Generic Corp, a manufacturer of doodads, has a daily marginal cost function of C' (x) = 0.57(0.08x + 0.19)(0.04x2 + 0.19x+5)25 dollars per doodad when x doodads are made. The fixed costs for Generic Corp are $17 per day, thus C(0) = $17. How much does it cost the company in total to produce 190 doodads per day? Round the constant of integration to four decimal places, and use that number in your cost function before finding the total cost to produce 190 doodads per day. Round your final answer to the nearest cent.
Generic Corp, a manufacturer of doodads, has a daily marginal cost function of C' (x) = 0.57(0.08x + 0.19)(0.04x2 + 0.19x+5)25 dollars per doodad when x doodads are made. The fixed costs for Generic Corp are $17 per day, thus C(0) = $17. How much does it cost the company in total to produce 190 doodads per day? Round the constant of integration to four decimal places, and use that number in your cost function before finding the total cost to produce 190 doodads per day. Round your final answer to the nearest cent.
Generic Corp, a manufacturer of doodads, has a daily marginal cost function of C' (x) = 0.57(0.08x + 0.19)(0.04x2 + 0.19x+5)25 dollars per doodad when x doodads are made. The fixed costs for Generic Corp are $17 per day, thus C(0) = $17. How much does it cost the company in total to produce 190 doodads per day? Round the constant of integration to four decimal places, and use that number in your cost function before finding the total cost to produce 190 doodads per day. Round your final answer to the nearest cent.
Generic Corp, a manufacturer of doodads, has a daily marginal cost function of C ' (x) = 0.57(0.08x + 0.19)(0.04x2 + 0.19x + 5)25 dollars per doodad when x doodads are made. The fixed costs for Generic Corp are $17 per day, thus C(0) = $17. How much does it cost the company in total to produce 190 doodads per day? Round the constant of integration to four decimal places, and use that number in your cost function before finding the total cost to produce 190 doodads per day. Round your final answer to the nearest cent.
Transcribed Image Text:Generic Corp, a manufacturer of doodads, has a daily marginal cost function of C' (x)
=
0.57(0.08x
+ 0.19)(0.04x2 + 0.19x+5)25 dollars per doodad when x doodads are made. The fixed costs for Generic
Corp are $17 per day, thus C(0) = $17. How much does it cost the company in total to produce 190
doodads per day? Round the constant of integration to four decimal places, and use that number in your cost
function before finding the total cost to produce 190 doodads per day. Round your final answer to the
nearest cent.
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
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