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A firm has production function y = f(x1, x2) = x 1^1/3 x 2 ^2/3 , where y is the amount of output, x1, x2 are the amount of input 1 and 2 respectively.

(a) Suppose the firms chooses to produce with inputs x1^0 , x2^0 . Calculate the marginal product with respect to input 1 and input 2. (Express them in terms of x1^0 , x2^0 .)
(b) What’s the firm’s technical rate of substitution given input level x1^0 , x2^0 ?
(c) Suppose the prices for input 1 and input 2 are are respectively w1 = 8, w2 = 2. The market price for the output is p = 50. In order to produce a fixed level of output y 0 = 8, what’s the optimal amount of each input that the firm chooses to use for production?

User Volatilevar
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2 Answers

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13 votes

Final answer:

The marginal products are found by taking the partial derivatives of the production function with respect to each input. The technical rate of substitution is the ratio of the marginal products. Optimal input levels would be determined by minimization of total cost while satisfying the production function, which is beyond the scope of this explanation.

Step-by-step explanation:

Calculating the Marginal Product and Technical Rate of Substitution

The production function of the firm is given by y = f(x₁, x₂) = x₁1/3 x₂2/3. To find the marginal products for inputs 1 and 2 at the input levels x₁0 and x₂0, we take the partial derivatives of the production function with respect to x₁ and x₂. The marginal product of input 1 (MP1) is the derivative of y with respect to x₁, which is (1/3)x₁-2/3 x₂2/3. Similarly, the marginal product of input 2 (MP2) is (2/3)x₁1/3 x₂-1/3.


Finding the Firm's Technical Rate of Substitution

The technical rate of substitution (TRS) for inputs x₁ and x₂ is the ratio of the marginal product of input 1 to the marginal product of input 2. Thus, TRS = MP1 / MP2, which simplifies to (1/2) x₂₀ / x₁₀ given the input levels x₁₀ and x₂₀.


Determining the Optimal Input Levels for Production

To produce a fixed output level of y0 = 8 with input prices w1 = 8 and w2 = 2, and market price p = 50, the firm must choose input amounts to minimize total cost while satisfying the production function. This is typically done using cost minimization with respect to input constraints which requires advanced calculus or linear programming.

User Mohana B C
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21 votes
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Answer: B

po yata ayan po yata yung sagot ?

User Sglessard
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