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Find an equation of the ellipse that has center (1.-4), a major axis of length 12, and endpoint of minor axis (4.-4)

User Kevingallagher
by
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1 Answer

17 votes
17 votes

Solution:

Given:

Ellipse with the following properties;


\begin{gathered} \text{centre}=(1,-4) \\ \text{length of major axis= 12} \\ \text{End point of minor axis = (4,-4)} \end{gathered}

The equation of an ellipse is given by;


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

where,


\begin{gathered} (h,k)\text{ is the centre} \\ (h,k)=(1,-4) \\ h=1 \\ k=-4 \end{gathered}

Substituting these values into the equation of an ellipse,


\begin{gathered} ((x-h)^2)/(a^2)+((y-k)^2)/(b^2)=1 \\ ((x-1)^2)/(a^2)+((y-(-4))^2)/(b^2)=1 \\ ((x-1)^2)/(a^2)+((y+4)^2)/(b^2)=1 \end{gathered}

The length of the semi-minor axis (a) is the difference between the x-values of the centre and the endpoint of the minor axis.

Hence,


\begin{gathered} a=4-1 \\ a=3 \\ a^2=3^2 \\ a^2=9 \end{gathered}

To get the length of the semi-major axis (b),


\begin{gathered} \text{length of the major axis=2b} \\ 12=2b \\ b=(12)/(2) \\ b=6 \\ b^2=6^2 \\ b^2=36 \end{gathered}

Substituting these into the equation of the ellipse,


\begin{gathered} ((x-1)^2)/(a^2)+((y+4)^2)/(b^2)=1 \\ \frac{(x-1)^2}{9^{}}+\frac{(y+4)^2}{36^{}}=1 \end{gathered}

Therefore, the equation of the ellipse is;


\frac{(x-1)^2}{9^{}}+\frac{(y+4)^2}{36^{}}=1

User Cybercampbell
by
3.2k points
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