2. Marginal products, RTS, and elasticity of substitution: Consider the following production function: q=k *11/4 a....
4. Your production function is Q = LK. The wage for L is w and the rental rate for K is r. You need to produce Q units of output. (a) What is your total cost equation? (b) What is your output constraint? (c) Find the Marginal Rate of Technical Substitution (MRTS) for your production function. (d) In general (for any values of w and r), what relationship must hold between L and K at the cost minimizing bundle? (e)...
Derive the long-run cost function for the constant elasticity of substitution production function q = (Lρ + Kρ)d/ρ Please explain the math to this. I don't understand the derivation of this.
Suppose that a firm has a production function of the form q = f(k;l) = 2k2 + 312. Which of the following statements is true regarding the Marginal Rate of Technical Substitution (RTS = .)? MPk MP O a. The RTS depends only on the ratio O b. The RTS depends on both k and I and not only on the ratio O c. The RTS depends only on k Od. The RTS depends only on I
Suppose a firm produces an output level according to the simple production function: Q = 5 L K, which implies M P L = 5 K and M P K = 5 L. Further suppose a firm must pay labor (L) a wage rate (w) of $5 per unit, and the rental rate (r) on capital (K) is $25 per unit. A. Find the marginal rate of technical substitution. B. Write the equation for the isocost line. What is the...
1. Consider a firm that has the following CES production function: Q = f(L,K) = [aLP + bK°]!/p where p a. Derive the MRTS for this production function. Does this production function exhibit a diminishing MRTS? Justify using derivatives and in words. What does this imply about the shape of the corresponding isoquants? (10 points) b. What are the returns to scale for this production function? Show and explain. Explain what will happen to cost if the firm doubles its...
2) Consider the following production function for shirts: q=13/4K1/4, where L is worker-hours, and K is sewing machine-hours. The cost of one hour of labor L is w The cost of renting a sewing machine for one hour is r. What type of returns to scale does this production function have? a) b) Compute the marginal product of labor L and marginal product of capital K. What is the marginal rate of technical substitution of labor for capital .e. how...
Let q = L½k½ denote the production function for a firm making long-run decisions, that is K (capital) and L (labor) are now variable. a. Place k on the Y-axis and L on the X-axis and illustrate an isoquant when q=100.b. Derive an expression for the MRTS (the marginal rate of technical substitution) for any level of q.
2. Consider the following production function with two inputs X1 and X2. y = x1/2x2/4 a. Derive the equation for an isoquant (assuming X2 is on the y-axis). b. Derive the marginal product of input x1. c. Derive the marginal product of input x2. d. Derive the marginal rate pf technical substitution (MRTS).
Suppose that a firm has a production function ? = K^a ?^b , where a>0 and b>0. K is capital and L is labor. Assume the firm is a price taker and takes the prices of inputs, (r and w) as given. 1) Write down the firm’s cost minimization problem using a Lagrangean. 2) Solve for the optimal choses of L and K for given factor prices and output Q. 3) Now use these optimal choices in the objective function...
Solve for the elasticity of substitution for the following production function using calculus: y = ((a^p)+(b^p))^k/p