question with answers, show steps:
Given: fx,y(x,y)= (5/16)yx^2 for 0<y<x<2,
determine:
a) fx(x) by integrating y from 0 to x. Ans: fx(x)=(5/32)x^4 for
0<x<2
b) fy(y) by integrating x from y to 2 Ans:
fy(y)=(5/48)y(8-y^3) for y<x<2
c) Test for independence using Criterion b Ans: Fails-> Not
independent
question with answers, show steps: Given: fx,y(x,y)= (5/16)yx^2 for 0<y<x<2, determine: a) fx(x) by integrating y...
65 68 and for 71 please show steps. thank you
ans: 1 X+ yX 32 rudbyr 55) Determine a,b,c,d. (7x^8) (y^-6) (z6)] / [(2x^6) (y^-7) (z^-4)3 = a + x^5 + Y^* 32 rudbyr 8) Given two equations, #1 and 12. IS each one true x^2 + 2x + 3 and 2. Is each one true (1) or false (0)? #1) ----- -- - x + 2 + -- ; 2) ---- 1 y + y 2 32 rudbyr ....
1. given the joint p.d.f f (x,y)= 2, 0 <x <y <1. 2. show that fx (x)=2(1- x), 0 <x <1 and fy (y)=2y, 0 <y <1 3. show that p(3/4<y<7/8 I x=1/4)=1/6
A random variable Y is a function of random variable X, where y=x^3 and fx(x)=1 from 0 to 1 and =0 elsewhere. Determine fy(y). Ans: fy(y)=(1/3)y^(-2/3) for 0<y<1
4. The random variables X and Y have joint probability density function fx,y(x, ) given by: fx,y(x, y) 0, else (a) Find c. (b) Find fx(x) and fy (), the marginal probability density functions of X and Y, respectively (c) Find fxjy (xly), the conditional probability density function of X given Y. For your limits (which you should not forget!), put y between constant bounds and then give the limits for in terms of y. (d) Are X and Y...
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2 = 16-x-y for the given c-values c = 0, 1, 2, 3,4, 5 Sketch the level curves for the function
2 = 16-x-y for the given c-values c = 0, 1, 2, 3,4, 5 Sketch the level curves for the function
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0<x<2, 0<y<1 23. The joint pdf of X and Y is fx.y(x, y)= (region below). 3 0 otherwise a) Determine f(y) b) Determine fx, (x) c) Determine E[Yx] d) Determine E[X|y] 0 1 2 24. Suppose that the joint probability density function of the jointly continuous random variables X and Y is x on the given region fxy(x,y)= 11 10 otherwise Determine fyly) 1 _$6x 0<x< y1 25. Let X and Y be continuous random...
Let (X,Y) have joint pdf given by f(rw)-y <x, 0 < x < 1, | 0, 0.W., (a) Find the constant c. (b) Find fx (x) and fy(y) (c) For 0 < x < 1, find fy|x=r(y) and My X=r and oỉ x=x (d) Find Cov(X,Y). (e) Are X and Y independent? Explain why.
3) The joint density function of X and Ý is given by fx,y) = xex(ri)〉0, y >0 a. By just looking at f(x.y), say ifX and Y are independent or not. Explain. b. Find the conditional density of X, given Y-y. In other words, fy(xly). c. Find the conditional density of Ý, given X=x.
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Problem 3 (40 pts) Two random variables X and Y are jointly distributed, based on the equation JXY (1, Y) |xy (,y) = } : (1,Y) E D 10 (, y) &D (1) where D is the region illustrated below. 1. Find k. Answer: k = } 2. Find expressions for, and sketch, the marginal distributions fx(x) and fy(y) Answer: plomba 0<<1 1<r < 2 2 < < Sy() – 24,2 y...
1. Suppose that X and Y are random variables that can only take values in the intervals 0 X 2 and 0 Y 3 2. Suppose also that the joint cumulative distribution function (cdf) of X and Y, for 0 < 2 and 03 y 3 2, is as follows: Fy). 16 [5] (a) Determine the marginal cdf Fx(x) of X and the marginal cdf Fy () of Y [5] (b) Determine the joint probability density function (pdf) f(x, y)...