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What is the equation of the parabola shown below, given a focus at F(1, 5) and a directrix of x = −3? In addition, identify the vertex and the equation of the axis of symmetry for the parabola.
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What is the equation of the parabola shown below, given a focus at F(1, 5) and a directrix of x = −3? In addition, identify the vertex and the equation of the axis of symmetry for the parabola.

What is the equation of the parabola shown below, given a focus at F(1, 5) and a directrix-example-1
User Willert
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\begin{gathered} x=(1)/(8)(y-5)^2-1,\text{ vertex :(-1, 5)} \\ \\ \text{axis of symmetry: y=5} \end{gathered}

Step-by-step explanation

First, let's find the vertex.

From the graph, the vertex is (-1, 5).

It is symmetric about y = 5

Length of the Latus rectom (a) =2 x 4 = 8

Therefore, the equation of the graph is;


y=(1)/(a)(y-5)^2-1

Substitute a = 8


x=(1)/(8)(y-5)^2-1

User Azemina
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