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The Eccentricity Is Given of a Conic Section with One $r = \frac { 14 } { 1 - 2 \cos \theta }$

Question 264

Multiple Choice

The eccentricity is given of a conic section with one focus at the origin, along with the directrix corresponding to that focus. Find a polar equation for the conic section.
-e = 2, y = -7

A) $r = \frac { 14 } { 1 - 2 \cos \theta }$
B) $r = \frac { 14 } { 1 + 2 \sin \theta }$
C) $r = \frac { 14 } { 1 + 7 \cos \theta }$
D) $r = \frac { 14 } { 1 - 2 \sin \theta }$

The Eccentricity Is Given of a Conic Section with One r=141−2cos⁡θr = \frac { 14 } { 1 - 2 \cos \theta }r=1−2cosθ14​

Multiple Choice

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The Eccentricity Is Given of a Conic Section with One $r = \frac { 14 } { 1 - 2 \cos \theta }$

Correct Answer:
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