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31 votes
Vertex: (5,4) focus (-5,4)

User Ash Ryan Arnwine
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1 Answer

24 votes
24 votes

Given, vertex: (5,4) focus (-5,4).

Since the y coordinates of the vertex and the focus are the same, the focus and the vertex are on the same horizontal line, y=4. So,the axis of symmetry is a horizontal line.

SInce vertex: (5,4) and focus (-5,4), we find that the focus is at the left of the vertex. So, the parabola opens leftwards.

So, the equation of parabola is,


\begin{gathered} (y-k)^2=4a(x-h) \\ \text{Here, vertex(}h,k)=(5,4) \end{gathered}

a=-5-(5)=-10 , since y coordinates are same.

Now, above equation becomes,


\begin{gathered} (y-4)^2=4*(-10)(x-5) \\ (y-4)^2=-40(x-5) \end{gathered}

So, the equation of the parabola is,


\begin{gathered} \\ (y-4)^2=-40(x-5) \end{gathered}
User Robin Daugherty
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