Probability (exactly one of A,B occurs) =95
P(A∩Bˉ)+P(Aˉ∩B)=95
P(A)−P(A∩B)+P(B)−P(A∩B)=95
Given, A and B are independent events.
So, P(A∩B)=P(A)P(B)
⇒P(A)+P(B)−2P(A)P(B)=95
⇒p+2p−4p2=95
⇒36p2−27p+5=0
⇒(12p−5)(3p−1)=0
p=31 or 125
Let A and B be independent events such that P(A)=p,P(B)=2p. The largest value of p, for which P (exactly one of A,B occurs)=95, is:
Held on 26 Aug 2021 · Verified 6 Jul 2026.
94
51
125
92
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