Martina has the following utility function: U(C, L)= (CL)^1/2where C is the quantity of goods consumed and L is the number of hours of leisure. Martina requires eight hours of rest each day. Therefore she has 16 hours available for work. Let H be the number of hours employed such that H = 16 - L. Let P be the price of C and W be the hourly wage.
i)Assume she is required to pay an income tax of T = 0.3( Y - 60)where Y is her pretax income. How many hours per day will she work at P = $1 and W = $10?
ii)Assume there is no income tax but her terms of employment change. She is now paid time and a half for work in excess of 6 hours per day. How many hours per day will she choose to work at P = $1, W = $10, and overtime of W' = $15?

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The Answer of Martina has the following utility function: U(C, L)= (CL)^1/2where C is the quantity of goods consumed and L is the number of hours of leisure. Martina requires eight hours of rest each day. Therefore she has 16 hours available for work. Let H be the number of hours employed such that H = 16 - L. Let P be the price of C and W be the hourly wage. i)Assume she is required to pay an income tax of T = 0.3( Y - 60)where Y is her pretax income. How many hours per day will she work at P = $1 and W = $10? ii)Assume there is no income tax but her terms of employment change. She is now paid time and a half for work in excess of 6 hours per day. How many hours per day will she choose to work at P = $1, W = $10, and overtime of W' = $15?

Martina Has the Following Utility Function: U(C, L)= (CL)1/2 where

Martina Has the Following Utility Function: U(C, L)= (CL)^1/2where