Which pair of symmetry operations below do not commute? A) σv(xy),σv(x,y) B) S 3,σv C) C...

a) U = xy b) U = (xy)^1/3 c) U = min(x,y/2) d) U = 2x...

a) U = xy b) U = (xy)^1/3 c) U = min(x,y/2) d) U = 2x + 3y e) U = x^2 y^2 + xy 2. All homogeneous utility functions are homothetic. Are any of the above functions homothetic but not homogeneous? Show your work.

f_X,Y(x,y)=xy   0<=x<=1, 0<=y<=2 f_X(x)=2x   0<=x<=1,     f_Y(y)=y/2 0<=y<=2 choose the all correct things. a. E[X]=1/2 b. E[XY]=8/9 c. COV[X,Y]=1...

f_X,Y(x,y)=xy   0<=x<=1, 0<=y<=2 f_X(x)=2x   0<=x<=1,     f_Y(y)=y/2 0<=y<=2 choose the all correct things. a. E[X]=1/2 b. E[XY]=8/9 c. COV[X,Y]=1 d. correlation coefficiet =1

a = [-5, -3, 2] b = [1, -7, 9] c = [7, -2, -3] d...

a = [-5, -3, 2] b = [1, -7, 9] c = [7, -2, -3] d = [4, -1, -9, -3] e = [-2, -7, 5, -3] a. Find (d) (e) b. Find (3a) (7c) c. Find Pe --> d d. Find Pc --> a +2b ex. C = |x|(xy/xy) C = xy/|x| ex. P x --> y = Cux = C(xy/x) (1/|x|) (x) =( xy/yy)(y)

Let the random variable X and Y have the joint pmf f(x, y) = xy^2/c where...

Let the random variable X and Y have the joint pmf f(x, y) = xy^2/c where x = 1, 2, 3; y = 1, 2, x + y ≤ 4 , that is, (x, y) are {(1, 1),(1, 2),(2, 1),(2, 2),(3, 1)} . (a) Find c > 0 . (b) Find μX (c) Find μY (d) Find σ^2 X (e) Find σ^2 Y (f) Find Cov (X, Y ) (g) Find ρ , Corr (X, Y ) (h) Are X...

Verify that the function y=x^2+c/x^2 is a solution of the differential equation xy′+2y=4x^2, (x>0). b) Find...

Verify that the function y=x^2+c/x^2 is a solution of the differential equation xy′+2y=4x^2, (x>0). b) Find the value of c for which the solution satisfies the initial condition y(4)=3. c=

Consider F and C below. F(x, y, z) = yz i + xz j + (xy...

Consider F and C below. F(x, y, z) = yz i + xz j + (xy + 12z) k C is the line segment from (2, 0, −3) to (4, 6, 3) (a) Find a function f such that F = ∇f. f(x, y, z) =       (b) Use part (a) to evaluate    C ∇f · dr along the given curve C.

LetX,Ybe a pair of continuous random variables with joint density functionf(x,y) ={kxy,for 0≤x≤1 and 0≤y≤1,0otheriwse. (a)...

LetX,Ybe a pair of continuous random variables with joint density functionf(x,y) ={kxy,for 0≤x≤1 and 0≤y≤1,0otheriwse. (a) Findk. (4 pts.) (b) Find the marginal distribution ofX,fX(x). (4 pts.) (c) Find P(X >0.5). (4 pts.) (d) Find E(XY). (4 pts.) (e) Find Cov(X,Y). (4 pts.)

Evaluate ∮C(x^3+xy)dx+(cos(y)+x2)dy∮C(x^3+xy)dx+(cos(y)+x^2)dy where C is the positively oriented boundary of the region bounded by  C:0≤x^2+y^2≤16, x≥0,y≥0C:0≤x^2+y^2≤16,x≥0,y≥0

Evaluate ∮C(x^3+xy)dx+(cos(y)+x2)dy∮C(x^3+xy)dx+(cos(y)+x^2)dy where C is the positively oriented boundary of the region bounded by  C:0≤x^2+y^2≤16, x≥0,y≥0C:0≤x^2+y^2≤16,x≥0,y≥0

Consider F and C below. F(x, y, z) = yz i + xz j + (xy...

Consider F and C below. F(x, y, z) = yz i + xz j + (xy + 18z) k C is the line segment from (1, 0, −3) to (4, 4, 1) (a) Find a function f such that F = ∇f. f(x, y, z) = (b) Use part (a) to evaluate C ∇f · dr along the given curve C.

P{X=k}=c|k|for k =-2,-1,1,2 and Y=max(0,X) where max means maximum. Thus, max(0,-3)=0, and max(0,3)=3. Commute the following....

P{X=k}=c|k|for k =-2,-1,1,2 and Y=max(0,X) where max means maximum. Thus, max(0,-3)=0, and max(0,3)=3. Commute the following. a) E[X] b) E[max(0,X)] c) P{Y=0}