2-34
.ak ﺔﻠﺴﻠﺴﻟ (
β
) ﺮﻴﺧﻷﺍ ﺢﻠﻄﺼﻤﻠﻟ ﻭ ak ﺔﻠﺴﻠﺴﻟ (
α
) ﻝﻭﻷﺍ ﺢﻠﻄﺼﻤﻠﻟ ﻂﻘﻓ ﺔﺤﻴﺤﺻ ﺩﺍﺪﻋﺃ ﻞﺧﺩﺃ •
.n
= 1 ﺎﻴﺋﺎﻘﻠﺗ ﺔﺒﺳﺎﳊﺍ ﻡﺪﺨﺘﺴﺘﺳ ،n ﺩﺪﲢ ﻢﻟ ﺍﺫﺇ .ﻖﻠﻐﻟﺍ ﺱﺍﻮﻗﺃﻭ n ﻝﺎﺧﺩﺇ ﻡﺪﻋ ﻦﻜﻤﳌﺍ ﻦﻣ •
،ﻻﺇ ﻭ
α
ﻝﻭﺃ ﺢﻠﻄﺼﻤﻛ ﻡﺪﺨﺘﺴﺗ ﻲﺘﻟﺍ ﺔﻤﻴﻘﻟﺍ ﻦﻣ ﺮﺒﻛﺃ ﻥﻮﻜﺗ
β
ﺮﺧﺁ ﺢﻠﻄﺼﻤﻛ ﻡﺪﺨﺘﺴﺗ ﻲﺘﻟﺍ ﺔﻤﻴﻘﻟﺍ ﻥﺃ ﺪﻛﺄﺗ •
.ﺄﻄﳋﺍ ﺙﺪﺤﻴﺴﻓ
.
A ﺡﺎﺘﻔﳌﺍ ﻰﻠﻋ ﻂﻐﺿﺍ (ﺔﺷﺎﺸﻟﺍ ﻰﻠﻋ ﺮﺷﺆﳌﺍ ﺮﻬﻈﻳ ﻻ ﺎﻤﻨﻴﺣ ﺩﺪﺤﻳ) ﺔﻳﺭﺎﳉﺍ Σ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ ﻞﻴﻄﻌﺘﻟ •
ﺮﻴﺒﻌﺗ ﻭ
RndFix ﻭ ﻞﺣ ﻭ ﻯﺮﻐﺼﻟﺍ/ﻯﺮﺒﻜﻟﺍ ﺔﻤﻴﻘﻟﺍﻭ Σ ﻭ ﻞﻣﺎﻜﺘﻟﺍﻭ ﻲﻌﻴﺑﺮﺘﻟﺍ ﻞﺿﺎﻔﺘﻟﺍ ﻭ ﻞﺿﺎﻔﺘﻟﺍ ﻡﺍﺪﺨﺘﺳﺍ ﻦﻜﳝ ﻻ •
.ﻲﻠﺿﺎﻔﺘﻟﺍ ﺏﺎﺴﳊﺍ
Σ ﺕﺎﺤﻠﻄﺼﻣ ﻞﺧﺍﺩ ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ
.ﺎﻫﺮﻴﻴﻐﺗ ﻦﻜﳝ ﻻ ﻭ
1 ﺔﻤﻴﻘﺑ ﺔﺘﺒﺜﻣ (n) ﻡﺎﺴﻗﻷﺍ ﲔﺑ ﺔﻓﺎﺴﳌﺍ ﻥﻮﻜﺗ ، ﺔﻴﺿﺎﻳﺮﻟﺍ ﺕﺎﺟﺮﺍ/ﺕﻼﺧﺪﳌﺍ ﻊﺿﻭ ﻲﻓ •
[OPTN]-[CALC]-[FMin]/[FMax] ﺔﻴﺑﺎﺴﳊﺍ ﺕﺎﻴﻠﻤﻌﻠﻟ ﺔﻤﻴﻗ ﻰﺼﻗﺃ/ﻰﻧﺩﻷ k
،ﺔﻴﻟﺎﺘﻟﺍ ﻝﺎﻜﺷﻷﺍ ﻡﺍﺪﺨﺘﺳﺎﺑ ﺔﻴﺑﺎﺴﳊﺍ ﺕﺎﻴﻠﻤﻌﻠﻟ ﺔﻤﻴﻗ ﻰﻧﺩﺃ/ﻰﺼﻗﺃ ﻝﺎﺧﺩﺇ ﻚﻨﻜﳝ ،ﺔﻔﻴﻇﻮﻟﺍ ﻞﻴﻠﲢ ﺔﻤﺋﺎﻗ ﺽﺮﻋ ﺪﻌﺑ
.
a < x < b ﻞﺻﺎﻔﻟﺍ ﻦﻤﺿ ﺔﻔﻴﻇﻮﻟﺍ ﻦﻣ ﻰﻧﺩﻷﺍ ﻭ ﻰﺼﻗﻷﺍ ﻞﳊﺍ ﻭ
ﺔﻤﻴﻗ ﻰﻧﺩﺃ u
K4(CALC)6(g)1(FMin) f
(x) , a , b , n )
((9 ﻰﻟﺍ 1 = n) ﺔﻗﺩ :n ،ﻞﺻﺎﻔﻟﺍ ﺔﻳﺎﻬﻧ ﺔﻄﻘﻧ :b ،ﻞﺻﺎﻔﻟﺍ ﺔﻳﺍﺪﺑ ﺔﻄﻘﻧ :a)
ﺔﻤﻴﻗ ﻰﺼﻗﺃ u
K4(CALC)6(g)2(FMax) f
(x), a , b , n )
((9 ﻰﻟﺍ 1 = n) ﺔﻗﺩ :n ،ﻞﺻﺎﻔﻟﺍ ﺔﻳﺎﻬﻧ ﺔﻄﻘﻧ :b ،ﻞﺻﺎﻔﻟﺍ ﺔﻳﺍﺪﺑ ﺔﻄﻘﻧ :a)
ﺔﻗﺩ ﻊﻣ ،b
= 3 ﺔﻳﺎﻬﻨﻟﺍ ﺔﻄﻘﻧ ﻭ a = 0 ﺔﻳﺍﺪﺒﻟﺍ ﺔﻄﻘﻨﺑ ﻞﺼ
ﹼ
ﻔﻳ ﻯﺬﻟﺍ ﻞﺻﺎﻔﻠﻟ ﺔﻤﻴﻗ ﻰﻧﺩﺃ ﺪﻳﺪﺤﺘﻟ ﻝﺎﺜﻣ
y
= x
2
– 4x + 9 ﺔﻔﻴﻇﻮﻠﻟ n = 6
.f
(x) ﻞﺧﺩﺃ
AK4(CALC)6(g)1(FMin)vx-ev+j,
.
a = 0, b = 3 ﻞﺻﺎﻔﻟﺍ ﻞﺧﺩﺃ
a,d,
.
n = 6 ﺔﻗﺪﻟﺍ ﻞﺧﺩﺃ
g)w
(
X, r, θ ﺍﺪﻋ ﺎﻣ Z ﻰﻟﺍ A) ﻯﺮﺧﻷﺍ ﺕﺍﺮﻴﻐﺘﳌﺍ ﻭ ،ﺕﺍﺭﺎﺒﻌﻟﺍ ﻲﻓ ﺮﻴﻐﺘﻤﻛ ﻂﻘﻓ X ﻡﺍﺪﺨﺘﺳﺍ ﻦﻜﳝ ،f(x) ﺔﻔﻴﻇﻮﻟﺍ ﻲﻓ •
.ﺔﻴﺑﺎﺴﳊﺍ ﺔﻴﻠﻤﻌﻟﺍ ﻝﻼﺧ ﺎﺘﻗﺆﻣ ﺮﻴﻐﺘﳌ ﲔﻌﺗ ﻲﺘﻟﺍ ﺔﻤﻴﻘﻟﺍ ﻖﻴﺒﻄﺗ ﻢﺘﻳ ﻭ ﺖﺑﺍﻮﺜﻛ ﺞﻟﺎﻌﺗ
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