The cost (in dollars) of producing "x" units of a certain product is given by C(x) = 2x³4x² - 128x + 756 a) Write the equation that indicates "the cost is equal to $500". Then, write all terms on one side and equal to zero. Show the resulting equation here: b) Use factoring to solve the equation from part(a). Answer: "The cost is equal to $500 when units are produced" = 0 c) What is the interval of values of "x" that result in a cost lower than $500? Answer in one of the following ways: "The cost is less than $500 when the number of units produced is between "The cost is less than $500 when the number of units produced is less than - "The cost is less than %500 when the number of units produced is greater than and

Transcribed Image Text:

https://openvellum X P Pearson Sign In 429344443/6274031?X-Blackboard-Expiration=1670068800000&X-Blackboard-Signature-OgD2YqWeu7aUcoj%2FY 31 4) 2/2 tpi.bb.pearsoncm X 1 - 117% + H » X P Pearson Sign In The cost (in dollars) of producing "x" units of a certain product is given by C(x) = 2x³ 4x² - 128x + 756 a) Write the equation that indicates "the cost is equal to $500". Then, write all terms on one side and equal to zero. Show the resulting equation here: M b) Use factoring to solve the equation from part(a). Answer: "The cost is equal to $500 when units are produced" c) What is the interval of values of "x" that result in a cost lower than $500? Answer in one of the following ways: "The cost is less than $500 when the number of units produced is between "The cost is less than $500 when the number of units produced is less than "The cost is less than %500 when the number of units produced is greater than = 0 and