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Let \(f_{1 \mid 2}\left(x_{1} \mid x_{2}\right)=c_{1} x_{1} / x_{2}^{2}, 0

Short Answer

Expert verified
c1=2x2, c2=5, the joint pdf of X1 and X2 is 2x1x23, P(14<X1<12X2=58)=0.4375, and P(14<X1<12)=0.1302

Step by step solution

01

Determine the Constants c1 and c2

For any pdf, the integral over all possible values must equal 1. Thus, we set up the following integrals to find c1 and c2: 01c2x24dx2=1 Solving, we find that c2=5. For c1, we have 0x2c1x1x22dx1=1 which gives c1=2x2
02

Compute the Joint pdf of X1 and X2

The joint pdf of X1 and X2 can be obtained by multiplying the marginal pdf of X2 (which we have already found) with the conditional pdf of X1 (given X2=x2), so f1,2(x1,x2)=f12(x1x2)f2(x2)=2x1x23
03

Calculate \(P\left(\frac{1}{4}

We want to calculate this specific probability. Plug x2=58 into the pdf f12(x1x2), and then integrate from 14 to 12, so P(14<X1<12X2=58)=1/41/2f12(x1x2)dx1=0.4375
04

Calculate \(P\left(\frac{1}{4}

This probability can be calculated by integrating the joint pdf f1,2(x1,x2) over the appropriate region. Here the region is a strip from 14 to 12 in the x1 direction, bounded by x2=x1 and x2=1 in the x2 direction. So we obtain P(14<X1<12)=1/41/2x11f1,2(x1,x2)dx2dx1=0.1302

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