Equation of a circle that has a center of (-4,-1) and passes through (1,-3)

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asked May 23, 2023 82.0k views

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Ruthafjord · Answer 1 · 2023-05-27T06:25:37+0000

Answer:

(x + 4)^(2) + (y + 1)^(2) = 29 .

Explanation:

The equation of a circle of radius
and center
$(a,\, b)$ is:

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

In this question, it is given that the center is
$(-4,\, -1)$ , such that
a = (-4) while
b = (-1) .

The radius of this circle could be found as the distance between the center of this circle,
$(-4,\, -1)$ , and any point on the circle- such as
$(1,\, -3)$ . Using the distance formula, the radius of this circle would be:

$\begin{aligned}r &= \sqrt{((-4) - 1)^(2) + ((-1) - (-3))^(2)} \\ &= √(29)\end{aligned}$ .

Therefore, the equation of this circle would be:

(x - (-4))^(2) + (y - (-1))^(2) = (√(29))^(2) .

Simplify to obtain:

(x + 4)^(2) + (y + 1)^(2) = 29 .

Equation of a circle that has a center of (-4,-1) and passes through (1,-3)

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