What is the minimum or maximum of $j(x)=-5/3x^2+9/10x+21/4$ ?

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What is the minimum or maximum of $j(x)=-5/3x^2+9/10x+21/4$ ?

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Answer 1 · 2015-08-06T10:32:54

Since the coefficient of $x^2$ is negative we are talking about a maximum.

Explanation:

To find it, we set the derivative of $j(x)$ equal to $0$

$j'(x)=-2*5/3x+9/10=0$

$->9/10=10/3x->x=9/10-:10/3=9/10*3/10=27/100$

So this is the $x$ -value of the maximum. If you put that in the original formula, you will find the corresponding $j(x)$ -value.
graph{-5/3x^2+.9x+21/4 [-7.24, 8.564, -1.073, 6.83]}

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What is the minimum or maximum of $j(x)=-5/3x^2+9/10x+21/4$ ?

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Explanation:

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