Let {N(t), t ≥ 0} be a P P(λ). Compute P £ N(t) = k|N(t +...

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).

Let λ be a positive irrational real number. If n is a positive integer, choose by...

Let λ be a positive irrational real number. If n is a positive integer, choose by the Archimedean Property an integer k such that kλ ≤ n < (k + 1)λ. Let φ(n) = n − kλ. Prove that the set of all φ(n), n > 0, is dense in the interval [0, λ]. (Hint: Examine the proof of the density of the rationals in the reals.)

Let P0<tn-1<k=0.42 , and k>0 and n≥2 and n is an integer. Find the following: P-k<tn-1<k...

Let P0<tn-1<k=0.42 , and k>0 and n≥2 and n is an integer. Find the following: P-k<tn-1<k P-k<tn-1<0 Ptn-1<k

Let X be an exponential random variable with parameter λ > 0. Find the probabilities P(...

Let X be an exponential random variable with parameter λ > 0. Find the probabilities P( X > 2/ λ ) and P(| X − 1 /λ | < 2/ λ) .

Definition: Let p be a prime and 0 < n then the p-exponent of n, denoted...

Definition: Let p be a prime and 0 < n then the p-exponent of n, denoted ε(n, p) is the largest number k such that pk | n. Note: for p does not divide n we have ε(n,p) = 0 Notation: Let n ∈ N+ we denote the set {p : p is prime and p | n} by Pr(n). Observe that Pr(n) ⊆ {2, 3, . . . n} so that Pr(n) is finite. Problem: Let a, b be...

Let X be a Poisson random variable with parameter λ > 0. Determine a value of...

Let X be a Poisson random variable with parameter λ > 0. Determine a value of λk that maximizes P(X = k) for k ≥ 1.

Let T : P(R) → P(R) be the linear map defined by T(p(x)) = xp′(x) (you...

Let T : P(R) → P(R) be the linear map defined by T(p(x)) = xp′(x) (you may take it for granted that T is linear). Show that for each λ ∈ Z with λ ≥ 0, λ is an eigenvalue of T , and xλ is a corresponding eigenvector.

Let A be an n×n matrix. If there exists k > n such that A^k =0,then...

Let A be an n×n matrix. If there exists k > n such that A^k =0,then (a) prove that In − A is nonsingular, where In is the n × n identity matrix; (b) show that there exists r ≤ n such that A^r= 0.

Let A be a matrix with an eigenvalue λ that has an algebraic multiplicity of k,...

Let A be a matrix with an eigenvalue λ that has an algebraic multiplicity of k, but a geometric multiplicity of p < k, i.e. there are p linearly independent generalised eigenvectors of rank 1 associated with the eigenvalue λ, equivalently, the eigenspace of λ has a dimension of p. Show that the generalised eigenspace of rank 2 has at most dimension 2p.

Let {N1(t), t ≥ 0} and {N2(t), t ≥ 0} be two independent Poisson processes with...

Let {N1(t), t ≥ 0} and {N2(t), t ≥ 0} be two independent Poisson processes with rates λ1 and λ2, respectively. Define N(t) = N1(t) + N2(t). Use the definition to prove that {N(t), t ≥ 0} is a Poisson process with rate λ = λ1 + λ2.