Does the function $f(x)= -x^2+6x-1$ have a minimum or maximum value?

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Does the function $f(x)= -x^2+6x-1$ have a minimum or maximum value?

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Answer 1 · 2017-01-28T18:11:33

The parabola will have a maximum value because the $x^2$ term is negative.

Explanation:

Because the function has the general form $f(x)=color(blue)(A)x^2+color(purple)(B)x+color(red)(C)$ , we know the graph will be a parabola.
The sign of the $x^2$ term will tell us if the parabola opens up (like a $uu$ ) or down (like a $nn$ ):

If $A >0$ , opens up ( $uu$ )

If $A<0$ , opens down ( $nn$ )

In this case,
$f(x)=color(blue)(-(1))x^2color(purple)(+6)xcolor(red)(-1)$
$color(blue)(A = -1)$ so the parabola will open "down" or $nn$ which means the parabola will have a "peak" or maximum point.

graph{-x^2+6x-1 [-15, 15, -10, 10]}

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Does the function $f(x)= -x^2+6x-1$ have a minimum or maximum value?

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