Let X ~N(0,2) and U~U(-4,4). Which one is it? a) E[X] = E[U] b) Prob(N>0) =...

Let X ~N(0,2) and U~U(-4,4). Which are true? a) E[X] = E[U] b) Prob(N>0) = Prob(U>0)...

Let X ~N(0,2) and U~U(-4,4). Which are true? a) E[X] = E[U] b) Prob(N>0) = Prob(U>0) c) Prob(N>4) <Prob ( U>4) d) ??<?? e) Prob (U<5) = 9/8

Let X be a continuous random variable uniformly distributed on the interval (0,2). Find E( |X-μ|...

Let X be a continuous random variable uniformly distributed on the interval (0,2). Find E( |X-μ| ) A. 1/12 B. 1/4 C. 1/3 D. 1/2

Let x ∼ N(μ,σ) and z = x−μ/σ. Show that a. E{z} = 0 b. E{(z...

Let x ∼ N(μ,σ) and z = x−μ/σ. Show that a. E{z} = 0 b. E{(z − E{z})2} = 1.

Let random variable X ∼ U(0, 1). Let Y = a + bX, where a and...

Let random variable X ∼ U(0, 1). Let Y = a + bX, where a and b are constants. (a) Find the distribution of Y . (b) Find the mean and variance of Y . (c) Find a and b so that Y ∼ U(−1, 1). (d) Explain how to find a function (transformation), r(), so that W = r(X) has an exponential distribution with pdf f(w) = e^ −w, w > 0.

Let X be a not-random nxk Matrix. Let Y=Xbeta +u, with E(u)=0 a Vector beta is...

Let X be a not-random nxk Matrix. Let Y=Xbeta +u, with E(u)=0 a Vector beta is a true value if E(y)=Xbeta Show that two solutions beta1_hat and beta2_hat of the normal equations fulfill the following equation Xbeta1_hat=Xbeta2_hat if rank(X)=k, show that the normal equations have a unique solution Normal equations: XtXbeta=XtY

Let E be an n×n matrix, and letU= {xE:x∈Rn} (where x∈Rn is written as arow vector)....

Let E be an n×n matrix, and letU= {xE:x∈Rn} (where x∈Rn is written as arow vector). Show that the following are equivalent. (a) E^2 = E = E^T (T means transpose). (b) (u − uE) · (vE) = 0 for all u, v ∈ Rn. (c) projU(v) = vE for all v ∈ Rn.

Let U = Z+ ∪ { 0 }. Let R1 = { ( x, y )...

Let U = Z+ ∪ { 0 }. Let R1 = { ( x, y ) | x ≠ y } Let R2 = { ( x, y ) | x = y } Let R3 = { ( x, y ) | x ≥ y } Let R4 = { ( x, y ) | x ≤ y } Let R5 = { ( x, y ) | x > y } Let R6 = { ( x, y...

Let A, B, and C be sets in a universal set U. We are given n(U)...

Let A, B, and C be sets in a universal set U. We are given n(U) = 63, n(A) = 33, n(B) = 34, n(C) = 28, n(A ∩ B) = 15, n(A ∩ C) = 17, n(B ∩ C) = 14, n(A ∩ B ∩ CC) = 9. Find the following values. (a) n(AC ∩ B ∩ C) (b) n(A ∩ BC ∩ CC)

Let X and Y be jointly distributed random variables with means, E(X) = 1, E(Y) =...

Let X and Y be jointly distributed random variables with means, E(X) = 1, E(Y) = 0, variances, Var(X) = 4, Var(Y ) = 5, and covariance, Cov(X, Y ) = 2. Let U = 3X-Y +2 and W = 2X + Y . Obtain the following expectations: A.) Var(U): B.) Var(W): C. Cov(U,W): ans should be 29, 29, 21 but I need help showing how to solve.

Let X, Y ∼ U[0, 1], be independent and let Z = max{X, Y }. (a)...

Let X, Y ∼ U[0, 1], be independent and let Z = max{X, Y }. (a) (10 points) Calculate Pr[Z ≤ a]. (b) (10 points) Calculate the density function of Z. (c) (5 points) Calculate V ar(Z).