﺤﻳ "> σ
2
" ،2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﻐﺻﺍ ﻲﻫ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ-ﻑﺮﻃ ﺭﺎﺒﺘﺧﺍ
(
2 ﺔﻨﻴﻌﻟﺍ ﻦﻣ ﺮﺒﻛﺍ ﻲﻫ 1 ﺔﻨﻴﻌﻟﺍ ﺚﻴﺣ ﺪﺣﺍﻭ-ﻑﺮﻃ
ﺽﺮﺘﻔﳌﺍ ﻥﺎﻜﺴﻟﺍ ﻂﺳﻮﺘﻣ
......................................
μ
0
(σ
> 0) ﻥﺎﻜﺴﻠﻟ ﻱﺭﺎﻴﻌﳌﺍ ﻑﺍﺮﺤﻧﻻﺍ ........................................ σ
(σ
1
> 0) 1 ﺔﻨﻴﻌﻠﻟ ﻥﺎﻜﺴﻠﻟ ﻱﺭﺎﻴﻌﳌﺍ ﻑﺍﺮﺤﻧﻻﺍ ......................................
σ
1
(σ
2
> 0) 2 ﺔﻨﻴﻌﻠﻟ ﻥﺎﻜﺴﻠﻟ ﻱﺭﺎﻴﻌﳌﺍ ﻑﺍﺮﺤﻧﻻﺍ ......................................
σ
2
(
26 ﻰﻟﺍ 1 ﺔﻤﺋﺎﻗ) ﺕﺎﻧﺎﻴﺒﻛ ﺎﻬﺗﺎﻳﻮﺘﺤﻣ ﻡﺍﺪﺨﺘﺳﺍ ﺪﻳﺮﺗ ﻲﺘﻟﺍ ﺔﻤﺋﺎﻘﻟﺍ .................................... List
(
26 ﻰﻟﺍ 1 ﺔﻤﺋﺎﻗ) 1 ﺔﻨﻴﻌﻟﺍ ﺕﺎﻧﺎﻴﺒﻛ ﺎﻬﺗﺎﻳﻮﺘﺤﻣ ﻡﺍﺪﺨﺘﺳﺍ ﺪﻳﺮﺗ ﻲﺘﻟﺍ ﺔﻤﺋﺎﻘﻟﺍ .................................. List1
(
26 ﻰﻟﺍ 1 ﺔﻤﺋﺎﻗ) 2 ﺔﻨﻴﻌﻟﺍ ﺕﺎﻧﺎﻴﺒﻛ ﺎﻬﺗﺎﻳﻮﺘﺤﻣ ﻡﺍﺪﺨﺘﺳﺍ ﺪﻳﺮﺗ ﻲﺘﻟﺍ ﺔﻤﺋﺎﻘﻟﺍ ..................................List 2
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