Answer to Question #250059 in Microeconomics for david

Question #250059

An agent consumes quantity (x₁,x₂) of goods 1 and 2. Here is his utility function: 𝑈(𝑥1, 𝑥2) = √𝑥1 + 2 ∗ 𝑥2, his budget constraint is p1x1+p2x2 = m.

a. Calculate the agent’s Marshallian demand (x*₁ , x*₂ ).

b. When would the agent’s consumer’s problem have a corner solution?

Expert's answer

Utility function is "x_1^3x_2" with budget constraint "p_1x_1+p_2x_2=m"

At optimum, "\\frac{MU\n\nX_1}{\n\nMU\n\nX_2}\n\n\n\n=\\frac{p_1}{\n\np_2}"

a) Therefore,

"MUx_1=3x_1^2x_2\\\\MUx_2=x_1^3\\\\At\\space optimum,\\space \\frac{3x_1^2x_2}{x_1^3}=\\frac{p_1}{p_2}\u21d2\\frac{3x^2}{x_1}=\\frac{p_1}{p_2}\\\\\u21d2x_2=\\frac{p_1}{3p_2}x1"

Putting value of x₂ in x₁, we get

"\u21d2p_1x_1+p_2(\\frac{p_1}{3p_2})x1=m\\\\\u21d2p_1x_1+\\frac{p_1}{3}x1=m\\\\\u21d23p_1x_1+p_1x_1=3m\\\\\u21d24p_1x_1=3m\\\\\u21d2x1*=\\frac{3m}{4p_1}"

Similarly,

"x2^*=\\frac{p_1}{3p_2}(\\frac{3m}{4p_1})\\\\x2^*=\\frac{m}{4p_2}"

Therefore, the agent's Marshallian demand "(x1^*,x2^*)= (\\frac{3m}{4p_1},\\frac{m}{4p_2})"

b) Hence, indirect utility function is derived by putting x1* and x2* in utility function is

"V(m,p1,p2)=(\\frac{3m}{4p_1})^3(\\frac{m}{4p_2})\\\\V(m,p1,p2)=\\frac{3m^4}{16p_1p_2}"