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What's the equation of a circle whose endpoints of its diameter are (2,6) and (8,-6).

User Rylee Corradini
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1 Answer

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17 votes

The general form of an equation is given by


(x-a)^2+(x-b)^2=r^2

where (a,b) are the coordinates of the centre and r is the radius of the circle.

Now the coordinates of the centre are the midpoint of the points (2,6) and (8,-6). ​

The midpoint is calculated as follows

The vertical distance between (2,6) and (8,-6) is


6-(-6)=12

half of this is 6.

The horizontal distance between (2,6) and (8,-6) is


2-8=-6

half of which is -3.

suntracting y = 6 and x = -3 to (2,6) gives


(2+3,6-6,)=(5,0)

Hence, the coordinates of the centre are (a, b ) (5,0).

Now, the radius of the circle is half the distance to the midpoint


\begin{gathered} r=\sqrt[]{6^2+(-3)^3} \\ r=3\sqrt[]{5} \end{gathered}

Hence, the equation for the circle is


\begin{gathered} (x-5)^2+y^2=(3\sqrt[]{45}) \\ (x-5)^2+y^2=45 \end{gathered}

User Uncle Slug
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