Let x(k) = (0.7)ku(k), h(k) = (0.5)-ku(-k) Find the convolution y(k) of x(k) and h(k).

Let h(x,y)=k*x^2+6xy+14*y^2+4y+10. (a) Find the minimal value of the function h for k = 2. (b)...

Let h(x,y)=k*x^2+6xy+14*y^2+4y+10. (a) Find the minimal value of the function h for k = 2. (b) Using envelope theorem find approximate minimal value of h for k = 1.98.

Let X~GEOM(0.7). Let Y=e^2x. Find E[Y].

Let X~GEOM(0.7). Let Y=e^2x. Find E[Y].

Let X and Y have joint pdf f(x,y)=k(x+y), for 0<=x<=1 and 0<=y<=1. a) Find k. b)...

Let X and Y have joint pdf f(x,y)=k(x+y), for 0<=x<=1 and 0<=y<=1. a) Find k. b) Find the joint cumulative density function of (X,Y) c) Find the marginal pdf of X and Y. d) Find Pr[Y<X2] and Pr[X+Y>0.5]

Determine and explain the following properties of convolution for y[n] = x[n] ∗ h[n] a) If...

Determine and explain the following properties of convolution for y[n] = x[n] ∗ h[n] a) If x[n] is an even function and h[n] is an even function, is y[n] even,odd, or neither? b) If x[n] is an odd function and h[n] is an odd function, is y[n] even,odd, or neither? c) If x[n] is an even function and h[n] is an odd function, is y[n] even,odd, or neither?

Use Euler's Method to find the approximate value at x=0.5 with h=0.1 given y' = y...

Use Euler's Method to find the approximate value at x=0.5 with h=0.1 given y' = y (6 - xy) and y(0) = 1.4.

Given the signals x(t)=(t+1)[u(t+1)-u(t)]+(-t+1)[u(t)-u(t-1)] and h(t)=u(t+3)-u(t-3), find the convolution y(t)=x(t)•h(t):

Given the signals x(t)=(t+1)[u(t+1)-u(t)]+(-t+1)[u(t)-u(t-1)] and h(t)=u(t+3)-u(t-3), find the convolution y(t)=x(t)•h(t):

Let X be a random variable such that P(X=k) = k/10, for k = 1,2,3,4. Let...

Let X be a random variable such that P(X=k) = k/10, for k = 1,2,3,4. Let Y be a random variable with the same distribution as X. Suppose X and Y are independent. Find P(X+Y = k), for k = 2,...,8.

Let H, K be two groups and G = H × K. Let H = {(h,...

Let H, K be two groups and G = H × K. Let H = {(h, e) | h ∈ H}, where e is the identity in K. Show that G/H is isomorphic to K.

Let φ:G ——H be a group homomorphism and K=ker(φ). Assume that xK=yK. Prove that φ(x)=φ(y)

Let φ:G ——H be a group homomorphism and K=ker(φ). Assume that xK=yK. Prove that φ(x)=φ(y)

Let X~Geometric(1/3) and let Y=|X-5|. Find the range and PMF of Y. Starting with the equation...

Let X~Geometric(1/3) and let Y=|X-5|. Find the range and PMF of Y. Starting with the equation Px(X=k) = (1-p)^k-1 * p