A company produces very unusual CD's for which the variable cost is $20 per CD and the fixed costs are $25,000. They will sell the CD's for $70 each. Leta be the number of CD's produced. Write the total cost C as a function of the number of CD's produced. C=$ 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. (Profit= Revenue - Cost) P = $ Lastly, determine the number of CD's which must be produced to break even. "Breaking even" is when Revenue = Cost, or when Profit = 0. If needed, round up to the next whole CD. The number of CD's which must be produced to break even is Question Help: Video Message instructor

A company produces very unusual CD's for which the variable cost is $20 per CD and the fixed costs are $25,000. They will sell the CD's for $70 each. Leta be the number of CD's produced. Write the total cost C as a function of the number of CD's produced. C=$ 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. (Profit= Revenue - Cost) P = $ Lastly, determine the number of CD's which must be produced to break even. "Breaking even" is when Revenue = Cost, or when Profit = 0. If needed, round up to the next whole CD. The number of CD's which must be produced to break even is Question Help: Video Message instructor

Algebra and Trigonometry (6th Edition)

6th Edition

ISBN:9780134463216

Author:Robert F. Blitzer

Publisher:Robert F. Blitzer

ChapterP: Prerequisites: Fundamental Concepts Of Algebra

Section: Chapter Questions

Problem 1MCCP: In Exercises 1-25, simplify the given expression or perform the indicated operation (and simplify,...

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Question

A company produces very unusual CD's for which the variable cost is $20 per CD and the fixed costs are
$25,000. They will sell the CD's for $70 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 S
Write the total revenue R as a function of the number of CD's produced.
R=S
L
Write the total profit P as a function of the number of CD's produced.
(Profit Revenue - Cost)
P = $
Lastly, determine the number of CD's which must be produced to break even.
"Breaking even" is when Revenue = Cost, or when Profit = 0. If needed, round up to the next whole CD.
The number of CD's which must be produced to break even is
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