Let y ∼ MV N(µ, V ) be a n × 1 random vector and suppose...

Let A be an n × n matrix, v a column vector, and suppose {v, Av,...

Let A be an n × n matrix, v a column vector, and suppose {v, Av, . . . , An−1v} is linearly independent. Prove that if B is any matrix that commutes with A, then B is a polynomial in A.

Let X ~ N (1, 2^2) and Y ~ N (2, 2^2). Suppose that X and...

Let X ~ N (1, 2^2) and Y ~ N (2, 2^2). Suppose that X and Y are independent. Let U = X + Y and V = X ̶Y. Show that U and V are independent normal random variables. Find the distribution of each of them.

1. Let T be a linear transformation from vector spaces V to W. a. Suppose that...

1. Let T be a linear transformation from vector spaces V to W. a. Suppose that U is a subspace of V, and let T(U) be the set of all vectors w in W such that T(v) = w for some v in V. Show that T(U) is a subspace of W. b. Suppose that dimension of U is n. Show that the dimension of T(U) is less than or equal to n.

Let X and Y be independent N(0,1) RVs. Suppose U = (X+Y)/squareroot(2) and V = (X-Y)/squareroot(2)....

Let X and Y be independent N(0,1) RVs. Suppose U = (X+Y)/squareroot(2) and V = (X-Y)/squareroot(2). Please derive the joint distribution of (U, V ) by using the Jacobian matrix method.

Suppose V is a vector space over F, dim V = n, let T be a...

Suppose V is a vector space over F, dim V = n, let T be a linear transformation on V. 1. If T has an irreducible characterisctic polynomial over F, prove that {0} and V are the only T-invariant subspaces of V. 2. If the characteristic polynomial of T = g(t) h(t) for some polynomials g(t) and h(t) of degree < n , prove that V has a T-invariant subspace W such that 0 < dim W < n

Let T be a 1-1 linear transformation from a vector space V to a vector space...

Let T be a 1-1 linear transformation from a vector space V to a vector space W. If the vectors u, v and w are linearly independent in V, prove that T(u), T(v), T(w) are linearly independent in W

Suppose we have a vector space V of dimension n. Let R be a linearly independent...

Suppose we have a vector space V of dimension n. Let R be a linearly independent set with order n−2. Let S be a spanning set with order n+ 2. Outline a strategy to extend R to a basis for V. Outline a strategy to pare down S to a basis for V .

Let T(x,y,z) = (13x − 9y + 4z,6x + 5y − 3z) and v = (1,−2,1)....

Let T(x,y,z) = (13x − 9y + 4z,6x + 5y − 3z) and v = (1,−2,1). Find the standard matrix for the linear transformation T and use it to find the image of the vector v (that is, use it to find T(v)).

Let V be a vector space: d) Suppose that V is finite-dimensional, and let S be...

Let V be a vector space: d) Suppose that V is finite-dimensional, and let S be a set of inner products on V that is (when viewed as a subset of B(V)) linearly independent. Prove that S must be finite e) Exhibit an infinite linearly independent set of inner products on R(x), the vector space of all polynomials with real coefficients.

Let V and W be finite-dimensional vector spaces over F, and let φ : V →...

Let V and W be finite-dimensional vector spaces over F, and let φ : V → W be a linear transformation. Let dim(ker(φ)) = k, dim(V ) = n, and 0 < k < n. A basis of ker(φ), {v1, . . . , vk}, can be extended to a basis of V , {v1, . . . , vk, vk+1, . . . , vn}, for some vectors vk+1, . . . , vn ∈ V . Prove that...