How do you find the axis of symmetry, and the maximum or minimum value of the function $f (x) = 8 - {(x + 2)}^{2}$ $f(x) = 8 - (x + 2) ^2$ ?

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How do you find the axis of symmetry, and the maximum or minimum value of the function $f (x) = 8 - {(x + 2)}^{2}$ $f(x) = 8 - (x + 2) ^2$ ?

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Answer 1 · 2016-01-18T05:31:16

Explanation is given below

Explanation:

If you can understand the graph of a parabola opening up or down. You can easily get the solution to the question you have asked.

Let us see how.

The vertex form of the quadratic function is $y = a {(x - h)}^{2} + k$ $y=a(x-h)^2+k$ where $(h, k$ $(h,k$ is the vertex.

$a$ $a$ decides vertical shrink or stretch and also which way the parabola is opening.

If $a < 0$ $a<0$ the parabola opens down, and in this case, the graph would have a maximum. The maximum value would be $k$ $k$

if $a > 0$ $a>0$ then the parabola opens up, and in this case the graph would have a minimum and the minimum value would be $k$ $k$

The axis of symmetry for the graph opening up or down is decided by the $x$ $x$ coordinate of the vertex. The equation of axis of symmetry is given by $x = h$ $x=h$

Now let us apply the same with respect to our problem.

$f (x) = 8 - {(x + 2)}^{2}$ $f(x) = 8-(x+2)^2$
Let us rewrite in the form $y = a {(x - h)}^{2} + k$ $y=a(x-h)^2+k$

$f (x) = - {(x + 2)}^{2} + 8$ $f(x) = -(x+2)^2+8$

Comparing we can see $a = - 1$ $a=-1$ , $h = - 2$ $h=-2$ and $k = 8$ $k=8$

Vertex is $(- 2, 8)$ $(-2,8)$

Since $a < 0$ $a<0$ the graph opens down.
Therefore the graph has a maxmimum.

The maximum value is $8$ $8$

The axis of symmetry is $x = - 2$ $x=-2$

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How do you find the axis of symmetry, and the maximum or minimum value of the function $f (x) = 8 - {(x + 2)}^{2}$ $f(x) = 8 - (x + 2) ^2$ ?

1 Answer

Explanation:

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How do you find the axis of symmetry, and the maximum or minimum value of the function $f (x) = 8 - {(x + 2)}^{2}$ $f(x) = 8 - (x + 2) ^2$ ?