The point (-4,-3) lies on a circle whose center is at (0,6). How do you find an equation of this circle?

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The point (-4,-3) lies on a circle whose center is at (0,6). How do you find an equation of this circle?

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Answer 1 · 2016-02-15T13:19:08

$x^{2} + {(y - 6)}^{2} = 109$ $x^2+(y-6)^2=109$

Explanation:

If the circle has a center at $(0, 6)$ $(0,6)$ and $(- 4, - 3)$ $(-4,-3)$ is a point on its circumference,
then it has a radius of:
$XXX r = \sqrt{{(0 - (- 3))}^{2} + {(6 - (- 4))}^{2}} = \sqrt{109}$ $color(white)("XXX")r=sqrt((0-(-3))^2+(6-(-4))^2)=sqrt(109)$

The standard form for a circle with center $(a, b)$ $(a,b)$ and radius $r$ $r$ is
$XXX {(x - a)}^{2} + {(y - b)}^{2} = r^{2}$ $color(white)("XXX")(x-a)^2+(y-b)^2=r^2$

In this case we have
$XXX x^{2} + {(y - 6)}^{2} = 109$ $color(white)("XXX")x^2+(y-6)^2=109$
graph{x^2+(y-6)^2=109 [-14.24, 14.23, -7.12, 7.11]}

Answer 2 · 2016-02-15T13:26:28

$x^{2} + y^{2} + 8 x + 6 y - 72 = 0$ $x^2+y^2+8x+6y-72=0$

Explanation:

It means that $(- 4, - 3)$ $(-4,-3)$ is center and radius is distance between $(- 4, - 3)$ $(-4,-3)$ and $(0, 6)$ $(0,6)$ . The radius is hence given by

$\sqrt{{(0 - (- 4))}^{2} + {(6 - (- 3))}^{2}}$ $sqrt{(0-(-4))^2+(6-(-3))^2)$ or $\sqrt{16 + 81}$ $sqrt(16+81)$ or $\sqrt{87}$ $sqrt87$

Hence equation of circle is

${(x - (- 4))}^{2} + (y - (- 3^{2})) = 87$ $(x-(-4))^2+(y-(-3^2))=87$ or

${(x + 4)}^{2} + {(y + 3)}^{2} = 87$ $(x+4)^2+(y+3)^2=87$

$x^{2} + 8 x + 16 + y^{2} + 6 y + 9 = 87$ $x^2+8x+16+y^2+6y+9=87$ or

$x^{2} + y^{2} + 8 x + 6 y + 16 + 9 - 87 = 0$ $x^2+y^2+8x+6y+16+9-87=0$ or

$x^{2} + y^{2} + 8 x + 6 y - 72 = 0$ $x^2+y^2+8x+6y-72=0$

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The point (-4,-3) lies on a circle whose center is at (0,6). How do you find an equation of this circle?

2 Answers

Explanation:

Explanation:

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