Prove Cayley-Hamilton Theorem for all matrices whose eigen values are distinct.

Prove the Cayley-Hamilton theorem for any n x n square matrix.

Prove the Cayley-Hamilton theorem for any n x n square matrix.

Suppose A is an orthogonal matrix. Show that |λ| = 1 for all eigen- values λ....

Suppose A is an orthogonal matrix. Show that |λ| = 1 for all eigen- values λ. (Hint: start off with an eigenvector and dot-product it with itself. Then cleverly insert A and At into the dot-product.) b) Suppose P is an orthogonal projection. Show that the only possible eigenvalues are 0 and 1. (Hint: start off with an eigenvector and write down the definition. Then apply P to both sides.) An n×n matrix B is symmetric if B = Bt....

The stochastic group Σ(2, ℝ) consists of all those matrices in GL(2, ℝ) whose column sums...

The stochastic group Σ(2, ℝ) consists of all those matrices in GL(2, ℝ) whose column sums are 1; that is, Σ(2, ℝ) consists of all the nonsingular matrices [a c] [b d] with a + b = 1 = c + d Prove that the product of two stochastic matrices is again stochastic, and that the inverse of a stochastic matrix is stochastic. [abstract algebra] NOTE: the [a c] and [b d] is supposed to be a 2x2 matrix with...

Show that the set Vof all 3 x 3 matrices with distinct entries also combination of...

Show that the set Vof all 3 x 3 matrices with distinct entries also combination of positive and negative numbers is a vector space if vector addition is defined to be matrix addition and vector scalar multiplication is defined to be matrix scalar multiplication

Assume all matrices are 3 × 3 prove that if two rows of A are interchanged...

Assume all matrices are 3 × 3 prove that if two rows of A are interchanged to produce B an upper triangular matrix, then det(A) = − det(B)

Use the Mean Value Theorem prove that sin x ≤ x for all x > 0

Use the Mean Value Theorem prove that sin x ≤ x for all x > 0

Prove that |U(n)| is even for all integers n ≥ 3. (use Lagrange’s Theorem)

Prove that |U(n)| is even for all integers n ≥ 3. (use Lagrange’s Theorem)

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace...

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace of M 2x2. I know that a diagonal matrix is a square of n x n matrix whose nondiagonal entries are zero, such as the n x n identity matrix. But could you explain every step of how to prove that this diagonal matrix is a subspace of M 2x2. Thanks.

Suppose X,Y are discrete random variables, each taking only two distinct values. Prove that if E(XY)=E(X)E(Y)...

Suppose X,Y are discrete random variables, each taking only two distinct values. Prove that if E(XY)=E(X)E(Y) then X,Y are independent (Be aware that you have to prove E(XY) =E(X)E(Y) -> X,Y independent and NOT the converse)

Prove: If A is an n × n symmetric matrix all of whose eigenvalues are nonnegative,...

Prove: If A is an n × n symmetric matrix all of whose eigenvalues are nonnegative, then xTAx ≥ 0 for all nonzero x in the vector space Rn.