(a) Amy can produce china pitchers at a cost of $5 each. Letting x be the number
ID: 3408746 • Letter: #
Question
(a) Amy can produce china pitchers at a cost of $5 each. Letting x be the number of pitchers produced, write a cost equation C(x).
(b) Amy sells her china pitchers based on how many she has produced in a week. This works in the following way: if Amy has produced x pitchers, she will sell each pitcher for 17 x dollars. Assuming that Amy sells all of the pitchers she produces, write a revenue function in terms of x (where x is the number of pitchers produced and sold).
(c) Find the number of pitchers that she should produce and sell to maximize profit. Find the maximum profit.
Explanation / Answer
a) Letting x be the number of pitchers produced, write a cost equation C(x).
C(x) = x*5 = 5x
b) if Amy has produced x pitchers, she will sell each pitcher for 17 x dollars.
R(x) = x*( 17 -x)
c) Profit = R(x) - C(x) = x(17 -x) -5x = -x^2 +17x -5x = -x^2 +12x
Its a quadratic function maximum value occurs at x = -b/2a = -(12)/2*(-1) = 6
Number of pitchers for maximum profit = 6
Maximu Profit , plug x= 6 in Profit function
Profit = -(6)^2 +12*6 = -36 +72 = $ 36
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