Page 140 - الرياضيات المتقدمة كتاب الطالب الصف 12 الفصل 2
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{Oz Gb Py3s b Æ kf b .&sb b Gb ^ Æ{j b {6 1.b d?Wb ç 2;N {j b X?cb f.[ gb zB y2b
d ±Ò ³C= ± Z ±Ò ` ³ºb ?: ±Ò ^0 : ± dg±b/4 ± R=5 : ± c9 E9 M± ` P P4 ± P b
,1Vfa yb Y U1Ne
Îb2 ± ¤^ CÕ=4= µP E9 M± ÑQ ` R= 8 ±Ò d4= 2 ± Z ¼b ± ϱP C C<9= : `8:
_94 ÌR5 : ± F b ±Ò ³«±R7 ± c9 ³»P7 ±Ò ÏP ± X5hÒ ^: ± ` ¼Ò ¹b b: ± E9 Ò dg±b/4 ± R=5 : ± ] ±»C< R ± ¤Ð C Õ 7 C F:94 »P0: ±
´±»C ±Ò E= ÒP ± ´±»C ± d E9 Û 0 : ± ´C »P ±Ò d6= b ± chR ±Ò ³P P ³»C< Continuous ^0 : ±
¢ ´C C= ± E b: : X b ± P Ô¹C ± û0 ±
C R= Ò «C Q ± random variable ¤P Ò ` C ±Ò d C ± ³P b ± R/
¤C< »P d ± d4= 2 ± Z ¼b ± VgC0 W4 ÎC: ± E C E ±¹ ˱R ±Ò E4 ±R ±
d C ± X b ± Îb ^ C: y Probability density d C ± X b ± E b: : Ô»C=4: ±
C< ÒP EjR ´¹±¼ d C ± X b ± ` _=7 ± F R ± C:9 y function CÕ R7 Ô»C=4: ± ˱R ±Ò ` C ± ² ´C C= ± `
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C< ÒP EjR FÛ9 d C ± X b ± ` _=7 ± ´P4 ± C:9 y E b;4 ÏC » ²R c ¯ H C; ±
d4= 2 ± c; ;: ±
zNy Fa vj&jfa q c> fa z r:Na 1yR fa ¢ Normal curve d C: ± Z ¼b ± ÑC ¹ ÎÒP ± `Û= _= D 8 Ô¹C ± û0 ±
Continuous random variable and the normal curve d4= 2 ± Z ¼b ± ¤½ ^06;: ± dg±b/4 ± R=5 :9 dg±b/4 ± R=5 : ± ³P b ± R/
¹±P M± E b: c9 E:= Ô Q ? ½ dg±b/4 ± R=5 :9 E;8:: ± _=7 ± F C ±º¯ Normal distribution ½ D Ò ^06;: ± E4 C ±
´C: ±
Õ
continuous Õ
0 C Õ =g±b/ ±R=5 R 4 ½ ÐA C<; E=gS E b: Ò E=7=7 ± Parameters T= C7: ± Í Í ½ a E794 : ±
.random variable ½ dg±b/4 ± R=5 : ± _= D ±
d4= 2 ± R=5 : ±
V Îb P Ð CÕ;8: T= º¯ Îb2 ± b ^0 : ± dg±b/4 ± R=5 : ± c9 E9 M± P Ô»C=4: ± Í E:= P Ò ²
¶
R := ; ²R c ¯ CÕ R7 a b d24 Ð `8: C;;8 Ò E= C; E P C Standard normal ½ ) D ±
Û
³R 6 ± `:h Z7 Îb2 ± Ð d;4 ±Q< _ c24: ± Îb2 ± ÐC ±º¯ Õ
:
ÎÐÖ variable ÎÐÕ
_ I Îb2 ± I E »C=4: ± ¦zNy Fa Ox2r a 40-i . fa
F C ±ºA Õ
0 CÕ=g±b/ ±ÕR=5 ^Û : ³¹b ± G P ^62 ± E9 ÐA ^ : C Ò Standardising C E R ` «S »±P7 ½C= CÕ C= ]= ¯ D92 a A E=:94 ± ÃÒR6 ± ` CÕÛ F »¹ ±º¯
³R 6 ± `:h Z7 a 9 Ð d;4 d< _ I ³¹b ± G P `Û=4 ^6 E9 ¼ E:=7 ± E »P ± E4= `8 C:< Ò C R= Ò _ Ò E C Ò E9 Ò ` ¼ ½C= »±P7: ± Ðb8 P
_ I E9 8 ± I Z-score d;4 E90 : ± R ¹C7: ± E4= 2 C ?2 ÀR4 E90 : ± R ¹C7: ± ½C= ÐA E R ±
½C=7 ± ´±Ò¹ d `:8 E P ± ÏP Ò ] º C; ÒC C:< E P C< C= c9 ³»P7 ± ÏP
R=5 : ± _= ` û9 d Ò E P ± ` E »¹ ²R M ^0 : ± dg±b/4 ± R=5 : ± _= c24
E= ±P0: ± ÏP ` ±Õ»±P7 C<= ¯ û=1 G= E R/ ± C; 4= d Ò E P : ±
¹P4 ± c24 Ð `8:= ³RgC2 ± ` c9 ` R C : ± ¹P C Q ±ºA ^06;: ± dg±b/4 ±
±Q8 Ò ^ E9 C E P N R: ± ` Ò ³R= 8 ± «C2 M± ` R E b ³R=50 ± «C2 M± Ðb8 P E= C E< `
ÐA ´C C=7 ± »±R8 P; Ò c ¹ Ò c9 «±b ´C C=79 R P7 «b C; P Ðb8 Ð
³R 6 ± c9 E=g±b/4 ± ´±R=5 : ± ` `=Ø b; ± ` ØQ< E;8:: ± _=7 ± E= ± ´C22 : ± ÀR4
ÀR 6 Ð C; \ ±Q R60 ± ` CÕ R ?2 ± ÎP4 Ðb8 Ò C Õ 14 C<14 d59 «C2 M±
¤² c ¯ ` ÎC : ±
«C2 M± ` CÕ R7 ÎC ´C C=7 ± ÎP4 Ð
ﻞﺼﺘﻣ ﻲﺋاﻮﺸﻋ ﺮﻴﻐﺘﻣ ﻞﺼﻔﻨﻣ ﻲﺋاﻮﺸﻋ ﺮﻴﻐﺘﻣ
_ P7 E P : ± E7 R2 ±Ò ^0 : ± dg±b/4 ± R=5 : ± ³R86 E P7 ³P b ± ÑQ ÛP4Ù
أ ب أ ب ÔQ ± b Ò ^0 : ± dg±b/4 ± R=5 : ± ` P ±Ò Ãb c9 S= R ± _ = a d C: ± Z ¼b ±
_=7 ± Z=: E C C;;8: ^06; dg±b/ × R=5 : d C: ± Z ¼b ± d Ð CÕ7 C F »¹ d4= 2 ± Z ¼b ± Z
E= C= ± ³P: MC X2 d Ò ÎÒP d Ðb8 C<; Û^8 R C;: ± ÎC: ±Ò E;8:: ± λC d C: M± dhC R ± _ C4 ± R/ ` C ± ÐR7 ± R ±Ò d d4= 2 ± Z ¼b ± û/ ± P7
`8: `8 Ò _=7 ± Z=: E C C;;8:
^0 dg±b/ R=5 : d C: ± Z ¼b ± d C ´±P C/: ± d ´C C=7 ± «C2 d a Î
Carl Friedrich Gauss ½ÒC U »P R
d R<3 d ± ´±R 6 ± ÑQ ´C: ±Ò ´±R ^8 c9 _=7 ± ^8 ^ C8 ± ÎC : ± E C R M± d X b ± ` E R7 ± _=7 ± Ð d `:8 d4= 2 ± Z ¼b ± VgC0 W4 E=896 ±
.Ô»±R8 ¶»P d Ò ÎÒP c; ;: ± ÐÒ ^ C< ÒP ¿R F j X b ± ` _=7 ± ´P4 ± C:9 a Ò C Õ = R
X b ± E:= Îb ^ C:
11-038 MOE book 33.indd 139 25/12/2023 4:36 PM
