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Write the equation in standard form. Identity the center and radius.
x² + y2 + 8x-4y-7=0

Write the equation in standard form. Identity the center and radius. x² + y2 + 8x-example-1
User Nhjk
by
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1 Answer

15 votes
15 votes

Answer:

equation;


(x + 4) {}^(2) + (y - 2) {}^(2) = 27

Center (-4,2)

Radius is


3 √(3)

Explanation:

Since the x^2 and y^2 have the same coeffiecent this will be a circle in a form of


(x - h) {}^(2) + (y - k) {}^(2) = {r}^(2)

Where (h,k) is center

r is the radius

So first we group like Terms together


{x}^(2) + 8x + {y}^(2) - 4y - 7 = 0

Add 7 to both sides


{x}^(2) + 8x + {y}^(2) - 4y = 7


( {x}^(2) + 8x) +( {y}^(2) - 4y) = 7

Since the orginal form of the equation of the circle has a perfect square we need to complete the square for each problem


((8)/(2) ) {}^(2) = 16

and


( - (4)/(2) ) {}^(2) = 4

so we have


{x}^(2) + 8x + 16 + {y}^(2) - 4y + 4y = 7 + 16 + 4


{x}^(2) + 8x + 16 + {y}^(2) - 4y + 4y = 27


(x + 4) {}^(2) + (y - 2) {}^(2) = 27

To find our center, h is -4 and k is 2

so the center is (-4,2)

The radius is


√(27) = 3 √(3)

So the radius is 3 times sqr root of 3.

User Ldavid
by
2.9k points
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