5-3
(2) ﻂﻴﺴﺑ ﻲﻧﺎﻴﺑ ﻢﺳﺭ ﻢﺳﺭ ﺔﻴﻔﻴﻛ k
.ﺎﻬﻤﺳﺭ ﺪﻳﺮﺗ ﻲﺘﻟﺍ ﺔﻔﻴﻇﻮﻟﺍ ﺭﺎﻴﺘﺧﺍ ﻢﺛ ﻦﻣﻭ ﺓﺮﻛﺍﺬﻟﺍ ﻲﻓ ﺔﻔﻴﻇﻭ 20 ﻰﻟﺍ ﻞﺼﻳ ﺎﻣ ﻦﻳﺰﺨﺗ ﻚﻨﻜﳝ
.
Graph ﻲﻧﺎﻴﺒﻟﺍ ﻢﺳﺮﻟﺍ ﻊﺿﻭ ﻞﺧﺩﺃ ،ﺔﻴﺴﻴﺋﺮﻟﺍ ﺔﻤﺋﺎﻘﻟﺍ ﻦﻣ .1
.ﺎﻬﻤﺳﺭ ﺩﺍﺮﳌﺍ ﻲﻧﺎﻴﺒﻟﺍ ﻢﺳﺮﻟﺍ ﺔﻔﻴﻇﻭ ﻞﺧﺩﺃﻭ ﺔﻔﻴﻇﻮﻟﺍ ﻉﻮﻧ ﺩﺪﺣ .
2
ﺔﻴﺗﺭﺎﻜﻳﺪﻟﺍ ﺕﺎﻴﺛﺍﺪﺣﻹﺍ ﺮﻴﺒﻌﺗ :ﺔﻴﻟﺎﺘﻟﺍ ﺕﺍﺮﻴﺒﻌﺘﻟﺍ ﻉﺍﻮﻧﻷ ﻲﻧﺎﻴﺒﻟﺍ ﻢﺳﺮﻟﺍ ﻲﻓ
Graph ﻊﺿﻮﻟﺍ ﻡﺍﺪﺨﺘﺳﺍ ﻚﻨﻜﳝ
ﻭ ،(
X= f ( y )) ﺔﻴﺗﺭﺎﻜﻳﺪﻟﺍ ﺕﺎﻴﺛﺍﺪﺣﻹﺍ ﺮﻴﺒﻌﺗ ﻭ ، ﺔﻔﻴﻇﻮﻟﺍ ﻭ ،ﺔﻴﻄﻴﺳﻮﻟﺍ ﻭ ،ﺔﻴﺒﻄﻘﻟﺍ ﺕﺎﻴﺛﺍﺪﺣﻹﺍ ﺮﻴﺒﻌﺗ ﻭ ،(Y= f ( x ))
.ﺕﺎﻨﻳﺎﺒﺘﳌﺍ
(
Y=f(x) ﻉﻮﻧ) ﺔﻴﺗﺭﺎﻜﻳﺪﻟﺍ ﺕﺎﻴﺛﺍﺪﺣﻹﺍ ... 3(TYPE)1(Y=)
ﺔﻴﺗﺭﺎﻜﻳﺪﻟﺍ ﺕﺎﻴﺛﺍﺪﺣﻹﺍ
...................
2(r=)
ﺔﻴﻄﻴﺳﻮﻟﺍ ﺔﻔﻴﻇﻮﻟﺍ
...................
3(Param)
(
X=f(y) ﻉﻮﻧ) ﺔﻴﺗﺭﺎﻜﻳﺪﻟﺍ ﺕﺎﻴﺛﺍﺪﺣﻹﺍ
...................
4(X=)
5(CONVERT)
5('Y≤) ﻰﻟﺇ 1('Y=)
ﺔﻔﻴﻇﻮﻟﺍ ﻉﻮﻧ ﺮﻴﻐﻳ
.........................
6(g)5('X≤) ﻰﻟﺇ 6(g)1('X=)
ﺮﺴﻳﻷﺍ ﺐﻧﺎﳉﺍ ﻰﻠﻋ
Y ﺮﻴﻐﺘﳌﺍ
...................
6(g)4(Y≤) ﻰﻟﺇ 6(g)1(Y>)
ﺮﺴﻳﻷﺍ ﺐﻧﺎﳉﺍ ﻰﻠﻋ
X ﺮﻴﻐﺘﳌﺍ
...................
6(g)6(g)4(X≤) ﻰﻟﺇ 6(g)6(g)1(X>)
.ﺔﺑﻮﻠﻄﳌﺍ ﻒﺋﺎﻇﻮﻟﺍ ﻊﻴﻤﺟ ﻝﺎﺧﺩﻹ ﺏﻮﻠﻄﻣ ﻮﻫ ﺎﻤﻛ ﺕﺍﺮﻣ ﺓﺪﻋ ﺓﻮﻄﳋﺍ ﻩﺬﻫ ﺓﺩﺎﻋﺎﺑ ﻢﻗ
.(
5-13 ﺔﺤﻔﺻ ﺮﻈﻧﺍ)
ﹰ
ﺎﻴﻧﺎﻴﺑ ﺎﻬﻤﺳﺭ ﺪﻳﺮﺗ ﺓﺮﻛﺍﺬﻟﺍ ﻲﻓ ﺎﻬﻨﻳﺰﺨﺗ ﰎ ﻲﺘﻟﺍ ﻚﻠﺗ ﲔﺑ ﻦﻣ ﻒﺋﺎﻇﻮﻟﺍ ﻦﻣ ﻱﺃ ﺩﺪﲢ ﻥﺍ ﺐﺠﻳ ﻢﺛ
.ﺎﻴﻧﺎﻴﺑ ﺎﻤﺳﺭ ﻢﺳﺭﺍ .
3
ﻦﻣ
2 ﺓﻮﻄﳋﺍ ﻲﻓ 4(TOOL)1(STYLE) ﻰﻠﻋ ﻂﻐﻀﺗ ﺎﻣﺪﻨﻋ ﺮﻬﻈﺗ ﻲﺘﻟﺍ ﻒﺋﺎﻇﻮﻟﺍ ﺔﻤﺋﺎﻗ ﻡﺍﺪﺨﺘﺳﺍ ﻚﻨﻜﳝ •
.ﺔﻴﻧﺎﻴﺒﻟﺍ ﻡﻮﺳﺭ ﻝﺎﻨﻣ ﻞﻜﻟ ﺔﻴﻟﺎﺘﻟﺍ ﺔﻴﻄﳋﺍ ﺐﻴﻟﺎﺳﻻﺍ ﻦﻣ ﺪﺣﺍﻭ ﺭﺎﻴﺘﺧﻻ ﻩﻼﻋﺃ ﺕﺍﺀﺍﺮﺟﻹﺍ
(ﻲﻟﻭﺃ ﻲﺿﺍﺮﺘﻓﺍ )ﻲﻌﻴﺒﻃ ...
1( )
(ﻲﻌﻴﺒﻄﻟﺍ ﺔﻛﺎﻤﺴﻟﺍ ﻒﻌﺿ ) ﻚﻴﻤﺳ …
2( )
(ﺮﺴﻜﺘﻣ ﻒﻴﺜﻛ ) ﺮﺴﻜﺘﻣ …
3( )
(ﻂﻘﻨﻣ) ﻲﻄﻘﻧ …
4( )
(ﻲﻌﻴﺒﻄﻟﺍ ﺔﻓﺎﺜﻜﻟﺍ ﺚﻠﺛ ) ﻖﻴﻗﺭ …
5( )
ﲔﻗﺎﻄﻨﻟﺍ ﻦﻣ ﻱﺍ ﺪﻳﺪﺤﺘﻟ ﺔﺷﺎﺸﻟﺍ ﺕﺍﺩﺍﺪﻋﺇ ﻲﻓ "
Ineq Type" ﺩﺍﺪﻋﺍ ﻡﺍﺪﺨﺘﺳﺍ ﻚﻨﻜﳝ ،ﺕﺎﻨﻳﺎﺒﺘﳌﺍ ﻡﺎﻈﻧ ﻢﺳﺭ ﺪﻨﻋ •
.ﲔﺌﻴﻠﳌﺍ
ﻁﻭﺮﺷ ﻊﻴﻤﺟ ﺀﺎﻔﻴﺘﺳﺍ ﻢﺘﻳ ﺚﻴﺣ ﻦﻛﺎﻣﻷﺍ ﻂﻘﻓ ﻸﳝ ..
1(Intsect)
.ﺔﻣﻮﺳﺮﳌﺍ ﺕﺎﻨﻳﺎﺒﺘﳌﺍ
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