Perfect competition in Q and L(Short Run), if P=200, Q=2L^(0.5)k^(0.25), w=10, r=10; Find values of Q,L...

A firm has the following production function: q=5LK^0.5+2L^2K-L^3K What is its short-run production function if capital...

A firm has the following production function: q=5LK^0.5+2L^2K-L^3K What is its short-run production function if capital is fixed at K=9? What are the firm’s marginal product of labour and average product of labour in the short run? Show that the firm’s elasticity of output with respect to labour in the short run is a function of marginal product of labour and average product of labour. Calculate the short-run elasticity of output with respect to labour

Suppose a firm’s long-run production function is given by Q=K^0.25 L^0.25 ,where K is measured in...

Suppose a firm’s long-run production function is given by Q=K^0.25 L^0.25 ,where K is measured in machine-hours per year and L is measured in hours of labor per year. The cost of capital (rental rate denoted by r) is $1200 per machine-hour and the cost of labor (wage rate denoted by w) is $12 per hour. Hint: if you don’t calculate the exponential terms (or keep all the decimals when you do), you will end up with nice numbers on...

The firms production function is: Q=2L^2/3 K^1/3 A) Suppose the firm wants to determine the cost...

The firms production function is: Q=2L^2/3 K^1/3 A) Suppose the firm wants to determine the cost minimizing combination for L and K for any given values of q, w, and r. Solve for the the firms factor demand functions for L and K (i.e. express the optimal quantity of L and K in terms of W, r and Q) B) Using these factor demand functions, solve for the firm's long run cost function.

Price taking firm with a P = $5 with the following production function Q = f(L,K)...

Price taking firm with a P = $5 with the following production function Q = f(L,K) = 20 x L^0.25 x K^0.5 w = $20 r = $10 What is the profit maximising input combination? With step by step working please

. 1 a) Calculate the corresponding cost function, c(w,r,q). ·q=(min(L,3K)).5 ·q=L-1/K b) Draw a representative isoquant...

. 1 a) Calculate the corresponding cost function, c(w,r,q). ·q=(min(L,3K)).5 ·q=L-1/K b) Draw a representative isoquant for q=12 ·Q=min(2L,(2(L+K))/3,2K)

For a firm with production function f(L,K)=√L+√K, find its cost function for arbitrary values of w...

For a firm with production function f(L,K)=√L+√K, find its cost function for arbitrary values of w and r. That is,find a formula for the cost of producing q units that includes q,and also w and r,as variables. Also find marginal and average cost,and draw a plot that shows both cost functions in the same graph.

For a firm with production function f(L,K)=√L+√K, find its cost function for arbitrary values of w...

For a firm with production function f(L,K)=√L+√K, find its cost function for arbitrary values of w and r. That is,find a formula for the cost of producing q units that includes q,and also w and r,as variables. Also find marginal and average cost,and draw a plot that shows both cost functions in the same graph.

FACTOR PRICES QUESTION Imagine firm Oracle is producing computers following production function q(L,K) =L^0.5 K^2. In...

FACTOR PRICES QUESTION Imagine firm Oracle is producing computers following production function q(L,K) =L^0.5 K^2. In the short run, capital is fixed at K¯ = 5. Oracle faces price p = 50 and can hire as many workers as it would like at a constant wage w = 25. A. Find equilibrium labor (L∗) and wages. B. What are Oracle’s profits at this equilibrium? C. Prove that this profit level is a global maximum.

q(L,K)=2LK=100; w=25; v=50; TC=500 i. find the cost-minimizing input combinations (L*,K*) ii Based on part i...

q(L,K)=2LK=100; w=25; v=50; TC=500 i. find the cost-minimizing input combinations (L*,K*) ii Based on part i grapg this cost minimization case iii. Now assume that w=30 and v=50. explain what happens to our isocost and (L*,K*) iv. Assume that w=25; v=50 repeat parts i and ii a. q(L,K)=2L+K=100 b. q(L,K)=min(2L,K)=100

2. Let A = {p, q, r, s}, B = {k, l, m, n}, and C...

2. Let A = {p, q, r, s}, B = {k, l, m, n}, and C = {u, v, w}, Define f : A→B by f(p) = m, f(q) = k, f(r) = l, and f(s) = n, and define g : B→C by g(k) = v, g(l) = w, g(m) = u, and g(n) = w. Also define h : A→C by h = g ◦ f. (a) Write out the values of h. (b) Why is it that...