A consumer has utility function U(x, y) = min{x, y}. She has $150 and the price of x and the price of y are both 1. The consumer is thinking of accepting a job in a different town, in which the price of x is 1 and the price of y is 2. Her income would remain the same. This consumer, who understands compensating and equivalent variation perfectly, is torn. While she is keen on the prospect of a move to the new town, which boasts a fine array of cultural activities for her family, she claims that, purely on the basis of her own preferences, having to move is as bad as a cut in pay of $X. She also claims she wouldn’t mind moving if when she moved she got a raise of $Y. What are the quantities $X and $Y equal to?

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codiepienagoya codiepienagoya · Answer 1 · 2020-10-13T11:49:06+02:00

Answer:

The answer is "X=50 and y=75".

Explanation:

X = Variation equivalent

Y = Variation to compensate

Pre-movement equation:

[tex]\to x = y = 75 \\\\ \to U= 75[/tex]

The post movement equation:

[tex]\to x = y = 50 \\\\\to U = 50[/tex]

Service decline corresponds to a reduction in the salary of:

[tex]\to 25 \times 1 + 25 \times 1\\\\\to 25+ 25\\\\ \to \$ 50\ \ \ _{(modify \ \ Equivalent)}[/tex]

Now she wants:

[tex]\to 25 \times 1 + 25 \times 2 \\\\\to 25 + 50 \\\\ \to \$ 75 \ \ \ _{(compensating \ \ variation)}[/tex]

to get [tex]U = 75[/tex] in the new city.