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The weekly revenue for a company is r=-4p^2+40p+887, where p is the price of the company’s product. Use the discriminant to find whether there is a price for which the weekly re…

The weekly revenue for a company is r=-4p^2+40p+887, where p is the price of the company’s product. Use the discriminant to find whether there is a price for which the weekly re…
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The weekly revenue for a company is r=-4p^2+40p+887, where p is the price of the company’s product. Use the discriminant to find whether there is a price for which the weekly revenue would be $1200

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User Parseval
by
8.1k points

1 Answer

13 votes

Answer:

No, there is no price for which the weekly revenue would be 1200

Explanation:

If r = 1200


-4p^2+40p+887=1200\\\\\implies -4p^2+40p-313=0

Therefore,
a=-4, \ \ \ b=40, \ \ \ c=-313

discriminant =
b^2-4ac


\implies 40^2-4(-4)(-313) = 1600 - 5008=-3408\\\\-3408<0 \implies \textsf{no real solutions}

answered
User Brian Yencho
by
8.0k points
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