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A company produces very unusual CD's for which the variable cost is $ 17 per CD and the fixed costs are $ 30000. They will sell the CD's for $ 63 each. Let x be the number of CD's produced.
Write the total cost C as a function of the number of CD's produced.
C =$

Write the total revenue R as a function of the number of CD's produced.
R =$

Write the total profit P as a function of the number of CD's produced.
P =$

Find the number of CD's which must be produced to break even.
The number of CD's which must be produced to break even is

Respuesta :

Answer:

Explanation:

Let we assume the number of CD produced be X

So, the total cost would be

C = Fixed cost + variable cost × number of CD produced

   = $30,000 + $17X

For total revenue, it would b

R = $63X

For total profit, it would be

P = Selling cost per CD  × number of CD produced - variable cost per CD × number of CD produced - fixed cost

= $63X - $17X - $30,000

= $46X - $30,000

For number of CD, it would be

0 = $46X - $30,000

X = $30,000 ÷ $46

   = 652 CD for break-even

Answer:

r is 47x

Explanation:

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