Show that if AB = BA, then (a) exp(A)exp(B)=exp(B)exp(A) (b) exp(A)B = B exp(A).

Let A,B be nxn real matrices. Show that AB and BA have the same characteristic polynomial.

Let A,B be nxn real matrices. Show that AB and BA have the same characteristic polynomial.

Define BA to be the set of all functions from A to B. Show that if...

Define BA to be the set of all functions from A to B. Show that if A and B are finite, then BA is finite

(a) If a and b are positive integers, then show that lcm(a, b) ≤ ab. (b)...

(a) If a and b are positive integers, then show that lcm(a, b) ≤ ab. (b) If a and b are positive integers, then show that lcm(a, b) is a multiple of gcd(a, b).

If A and B are matrices and the columns of AB are independent, show that the...

If A and B are matrices and the columns of AB are independent, show that the columns of B are independent.

Cross Over Design 1) Discuss an AB/BA cross-over design. Give cell means and expectations.

Cross Over Design 1) Discuss an AB/BA cross-over design. Give cell means and expectations.

Let matrices A,B∈Mn×n(R). Show that if A and B are each similar to some diagonal matrix,...

Let matrices A,B∈Mn×n(R). Show that if A and B are each similar to some diagonal matrix, and also have the same eigenvectors (but not necessarily the same eigenvalues), then  AB=BA.

Let A ∈ Rmxn, and B ∈ Rrxm. Show that BR(A) = R(BA), where BR(A) :=...

Let A ∈ Rmxn, and B ∈ Rrxm. Show that BR(A) = R(BA), where BR(A) := {Bz | z ∈ R(A)}, and use this result to show that BR(A) is a subspace of Rr.

(a)Show that the Bloch theorem may also be written as ψk(r+R) = exp(ik⋅R) ψk(r). (b) Show...

(a)Show that the Bloch theorem may also be written as ψk(r+R) = exp(ik⋅R) ψk(r). (b) Show that the tight binding wave function ψk(r) = ΣR exp(ik⋅R) ϕ(r–R) satisfies the Bloch theorem.

Assume A and B are two nonsingular square matrices. Prove that AB has the same eigenvalue...

Assume A and B are two nonsingular square matrices. Prove that AB has the same eigenvalue as BA.

Show, using m.g.f.’s that if ?1~Exp(?), ?2~Exp(?) and ?1 ⊥ ?2 ,then (?1 + ?2 )~Gamma...

Show, using m.g.f.’s that if ?1~Exp(?), ?2~Exp(?) and ?1 ⊥ ?2 ,then (?1 + ?2 )~Gamma (2, 1/? ). You may assume that the m.g.f. of a Gamma(?, ?) random variable is 1 (1−??)^? ,? < 1 /?