3. Determine whether each of the following production functions below displays constant, increasing, or decreasing returns...
Determine whether each of the production functions below displays constant, increasing, or decreasing returns to scale: Q = K + L + KL Q = 2K2 + 3L2 Q = KL Q = min(3K, 2L)
Determine whether each of the production functions below displays constant, increasing, or decreasing returns to scale: Q = 10K0.75L0.25 Q = (K0.75L0.25)2 Q = K 0.75L0.75 Q = K 0.25L0.25 Q = K + L + KL Q = 2K2 + 3L2 Q = KL Q = min(3K, 2L)
5. Determine whether each of the following production functions displays constant, increasing, or decreasing returns to scale. Show workings. a) Q= 10K 0.75, 0.25 b) Q = 2K+ + 3L c) Q = (Kº75 0.25 2 d) Q=K+L+KL
For each of the following production functions, determine whether returns to scale are decreasing , constant, or increasing when capital and labor inputs are increased from K = L = 1 to K = L = 2 Q = 25K0.5 L0.5 Q = 2K + 3L + 4KL Q = 100 + 3K + 2L
Determine whether the following production functions exhibit constant, increasing, or decreasing returns to scale. L, K, and H are inputs and Q is the output in each production function. Initially, set each input = 100 and determine the output. Then increase each input by 2% and determine the corresponding output to see if constant, increasing, or decreasing returns to scale occur. (a) Q = 0.5L + 2K + 40H (b) Q = 3L + 10K +...
Briefly show whether the following production functions exhibit increasing, decreasing, or constant returns to scale: Y = K2/3 + L2/3 Y = min {2L+K, 2K+L} Y = 20*L1/5*K4/5
2) Determine whether the following production functions exhibit constant, increasing, or decreasing returns to scale (or none of these) a) Y=K+L^1/3 b) Y= aln(L) + bIn(k)
1. Below are production functions that turn capital (K) and labor (L) into output. For each of the production functions below, state and PROVE whether it is Constant/Increasing/or Decreasing Returns to scale. That is, you want to see how production changes when you increase all inputs (KL) by a factor of a, where a > 1: (3 points each) (a) F(K.L) = (b) F(KL)= min (4K, 2L + 20 (c) F(K,L) = 5K+ 10L
) Show whether each of the following production functions exhibits increasing, constant, or decreasing returns to scale in ? and ?. (Assume A is a factor of production). a. (1pt) ? = ?^1/3(L^2/3) +A b. (1pt) ? = ?^1/3(L^2/3) - A
State for each of the following production functions whether it has increasing, or decreasing, or constant returns to scale (pick one for each). Show how you got your answer for each one of them. (i) Q = 3K3/5L2/5 (ii) Q = 12K2+5L2 (iii)Q = 8K+5L (iv) Q = 0.7(K0.4L0.9) (v) Q = min{4K,9L}