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Find an equation of an ellipse satisfying the given conditions Vertices: (0 - 6) and (0.6) Length of minor axis: 8

User FunctorSalad
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1 Answer

25 votes
25 votes

As the given vertices are at a distance of 12 units:

As the major axis is vertical you have the next generall equation:


((x-h)^2)/(b^2)+((y-k)^2)/(a^2)=1

To find the center (h,k) of the ellipse use the coordinates of that vertices as follow:


((0+0)/(2),(6-6)/(2))=(0,0)

Now use the distance between those vertices to find a:


a=(12)/(2)=6

b is the distance of minor axis divided into 2:


b=(4)/(2)=2

Then, you get the next equation for the given ellipse:


\begin{gathered} ((x-0)^2)/(2^2)+((y-0)^2)/(6^2)=1 \\ \\ (x^2)/(4)+(y^2)/(36)=1 \end{gathered}

Find an equation of an ellipse satisfying the given conditions Vertices: (0 - 6) and-example-1
User Kris Babic
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