Answer to Question #250596 in Microeconomics for tastic

Solution:

a.). Input demand for labor: L = F(w,r,p)

Input demand for Capital: K = F(w,r,p)

TC = wL + rK = 10L + 5K

TR = P "\\times" Q = 20(2L^0.6K^0.2)

Profit = PQ – wL – rK = 20(2L^0.6K^0.2) - 10L - 5K

b.). Profit = PQ – wL – rK = 20(2L^0.6K^0.2) - 10L - 5K

"\\frac{\\partial \\pi } {\\partial L} =" 24L^-0.4K^0.2 – 10 = 0        (a)

"\\frac{\\partial \\pi } {\\partial K} =" = 8L^0.6K^-0.8 – 5 = 0           (b)

Solve for equation (a) for L:

24L^-0.4K^0.2 = 10

L = 8.9K^0.5

Plug into equation (b):

8(8.9K^0.5)^0.6K^-0.8 = 5

29.7K^0.3K^-0.8 = 5

29.7K^-0.5 = 5

K = 35.28

Substitute to derive L:

L = 8.9K^0.5

L = 8.9(35.28^0.5) = 52.86

L = 52.86

Q = 2L^0.6K^0.2

Q = 2(52.86^0.6) (35.28^0.2) = 21.62 "\\times" 2.04 = 44.10

Q = 44

Derive Profit:

Profit = 20(44) – 10(52.86) – 5(35.28)

Profit = 880 – 528.6 – 176.4

Profit = 175