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What is the equation of the parabola with vertex (6,7) and focus (7,7)? Vertex: (6 , 7) Focus: (7 , 7)​
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What is the equation of the parabola with vertex (6,7) and focus (7,7)?

Vertex: (6 , 7)
Focus: (7 , 7)​

User Eric Le Fort
by
6.3k points

1 Answer

1 vote

Answer:

Explanation:

If you plot these points on a coordinate plane, you see that they are on the same horizontal line, y = 7, with the focus 1 unit to the right of the vertex. This means that the parabola is a sideways opening parabola, to the right, to be more specific. That means that it has the basic vertex form


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

where p is the distance in units from the vertex to the focus, h is the first coordinate in the vertex, and k is the second coordinate in the vertex. For us, p = 1, h = 6, and k = 7. Now we will just fill the vertex form of the equation in with our values:


4(x-6)=(y-7)^2

We will solve this for x now by dividing each side by 4 and adding over the 6:


x=(1)/(4)(y-7)^2+6

User Aruna Mudnoor
by
6.0k points
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