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A parabola has a vertex (-3, -2) and contains the point (-5, 6). Write the equation for this parabola in vertex form.
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A parabola has a vertex (-3, -2) and contains the point (-5, 6). Write the equation for this parabola in vertex form.

User Muggles
by
7.6k points

1 Answer

5 votes

Answer:


y = 2(x +3)^2 -2

Explanation:

Given


(h,k) = (-3,-2) --- vertex


(x,y) = (-5,6) --- point

Required

Determine the equation

The general form is:


y = a(x - h)^2 + k

First, we solve for a:

Substitute
(h,k) = (-3,-2) and
(x,y) = (-5,6) in
y = a(x - h)^2 + k


6 = a(-5 - (-3))^2 - 2


6 = a(-2)^2 - 2


6 = 4a - 2

Solve for a


4a = 6 + 2


4a = 8


a = 2

So:


y = a(x - h)^2 + k


y = 2(x - (-3))^2 -2


y = 2(x +3)^2 -2

User Dynite
by
7.6k points
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