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![Question 2
Show that the Cobb – Douglas production function f(x,,x,)= Ax“x , with
0 < a, B <1 and a + B<1 is strictly concave for x, > 0, x, > 0.
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- Let y = f(x1, x2)=x11/2 + x1x2 be a firm’s production function, where x1≥0, x2≥0. Write down the firm’s production possibility set, and its input requirement set. Is this production function concave, quasi-concave? Is this production function homogenous? Find its returns to scale when x1=1, and x2=1.Consider a firm with a production function given by y = min{yax,, bx2}. This firm can sell its product for price p and buy its inputs at input costs w1 and w2. In this situation, the conditional input demand functions are given by: 2.2 y? x,(y,W1, W2) = а %3D x2(y, W1, W2) : %3D Find the following components of the solutions to the cost minimization and profit maximization problems, and show that the required feature holds. The sequence in which the features are listed is not related to the sequence in which they need to be found. 2.2.1 The minimum cost function 2.2.2 The supply function 2.2.3 The input demand functions 2.2.4 The maximum profit function 2.2.5 Show that the maximum profit function is convex in pricesShow that the Cobb-Douglas Production Function ?(?, ?) = ??^??^? with α+ β=1 satisfies Euler’s Theorem.
- Please find the attached photo. It’s mathematic for economics, and the questions should solve by the one of these partial derivatives, Lagrange multipliers, first order differential equations.Y51. Let y = f(x1, x2)=x11/2+ X1X2 be a firm's production function, where x20, x220. - a. Write down the firm's production possibility set, and its input requirement set.“ b. Is this production function concave, quasi-concave? c. Is this production function homogenous, homothetic? + d. Find its returns to scale when x1=1, and x2=1.e
- 4) A firm faces a production function of twittle-twaps: Q(K,Lp,Ln) = 5*K(2/5)*LP(1/3)*LN(1/5) per hour, where capital (K), production labor (LP), and non-production labor (LN) are input factors used in production. The firm operates in a competitive market, where they are a price taker within the capital & labor markets and its own price (r = 40, wP = 25, wN = 50, P = 20). Answer the following.a. If capital and non-production labor are fixed at K = 32 and LN = 243, what is the general form MPLP and graph Q wrt to LP changing [you do not need to solve for LP yet].b. Is this production function decreasing, constant, or increasing returns to scale and why.c. Given the wage of production workers and the price of twittle-twaps, what is the optimal number of LP to employ to maximize profits and the quantity produced (VMPLP = wP).d. If the firm can control both K and LP, what does the Isoquant curve look like and its slope in relative terms if LN is fixed at 243 units [IQ slope =…4) A firm faces a production function of twittle-twaps: Q(K,Lp,Ln) = 5*K(2/5)*LP(1/3)*LN(1/5) per hour, where capital (K), production labor (LP), and non-production labor (LN) are input factors used in production. The firm operates in a competitive market, where they are a price taker within the capital & labor markets and its own price (r = 40, wP = 25, wN = 50, P = 20). Answer the following.a. If capital and non-production labor are fixed at K = 32 and LN = 243, what is the general form MPLP and graph Q wrt to LP changing [you do not need to solve for LP yet].b. Is this production function decreasing, constant, or increasing returns to scale and why.c. Given the wage of production workers and the price of twittle-twaps, what is the optimal number of LP to employ to maximize profits and the quantity produced (VMPLP = wP).d. If the firm can control both K and LP, what does the Isoquant curve look like and its slope in relative terms if LN is fixed at 243 units [IQ slope =…Please find the attached photo. It’s mathematic for economics, and the questions should solve by the one of these partial derivatives, Lagrange multipliers, first order differential equations.
- please do this4. Find the cost function and the conditional demands for inputs associated to the CES production function f(r1, #2) = A(ar{ + (1 – a)a)/e, where A, 8 > 0, 0 < a < 1, and 0#p< 1.A firm has two variable factors and a productionfunction f(x1, x2) = 6x1/21X21/3. The price of its output is 3, the price of factor 1 is 3, and the priceof factor 2 is 2.– What is the optimal production output level?– What is the maximum profit-level?