Show that vg = c/n + c/λ * d(1/n) / d(1/λ)

1. Show that (λ µ) * = λ*µ* for all λ, µ ∈ C.

1. Show that (λ µ) * = λ*µ* for all λ, µ ∈ C.

Let Wn be a wheel with n vertices. Prove that P(Wn, λ) = λ(λ-2)^n + (-1)^n(λ-2).

Let Wn be a wheel with n vertices. Prove that P(Wn, λ) = λ(λ-2)^n + (-1)^n(λ-2).

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....

1. Show that if X is a Poisson random variable with parameter λ, then its variance...

1. Show that if X is a Poisson random variable with parameter λ, then its variance is λ 2.Show that if X is a Binomial random variable with parameters n and p, then the its variance is npq.

Question 1 (a) Determine Var(X) if X~Bin(n,p). (b) Determine Var(X) if X~Poi(λ). Question 2 (a) Show...

Question 1 (a) Determine Var(X) if X~Bin(n,p). (b) Determine Var(X) if X~Poi(λ). Question 2 (a) Show that the m.l.e of λ is the sample mean if the data is distributed according to Poi(λ). (b) Determine the m.l.e of σ if data is independently identically distributed normally.

Let X1, . . . , Xn be i.i.d from pmf f(x|λ) where f(x) = (e^(−λ)*(λ^x))/x!,...

Let X1, . . . , Xn be i.i.d from pmf f(x|λ) where f(x) = (e^(−λ)*(λ^x))/x!, λ > 0, x = 0, 1, 2 a) Find MoM (Method of Moments) estimator for λ b) Show that MoM estimator you found in (a) is minimal sufficient for λ c) Now we split the sample into two parts, X1, . . . , Xm and Xm+1, . . . , Xn. Show that ( Sum of Xi from 1 to m, Sum...

Define a relation on N x N by (a, b)R(c, d) iff ad=bc a. Show that...

Define a relation on N x N by (a, b)R(c, d) iff ad=bc a. Show that R is an equivalence relation. b. Find the equivalence class E(1, 2)

Let {Xn} be a sequence of random variables that follow a geometric distribution with parameter λ/n,...

Let {Xn} be a sequence of random variables that follow a geometric distribution with parameter λ/n, where n > λ > 0. Show that as n → ∞, Xn/n converges in distribution to an exponential distribution with rate λ.

For the hierarchical model Y |Λ ∼ Poisson(Λ) and Λ ∼ Gamma(α, β), find the marginal...

For the hierarchical model Y |Λ ∼ Poisson(Λ) and Λ ∼ Gamma(α, β), find the marginal distribution, mean, and variance of Y . Show that the marginal distribution of Y is a negative binomial if α is an integer. (b) Show that the three-stage model Y|N∼Binomial(N,p), N|Λ∼Poisson(Λ), andΛ∼Gamma(α,β) leads to the same marginal distribution of Y .

Suppose that N(t) is a λ=5-Poisson process. Calculate E[N(1)N(2)N(3)].

Suppose that N(t) is a λ=5-Poisson process. Calculate E[N(1)N(2)N(3)].