Let X and Y be continuous random variables with joint density function f(x,y) = 2(x+y)/3.93 on the interval 0 1 i.e find P(X1). Enter your answer to three decimal places.

Let X and Y be continuous random<br>variables with joint density function<br>f(x,y) = 2(x+y)/3.93 on the interval 0 < y<br>< x < 3.9. Calculate the probability that<br>X < 2 and Y > 1 i.e find P(X<2, Y>1).<br>Enter your answer to three decimal<br>places.<br>

Extracted text: Let X and Y be continuous random variables with joint density function f(x,y) = 2(x+y)/3.93 on the interval 0 < y="">< x="">< 3.9.="" calculate="" the="" probability="" that="" x="">< 2="" and="" y=""> 1 i.e find P(X<2, y="">1). Enter your answer to three decimal places.

Jun 11, 2022

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Let X and Y be continuous random variables with joint density function f(x,y) = 2(x+y)/3.93 on the interval 0 1 i.e find P(X1). Enter your answer to three decimal places.

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