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Question

If A and B are two independent events such thatP(AB)=215 andP(AB)=16, the P(B) is


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Solution

Step 1: Use properties of independent events to generate equations.

Given,

P(AB)=215

P(AB)=16

It is given that A and B and are independent. Thus,

P(A'B)=P(A')×P(B)=[1-P(A)]×P(B)=215(i).

P(AB')=P(A)×P(B')=P(A)×[1-P(B)]=16(ii)

Upon subtracting (i) from (ii) we get,

P(A)-P(B)=16-215

P(A)-P(B)=130

P(A)=130+P(B). (iii)

Step 2: Substitute equation (iii) in equation (ii) and solve the resulting quadratic equation.

Substituting (iii) in (ii)we get,

130+P(B)·1-P(B)=16

-P(B)2-130P(B)+P(B)+130=16

P(B)2-2930P(B)+430=0

30P(B)2-29P(B)+4=0

This is a quadratic equation in P(B).

For a quadratic equation of the form ax2+bx+c=0 where a0, the roots of theequation are given as,

x=-b±b2-4ac2a

Using the above formula,

P(B)=-(-29)±(-29)2-4×30×42×30

P(B)=29±36160P(B)=29±1960

P(B)=45 or P(B)=16

Hence the value of P(B) is 45 or 16.


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