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標題:
stat problem
發問:
P(B)=0.6 P(A|B')=0.8 P(B|A')=0.7 how can I find the value of A ?? THX
最佳解答:
P(B)=0.6 P(A|B')=0.8 P(B|A')=0.7 how can I find the value of P(A) ?? THX Sol 自行畫圖 令 P(AB)=x,P(A-B)=y,P(B-A)=0.6-x 0.8=P(A|B’)=P(AB’)/P(B’)=P(B-A)/(1-P(B))=y/0.4 y=0.32 0.7=P(B|A’)=P(A’B)/P(A’)=P(B-A)/(1-x-y)=(0.6-x)/(0.68-x) 0.476-0.7x=0.6-x x=124/300 P(A)=x+y=124/300+0.32=11/15
Pr (B) = 0.6, hence, Pr (B') = 1 - Pr (B) = 0.4 Pr (A | B') = 0.8 Pr (B | A') = 0.7 Pr (B | A') = Pr (A' & B) / Pr (A') Pr (B | A') x Pr (A') / Pr (B) = Pr (A' & B) / Pr (B) = [Pr (B) - Pr (A & B)] / Pr (B) this is easily to be understand Pr (A' & B) = Pr (B) - Pr (A & B) with a Venn diagram Hence, Pr (A & B) = Pr (B) - Pr (A') x Pr (B | A') = Pr (B) - [1 - Pr (A)] x Pr (B | A') By the law of total probability, Pr (A) = Pr (A | B) x Pr (B) + Pr (A | B') x Pr (B') = {Pr (B) - [1 - Pr (A)] x Pr (B | A')} x Pr (B) + Pr (A | B') x [1 - Pr (B)] = [Pr (B)]2 - Pr (B | A') x Pr (B) + Pr (A | B') x [1 - Pr (B)] + Pr (A) x Pr (B | A') x Pr (B) Hence, P(A) = {[Pr (B)]2 - Pr (B | A') x Pr (B) + Pr (A | B') x [1 - Pr (B)]} / [Pr (B | A') x Pr (B)] = (0.62 - 0.7 x 0.6 + 0.8 x 0.4) / (1 - 0.7 x 0.6) = 0.26 / 0.58 = 13 / 29 = 0.4483 2010-03-02 14:34:33 補充: brianwwc1993 is wrong because P(A and B) is not equal to P(B)xP(A|B')
stat problem
發問:
P(B)=0.6 P(A|B')=0.8 P(B|A')=0.7 how can I find the value of A ?? THX
最佳解答:
P(B)=0.6 P(A|B')=0.8 P(B|A')=0.7 how can I find the value of P(A) ?? THX Sol 自行畫圖 令 P(AB)=x,P(A-B)=y,P(B-A)=0.6-x 0.8=P(A|B’)=P(AB’)/P(B’)=P(B-A)/(1-P(B))=y/0.4 y=0.32 0.7=P(B|A’)=P(A’B)/P(A’)=P(B-A)/(1-x-y)=(0.6-x)/(0.68-x) 0.476-0.7x=0.6-x x=124/300 P(A)=x+y=124/300+0.32=11/15
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其他解答:Pr (B) = 0.6, hence, Pr (B') = 1 - Pr (B) = 0.4 Pr (A | B') = 0.8 Pr (B | A') = 0.7 Pr (B | A') = Pr (A' & B) / Pr (A') Pr (B | A') x Pr (A') / Pr (B) = Pr (A' & B) / Pr (B) = [Pr (B) - Pr (A & B)] / Pr (B) this is easily to be understand Pr (A' & B) = Pr (B) - Pr (A & B) with a Venn diagram Hence, Pr (A & B) = Pr (B) - Pr (A') x Pr (B | A') = Pr (B) - [1 - Pr (A)] x Pr (B | A') By the law of total probability, Pr (A) = Pr (A | B) x Pr (B) + Pr (A | B') x Pr (B') = {Pr (B) - [1 - Pr (A)] x Pr (B | A')} x Pr (B) + Pr (A | B') x [1 - Pr (B)] = [Pr (B)]2 - Pr (B | A') x Pr (B) + Pr (A | B') x [1 - Pr (B)] + Pr (A) x Pr (B | A') x Pr (B) Hence, P(A) = {[Pr (B)]2 - Pr (B | A') x Pr (B) + Pr (A | B') x [1 - Pr (B)]} / [Pr (B | A') x Pr (B)] = (0.62 - 0.7 x 0.6 + 0.8 x 0.4) / (1 - 0.7 x 0.6) = 0.26 / 0.58 = 13 / 29 = 0.4483 2010-03-02 14:34:33 補充: brianwwc1993 is wrong because P(A and B) is not equal to P(B)xP(A|B')
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