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Find the center of a circle with the equation: x2+y2−2y−8x−19=0
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Find the center of a circle with the equation: x2+y2−2y−8x−19=0

User Nathan Tew
by
7.9k points

2 Answers

4 votes

Answer:

its (-4,1) r6

Explanation:

User Jgode
by
8.3k points
4 votes
The equation of a circle in Center-Radius form is given by :


(x-a)^(2) + (y-b)^(2) = R^(2), where the center of the circle is the point (a, b) and the radius is R.

To find the center and radius of x2+y2−2y−8x−19=0 we write this equation again in Center-Radius form by completing the square:


x^(2) + y^(2) -2y-8x-19=0


x^(2)-8x + y^(2) -2y-19=0


(x^(2)-2*4x +16)-16 + (y^(2) -2*1y+1)-1-19=0


(x-4)^(2)+(y-1)^(2)=16+1+19


(x-4)^(2)+(y-1)^(2)=36


(x-4)^(2)+(y-1)^(2)= 6^(2)

Thus, the center of the radius is (4, 1) and radius is 6


Answer: (4,1)
User Sandstrom
by
7.6k points
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