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 one is it? a) E[X] = E[U] b) Prob(N>0) =...

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

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 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.

Problem 3.2 Let H ∈ Rn×n be symmetric and idempotent, hence a projection matrix. Let x...

Problem 3.2 Let H ∈ Rn×n be symmetric and idempotent, hence a projection matrix. Let x ∼ N(0,In). (a) Let σ > 0 be a positive number. Find the distribution of σx. (b) Let u = Hx and v = (I −H)x and find the joint distribution of (u,v). 1 (c) Someone claims that u and v are independent. Is that true? (d) Let µ ∈ Im(H). Show that Hµ = µ. (e) Assume that 1 ∈ Im(H) and find...

(a) TRUE / FALSE If X is a random variable, then (E[X])^2 ≤ E[X^2]. (b) TRUE...

(a) TRUE / FALSE If X is a random variable, then (E[X])^2 ≤ E[X^2]. (b) TRUE / FALSE If Cov(X,Y) = 0, then X and Y are independent. (c) TRUE / FALSE If P(A) = 0.5 and P(B) = 0.5, then P(AB) = 0.25. (d) TRUE / FALSE There exist events A,B with P(A)not equal to 0 and P(B)not equal to 0 for which A and B are both independent and mutually exclusive. (e) TRUE / FALSE Var(X+Y) = Var(X)...

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 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 u, v, and w be vectors in Rn. Determine which of the following statements are...

Let u, v, and w be vectors in Rn. Determine which of the following statements are always true. (i) If ||u|| = 4, ||v|| = 5, and ?||u + v|| = 8, then u?·?v = 4. (ii) If ||u|| = 2 and ||v|| = 3, ?then |u?·?v| ? 5. (iii) The expression (v?·?w)u is both meaningful and defined. (A) (ii) and (iii) only (B) (ii) only (C) none of them (D) all of them (E) (i) only (F) (i) and...

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.