If {φ(t − k)}k∈Z is an orthonormal set, show that {φjk}k∈Z is also an orthonormal set...

Let G be an Abelian group. Let k ∈ Z be nonzero. Define φ : G...

Let G be an Abelian group. Let k ∈ Z be nonzero. Define φ : G → G by φ(x) = x^ k . (a) Prove that φ is a group homomorphism. (b) Assume that G is finite and |G| is relatively prime to k. Prove that Ker φ = {e}.

Let R be a ring. Show that the set Aut(R) = {φ : R → R|φ...

Let R be a ring. Show that the set Aut(R) = {φ : R → R|φ is a ring isomorphism} is a group with composition.

Enlarge the following set to linearly independent vectors to orthonormal bases of R^3 and R^4 {(1,1,1)^t,...

Enlarge the following set to linearly independent vectors to orthonormal bases of R^3 and R^4 {(1,1,1)^t, (1,1,2)^t} could you show me the process, please

Show that every orthonormal set in a Hilbert Space H is always linearly independent.

Show that every orthonormal set in a Hilbert Space H is always linearly independent.

from the properties of the Bloch functions, show that wannier functions form an orthonormal set.

from the properties of the Bloch functions, show that wannier functions form an orthonormal set.

Suppose φ : G → G′ is an isomorphism. (a) Prove that φ(Z(G)) = Z(G′). (b)...

Suppose φ : G → G′ is an isomorphism. (a) Prove that φ(Z(G)) = Z(G′). (b) Prove that |g| = |φ(g)| for all g ∈ G

Let free(φ) be the set of all variables that occur freely in φ. Define free(φ) formally...

Let free(φ) be the set of all variables that occur freely in φ. Define free(φ) formally by induction on terms and then on formulas.

Show that x(t) =c1cosωt+c2sinωt, (1) x(t) =Asin (ωt+φ), (2)   and x(t) =Bcos (ωt+ψ)   (3) are all...

Show that x(t) =c1cosωt+c2sinωt, (1) x(t) =Asin (ωt+φ), (2)   and x(t) =Bcos (ωt+ψ)   (3) are all solutions of the differential equation d2x(t)dt2+ω2x(t) = 0. Show that thethree solutions are identical. (Hint: Use the trigonometric identities sin (α+β) =sinαcosβ+ cosαsinβand cos (α+β) = cosαcosβ−sinαsinβto rewriteEqs. (2) and (3) in the form of Eq. (1). To get full marks, you need to show the connection between the three sets of parameters: (c1,c2), (A,φ), and (B,ψ).) From Quantum chemistry By McQuarrie

For the free surface elevation η = A cos(kx − ωt) and associated velocity potential φ...

For the free surface elevation η = A cos(kx − ωt) and associated velocity potential φ = B sin(kx − ωt) cosh k(z + H), use the linearized free surface boundary conditions ∂φ/∂z=∂η/∂t at z=0 ∂φ/∂t=−gη at z=0 to find: (a) The relationship between A and B. (b) The dispersion relationship.

1. Show that |z − w| ≤ |z − t| + |t − w| for all...

1. Show that |z − w| ≤ |z − t| + |t − w| for all z, w, t ∈ C. 2.Does every complex number have a multiplicative inverse? Explain 3.Give a geometric interpretation of the expression |z − w|, z, w ∈ C. 4.Give a lower bound for |z + w|. Show your result. 5.Explain how to compute the inverse of a nonzero complex number z geometrically. 6.Explain how to compute the conjugate of a complex number z geometrically....