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Question

In a certain city only two newspapers A and B are published, it is known that 25% of the city population reads A and 20% reads B, while 8% reads both A and B. It is also known that 30% of those who read A but not B look into advertisements and 40% of those who read B but not A look into advertisements while 50% of those who read both A and B look into advertisements. If a person is chosen at random from the population, what is the percentage probability that he/she reads advertisements?

A
1391000
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B
77250
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C
4812000
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D
61500
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Solution

The correct option is A 1391000
Let P(A) and P(B) denote respectively the percentage of city population that reads newspapers A and B. Then,
P(A)=25100=14, P(B)=20100=15P(AB)=8100=225,P(A¯B)=P(A)P(AB)=14225=17100,P(¯AB)=P(B)P(AB)=15225=325
Let P(C) be the probability that a person picked at random reads advertisements.
P(C)=30% of P(A¯B)+40% of P(¯AB)+50% of P(AB)
[since, A¯B, ¯AB and AB are all mutually exclusive]
P(C)=310×17100+25×325+12×225=1391000

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