SOLUTION: Given the cost function, C(x), and the revenue function, R(x), find the number of units x that must be sold to break even. C(x) = 128x + 330,000 R(x) = 278x

Algebra ->  Test -> SOLUTION: Given the cost function, C(x), and the revenue function, R(x), find the number of units x that must be sold to break even. C(x) = 128x + 330,000 R(x) = 278x      Log On


   

Question 986226: Given the cost function, C(x), and the revenue function, R(x), find the number of units x that must be sold to break even.
C(x) = 128x + 330,000
R(x) = 278x
Answer by ankor@dixie-net.com(22740) About Me  (Show Source):
You can put this solution on YOUR website!
Given the cost function, C(x), and the revenue function, R(x), find the number of units x that must be sold to break even.
C(x) = 128x + 330,000
R(x) = 278x
:
Break even occurs when Revenue equal cost: R(x) = C(x), therefore
278x = 128x + 330000
278x - 128x = 330000
150x = 330000
x = 330000/150
x = 2200 unit have to be produced and sold to break even
:
Pretty easy! Right? CK