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(a) Derive the Marshalian demand functions for the following utility function:
u(x1,x2,x3) = x1 + δ ln(x2) x1 ≥ 0, x2 ≥ 0
Does one need to consider the issue of "corner solutions" here?
(b) Derive the Hicksian demand functions and the expenditure function for the following utility function:
u(x1,x2,x3) =min {√x1, 2√x2, 4√x3} x1 ≥ 0, x2 ≥ 0, x3 ≥ 0
Using the expenditure function and the Hicksian demand functions that you obtained, derive the indirect utility function and the Marshalian demand function for good 1.
A paper mill produces two grades of paper viz., X and Y. Because of raw material restrictions, it cannot produce more than 400 tons of grade X paper and 300 tons of grade Y paper i
Sin+cos
1. What is the value of Φ(0)? 2. Φ is the pdf for N(0, 1); calculate the value of Φ(1.5). 3. Suppose X ~ N(0, 1). Which, if either, is more likely: .3 ≤ X ≤ .4, or .7 ≤ X ≤
The math equation is written exactly this way: 0+50x1-60-60x0+10=??? The answer I get is 10 and others say 0 0+50=50 50x1=50 50-60=-10 -10-60=-70 -70x0=0 0+10=10
6x^7-2x^3+4x-16 / 3x^2-7x+9
A washing machine, cash price $ 850 is available on the following terms: A deposit of $ 100 followed by equal payments at the end of each month for the next 18 months, if intere
1. Consider the model Y t = β 0 + β 1 X t + ε t , where t = 1,..., n. If the errors ε t are not correlated, then the OLS estimates of β 0 and β
2
Make a file called "testtan.dat" which has 2 lines, with 3 real numbers on every line (some negative, some positive, in the range from-1 to 3). The file can be formed from the edi
who discoverd unitary method
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