Let S = {x : <a, x> = b} be a hyperplane in RN . Compute...

let A be a subset of Rn and let x be a point in Rn. Show...

let A be a subset of Rn and let x be a point in Rn. Show that x is a limit point of A if and only if every open ball about x contains a point of A that is not equal to x

Let S be a nonempty set in Rn, and its support function be σS = sup{...

Let S be a nonempty set in Rn, and its support function be σS = sup{ <x,z> : z ∈ S}. let conv(S) denote the convex hull of S. Show that σS (x)= σconv(S) (x), for all x ∈ Rn

Let A be an m×n matrix, x a vector in Rn, and b a vector in...

Let A be an m×n matrix, x a vector in Rn, and b a vector in Rm. Show that if x1 in Rn is a solution to Ax=b and x2 is a solution to Ax=⃗0, then x1 +x2 is a solution to Ax=b.

Let V be Rn with a basis B={b1,...,bn}; let W be Rn with the standard basis,...

Let V be Rn with a basis B={b1,...,bn}; let W be Rn with the standard basis, denoted here by epsilon; and consider the identity transformation I : V --> W, where I(x) = x. Find the matrix for I relative to B and epsilon. What was this matrix called in Section 4.4?

Let V be a subspace of Rn and let T : Rn → Rn be the...

Let V be a subspace of Rn and let T : Rn → Rn be the orthogonal projection onto V . Use geometric arguments to find all eigenvectors and eigenvalues of T . Is T diagonalisable?

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.

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...

Let F be a field and let a(x), b(x) be polynomials in F[x]. Let S be...

Let F be a field and let a(x), b(x) be polynomials in F[x]. Let S be the set of all linear combinations of a(x) and b(x). Let d(x) be the monic polynomial of smallest degree in S. Prove that d(x) divides a(x).

Let x be a vector in Rn written as a column, and define U = {Ax:A∈Mmn}....

Let x be a vector in Rn written as a column, and define U = {Ax:A∈Mmn}. Show that U is a subspace of Rm.

Let X ∼ Uniform([a, b]). a). Compute the cumulative distribution function (cdf) of X. b). Prove...

Let X ∼ Uniform([a, b]). a). Compute the cumulative distribution function (cdf) of X. b). Prove that E(X) = (a + b)/2.