3.3. Are the following valid PMFs? If yes, find the constant k that makes it so....
What is the constant k that makes the following function a valid pdf? fX(x) = kx2(1-x)7 for 0 ≤ x ≤ 1, fX(x) = 0 otherwise
Please answer Problem 18 Problem 17 Find the constant k that makes the following functions PDFs. (a) p(x) = k sin x, 0 < x < a (b) p(x) = kx2(x - 1)2,0 < x < 1 (c) p(x) = kx(1 – x)}, 0 < x < 1 (d) p(x) = k, -1 < x <3 (e) p(x) = kx'e-3, x > 0 Problem 18 For the PDFs in Problem 17, compute the expectations, variances and standard deviations or their...
X and Y are jointly uniformly distributed and their joint PDF is given by: fX,Y(x,y) = {k , 0<=x<=4, 0 <=y <= 8 0 , otherwise } a.) find the value of k that makes the joint PDF valid b.) compute the probability P[(X-2)^2 + (Y-2)^2 < 4] c.) compute the probability P[Y > 0.5X + 5]
8 otherwise for some constant k. Find: a) the marginal distribution of Y; b) P(Z<}\Y = ). 8. The random variable X has a uniform distribution on (0,1). Given that X = 1, the random variable Y is binomial with parameters n = 5 and p = r. a) Find E(Y) and E(Y?). b) Find P(Y = y and a < X < = + dx). c) Find the density of X given Y = y. Do you recognize it?...
Find a constant k (in terms of a) so that the function fxx (x,y) = e-(x+u) 0 << oo and 0 < y <a and O elsewhere is a valid joint density function.
9) Find the average K for the following system: K = 3.3 m/d; b=20m Flow a K = 14.3 m/d; b=5 m
10) Find the average K for the following system: Flow Q K = 3.3 m/d; b=20m K = 14.3 m/d; b=5 m
(1) Suppose the following is the joint PMF of random variables X and Y P(X x,Y y) c(3x + y), x1,2, y 1,2 where c is an unknown constant a. What is the value of c that makes this a valid joint PMF? b. Find Cov(X, Y)
Let f(x,y)= K(x^2+y^2 ) in 0≤x≤1, 0≤y≤1. Determine the value of the constant K that makes f(x,y) a joint density function. (a) Find fx(x) (b) Find fy(y) (please answer (a) and (b))
2.14 Determine if the following DT systems are invertible. If yes, find the inverse systems (i) y[k](k 1)x [k 2]; : - |k x [m 2] (ii) y[k] m=0 S[k 2m] (iii) y[k]xk] m=-00 (iv) y[k]xk +2]2x[k1]- 6x[k]2x[k - 11xk - 2] (v) yk]2y[k 11yk 2]x [k]. 2.14 Determine if the following DT systems are invertible. If yes, find the inverse systems (i) y[k](k 1)x [k 2]; : - |k x [m 2] (ii) y[k] m=0 S[k 2m] (iii) y[k]xk]...