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Question
The probability of simultaneous occurrence of 2 events A & B is p. If the probability that exactly one of A, B occurs is q, then which of the following alternatives is INCORRECT?
The probability of simultaneous occurrence of 2 events A & B is p. If the probability that exactly one of A, B occurs is q, then which of the following alternatives is INCORRECT?
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Solution
The correct option is A P(¯¯¯¯A)+P(¯¯¯¯B)=2+2q−p
P(A∩B)=p and P(A)+P(B)−2P(A∩B)=q
⇒P(A)+P(B)−2p=q
⇒P(A)+P(B)=2p−q
⇒1−P(¯¯¯¯A)+1−P(¯¯¯¯B)=2p+q
⇒P(¯¯¯¯A)+P(¯¯¯¯B)=2−2p−q
So, alternative (b) is correct.
Now,
P{(A∩B)/(A∪B)}=P[(A∩B)∩(A∪B)]P(A∪B)
⇒P{(A∩B)/(A∪B)}=P(A∩B)P(A∪B)
⇒P{(A∩B)/(A∪B)}=P[(A∩B)P(A)+P(B)−P(A∩B)
⇒P{(A∩B)/(A∪B)}=P2p+q−p=pp+q
So, alternative (c) is correct.
Finally,
P(¯¯¯¯A∩¯¯¯¯B)=P(¯¯¯¯¯¯¯¯¯¯¯¯¯¯A∪B)=1−P(A∪B)
⇒P(¯¯¯¯A∩¯¯¯¯B)=1−[P(A)+P(B)−P(A∩B)]
⇒P(¯¯¯¯A∩¯¯¯¯B)=1−[2p+q−p]=1−p−q
So, alternative (d) is correct.
Hence, alternative (a) is incorrect.
P(A∩B)=p and P(A)+P(B)−2P(A∩B)=q
⇒P(A)+P(B)−2p=q
⇒P(A)+P(B)=2p−q
⇒1−P(¯¯¯¯A)+1−P(¯¯¯¯B)=2p+q
⇒P(¯¯¯¯A)+P(¯¯¯¯B)=2−2p−q
So, alternative (b) is correct.
Now,
P{(A∩B)/(A∪B)}=P[(A∩B)∩(A∪B)]P(A∪B)
⇒P{(A∩B)/(A∪B)}=P(A∩B)P(A∪B)
⇒P{(A∩B)/(A∪B)}=P[(A∩B)P(A)+P(B)−P(A∩B)
⇒P{(A∩B)/(A∪B)}=P2p+q−p=pp+q
So, alternative (c) is correct.
Finally,
P{(A∩B)/(A∪B)}=P[(A∩B)∩(A∪B)]P(A∪B)
⇒P{(A∩B)/(A∪B)}=P(A∩B)P(A∪B)
⇒P{(A∩B)/(A∪B)}=P[(A∩B)P(A)+P(B)−P(A∩B)
⇒P{(A∩B)/(A∪B)}=P2p+q−p=pp+q
So, alternative (c) is correct.
Finally,
P(¯¯¯¯A∩¯¯¯¯B)=P(¯¯¯¯¯¯¯¯¯¯¯¯¯¯A∪B)=1−P(A∪B)
⇒P(¯¯¯¯A∩¯¯¯¯B)=1−[P(A)+P(B)−P(A∩B)]
⇒P(¯¯¯¯A∩¯¯¯¯B)=1−[2p+q−p]=1−p−q
So, alternative (d) is correct.
Hence, alternative (a) is incorrect.
⇒P(¯¯¯¯A∩¯¯¯¯B)=1−[P(A)+P(B)−P(A∩B)]
⇒P(¯¯¯¯A∩¯¯¯¯B)=1−[2p+q−p]=1−p−q
So, alternative (d) is correct.
Hence, alternative (a) is incorrect.
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