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Joshua Cheek · Answer 1 · 2023-03-25T19:22:37+0000

Answer:

$\displaystyle y = -(3)/(16)\, (x - 2)^(2) + 8$ .

Explanation:

In general, if the vertex of a parabola is
$(h,\, k)$ (where
and
are constants,) the equation of that parabola would be
$y = a\, (x - h)^(2) + k$ for some constant
(
$a \\e 0$ .) This equation is the vertex form equation of this parabola.

In this question, it is given that the vertex of this parabola is
$(2,\, 8)$ . Thus,
h = 2 and
k = 8 . The equation of this parabola would be
$y = a\, (x - 2)^(2) + 8$ for some constant
.

Finding the value of this constant
requires the coordinates of a point on this parabola other than the vertex
$(2,\, 8)$ .

Since
$(10,\, -4)$ is a point on this parabola,
x = 10 and
y = (-4) should satisfy the equation of this parabola
$y = a\, (x - 2)^(2) + 8$ .

Thus:

$(-4) = a\, (10 - 2)^(2) + 8$ .

Solve this equation for
:

$\displaystyle a = -(3)/(16)$ .

Thus, the equation of this parabola in vertex form would be:

$\displaystyle y = -(3)/(16)\, (x - 2)^(2) + 8$ .

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