Find marshallian demand of x^1/2 + y^1/2

Find the expenditure function, the Hicksian demand functions, and the Marshallian demand functions corresponding to the...

Find the expenditure function, the Hicksian demand functions, and the Marshallian demand functions corresponding to the indirect utility function V(p, r) = (a1/p1 + a2/p2)r. Note p is a vector of prices p1 and p2.

Jane’s utility function has the following form: U(x,y)=x^2 +2xy The prices of x and y are...

Jane’s utility function has the following form: U(x,y)=x^2 +2xy The prices of x and y are px and py respectively. Jane’s income is I. (a) Find the Marshallian demands for x and y and the indirect utility function. (b) Without solving the cost minimization problem, recover the Hicksian demands for x and y and the expenditure function from the Marshallian demands and the indirect utility function. (c) Write down the Slutsky equation determining the effect of a change in px...

Suppose that a consumer has the utility function given by: U(x,y)= (x^a)*(y^b) With prices p^x, p^y...

Suppose that a consumer has the utility function given by: U(x,y)= (x^a)*(y^b) With prices p^x, p^y and the income M, and where a>0, b>0. a) Maximize this consumer's utility. Derive Marshallian demand for both goods. b) Show that at the optimum, the share of income spent on each good does not depend on prices or income. c) Show that the elasticity of Marshallian demand for x is constant. d) For good x, use your answers to b) the elasticities of...

Consider the following utility function: U = M in(X; Y ). (I) Find the income and...

Consider the following utility function: U = M in(X; Y ). (I) Find the income and substitution e§ects. (II) Draw the compensated and Marshallian demand curves.

Given U(q1, q2) = q12/3q21/3. Budget constraint Y = p1(q1) + p2q2. Solve for Marshallian demand...

Given U(q1, q2) = q12/3q21/3. Budget constraint Y = p1(q1) + p2q2. Solve for Marshallian demand and price.

Suppose f(x,y)=(1/8)(6-x-y) for 0<x<2 and 2<y<4. Find p(0.5 < X < 1) and p(2 < Y...

Suppose f(x,y)=(1/8)(6-x-y) for 0<x<2 and 2<y<4. Find p(0.5 < X < 1) and p(2 < Y < 3) Find p(Y<3|X=1) Find p(Y<3|0.5<X<1)

Find the derivative of the functions y=cot-1(1/x^2+1) y=(cos-1x)^2 y=tan-1(x^2sinx^3) y= In(1/1+x^2) y=(In(1+x^5))^2 y=(cos(x^2+1)^7

Find the derivative of the functions y=cot-1(1/x^2+1) y=(cos-1x)^2 y=tan-1(x^2sinx^3) y= In(1/1+x^2) y=(In(1+x^5))^2 y=(cos(x^2+1)^7

(1-x)y'' + xy' - y = 2(x-1)^2 e^(-x), 0 < x < 1 Find the general...

(1-x)y'' + xy' - y = 2(x-1)^2 e^(-x), 0 < x < 1 Find the general solution of the ODE

1- find the divergence of F(x,y,z) = <e^x(y),x^2(z),xyz> at (1,-1,3). 2- find the curl of F(x,y,z)=...

1- find the divergence of F(x,y,z) = <e^x(y),x^2(z),xyz> at (1,-1,3). 2- find the curl of F(x,y,z)= <xyz,y^2(z),x^2(y)z^3> at (0,-2,2)

U(X,Y) = 5X1/3Y2/3 PX =1->2 PY = 3 I = 120 (a) (30 marks) Find demand...

U(X,Y) = 5X1/3Y2/3 PX =1->2 PY = 3 I = 120 (a) Find demand functions X* and Y* (b) Find the initial optimum, A. (c) Find the final optimum, C. (d) Find the decomposition bundle, B (e) Fill in the blank X Y Income Effect Substitution Effect Total Effect