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Find an Equation of a Parabola Satisfying the Given Conditions $\pi$

Question 75

Multiple Choice

Find an equation of a parabola satisfying the given conditions: Focus (2, 0) and directrix y = 2?.

A) $Find an equation of a parabola satisfying the given conditions: Focus (2, 0) and directrix y = 2?. A) = 4 \pi (1 - y) B) = 4( \pi - y) C) = 4 \pi ( \pi - y) D) = 4 \pi ( \pi - y) E) = 4 \pi ( \pi - y)$ = 4 $\pi$ (1 - y)
B) $Find an equation of a parabola satisfying the given conditions: Focus (2, 0) and directrix y = 2?. A) = 4 \pi (1 - y) B) = 4( \pi - y) C) = 4 \pi ( \pi - y) D) = 4 \pi ( \pi - y) E) = 4 \pi ( \pi - y)$ = 4( $\pi$ - y)
C) $Find an equation of a parabola satisfying the given conditions: Focus (2, 0) and directrix y = 2?. A) = 4 \pi (1 - y) B) = 4( \pi - y) C) = 4 \pi ( \pi - y) D) = 4 \pi ( \pi - y) E) = 4 \pi ( \pi - y)$ = 4 $\pi$ ( $\pi$ - y)
D) $Find an equation of a parabola satisfying the given conditions: Focus (2, 0) and directrix y = 2?. A) = 4 \pi (1 - y) B) = 4( \pi - y) C) = 4 \pi ( \pi - y) D) = 4 \pi ( \pi - y) E) = 4 \pi ( \pi - y)$ = 4 $\pi$ ( $\pi$ - y)
E) $Find an equation of a parabola satisfying the given conditions: Focus (2, 0) and directrix y = 2?. A) = 4 \pi (1 - y) B) = 4( \pi - y) C) = 4 \pi ( \pi - y) D) = 4 \pi ( \pi - y) E) = 4 \pi ( \pi - y)$ = 4 $\pi$ ( $\pi$ - y)

Find an Equation of a Parabola Satisfying the Given Conditions π\piπ

Multiple Choice

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Find an Equation of a Parabola Satisfying the Given Conditions $\pi$

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