How do you find general form of circle with center at the point (5,7); tangent to the x-axis?

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How do you find general form of circle with center at the point (5,7); tangent to the x-axis?

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Answer 1 · 2016-01-26T11:33:02

${(y - 7)}^{2} + {(x - 5)}^{2} = 49$ $(y-7)^2 + (x-5)^2 = 49$

Explanation:

The general form of a circle is ${(y - k)}^{2} + {(x - h)}^{2} = r^{2}$ $(y-k)^2 +(x-h)^2 = r^2$
where $(h, k)$ $(h,k)$ is the centre of the circle and $r$ $r$ is the radius.

Because the circle is tangent to the $x$ $x$ axis and the $y$ $y$ coordinate of the centre is $7$ $7$ , the radius $r = 7$ $r = 7$ - see sketch.
Sketch
So the equation becomes
${(y - 7)}^{2} + {(x - 5)}^{2} = 7^{2}$ $(y-7)^2 + (x-5)^2 = 7^2$

${(y - 7)}^{2} + {(x - 5)}^{2} = 49$ $(y-7)^2 + (x-5)^2 = 49$

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How do you find general form of circle with center at the point (5,7); tangent to the x-axis?

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