8. (x - 5) + (y - 11)^2= 81 a) find its center b) its radius c) one point on the circle

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asked Feb 17, 2020 140k views

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Yasmin French · Answer 1 · 2020-02-23T04:49:55+0000

Answer:

a) (5, 11)

b) r = 9

c) (-4, 11)

Explanation:

The equation of a circle in standard form:

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

(h, k) - center

r - radius

We have the equation:

(x-5)^2+(y-11)^2=81

Therefore

a) h = 5, k = 11 → the center (5, 11)

b) r² = 81 → r = √81 = 9 - radius

c) We choose any value of x, but one which h - r ≤ x ≤ h + r

5 - 9 = -4

5 + 9 = 14

-4 ≤ x ≤ 14

Let x = -4. Put to the equation and solve for y:

(-4-5)^2+(y-11)^2=81

(-9)^2+(y-11)^2=81

81+(y-11)^2=81 subtract 81 from both sides

$(y-11)^2=0\to y-11=0$ add 11 to both sides

y=11

(-4, 11)

8. (x - 5) + (y - 11)^2= 81 a) find its center b) its radius c) one point on the circle

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1 Answer

a) (5, 11)

b) r = 9

c) (-4, 11)

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8. (x - 5) + (y - 11)^2= 81 a) find its center b) its radius c) one point on the circle​

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Please log in or register to answer this question.

1 Answer

a) (5, 11)

b) r = 9

c) (-4, 11)

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No related questions found

Categories

Other Questions

8. (x - 5) + (y - 11)^2= 81 a) find its center b) its radius c) one point on the circle