Show, by explicit integration over r, θ, ϕ space, that Ψ_200 and Ψ_210 wavefunctions are normalized.

Evaluate, in spherical coordinates, the triple integral of f(ρ,θ,ϕ)=cosϕ, over the region 0≤θ≤2π, π/6≤ϕ≤π/2, 3≤ρ≤8. integral...

Evaluate, in spherical coordinates, the triple integral of f(ρ,θ,ϕ)=cosϕ, over the region 0≤θ≤2π, π/6≤ϕ≤π/2, 3≤ρ≤8. integral =

1. Suppose that ? is a finite dimensional vector space over R. Show that if ???(?...

1. Suppose that ? is a finite dimensional vector space over R. Show that if ???(? ) is odd, then every ? ∈ L(? ) has an eigenvalue. (Hint: use induction). (please provide a detailed proof) 2. Suppose that ? is a finite dimensional vector space over R and ? ∈ L(? ) has no eigenvalues. Prove that every ? -invariant subspace of ? has even dimension.

Show a program in R to show the change of delta t =0.1simple ruler integration and...

Show a program in R to show the change of delta t =0.1simple ruler integration and improved euler integration. It should show tabulation of time and compare the simple euler and improved euler integration.

Show that Acos(ω0t)+Bsin(ω0t)can be written in the form rsin(ω0t−θ).Determine r and θ in terms of A...

Show that Acos(ω0t)+Bsin(ω0t)can be written in the form rsin(ω0t−θ).Determine r and θ in terms of A and B. If Rcos(ω0t−δ)=rsin(ω0t−θ), determine the relationship among R, r, δ and θ. r=      tanθ=      R=      tanδ⋅tanθ=     

Give an example with a proof of an infinite-dimensional vector space over R

Give an example with a proof of an infinite-dimensional vector space over R

Let (X , X) be a measurable space. Show that f : X → R is...

Let (X , X) be a measurable space. Show that f : X → R is measurable if and only if {x ∈ X : f(x) > r} is measurable for every r ∈ Q.

Let V be a finite dimensional space over R, with a positive definite scalar product. Let...

Let V be a finite dimensional space over R, with a positive definite scalar product. Let P : V → V be a linear map such that P P = P . Assume that P T P = P P T . Show that P = P T .

3. (a) (2 marks) Consider R 3 over R. Show that the vectors (1, 2, 3)...

3. (a) Consider R 3 over R. Show that the vectors (1, 2, 3) and (3, 2, 1) are linearly independent. Explain why they do not form a basis for R 3 . (b) Consider R 2 over R. Show that the vectors (1, 2), (1, 3) and (1, 4) span R 2 . Explain why they do not form a basis for R 2 .

Let k∈R and⃗ u be a vector in a vector space. Show that if k⃗u =⃗...

Let k∈R and⃗ u be a vector in a vector space. Show that if k⃗u =⃗ 0 and k̸= 0, then⃗ u =⃗ 0. (Remark: This implies Theorem 4.1.1 (d): If k⃗u = ⃗0, then k = 0 or ⃗u = ⃗0.)

Let V be a finite dimensional vector space over R with an inner product 〈x, y〉...

Let V be a finite dimensional vector space over R with an inner product 〈x, y〉 ∈ R for x, y ∈ V . (a) (3points) Let λ∈R with λ>0. Show that 〈x,y〉′ = λ〈x,y〉, for x,y ∈ V, (b) (2 points) Let T : V → V be a linear operator, such that 〈T(x),T(y)〉 = 〈x,y〉, for all x,y ∈ V. Show that T is one-to-one. (c) (2 points) Recall that the norm of a vector x ∈ V...