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Write an equation of a parabola that opens to the left, has a vertex at the origin, and a focus at (–4, 0).
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Write an equation of a parabola that opens to the left, has a vertex at the origin, and a focus at (–4, 0).

User Chrskly
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1 Answer

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Answer:


y^(2)=-16x

Explanation:

we know that

The standard equation of a horizontal parabola is equal to


(y-k)^(2)=4p(x-h)

where

(h,k) is the vertex

(h+p,k) is the focus

In this problem we have

(h,k)=(0,0) ----> vertex at origin

(h+p,k)=(-4,0)

so

h+p=-4

p=-4

substitute the values


(y-0)^(2)=4(-4)(x-0)


y^(2)=-16x

User Norbdum
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6.6k points
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