How do you find the cartesian equation for $r = 4 + 4 cos T$ $r = 4 + 4cosT$ ?

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How do you find the cartesian equation for $r = 4 + 4 cos T$ $r = 4 + 4cosT$ ?

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Answer 1 · 2016-02-26T05:28:18

The cartesian equation for this cardioid is
x.x + y.y = 4 $\sqrt{}$ $sqrt$ (x.x + y.y) + 4x.

Explanation:

r = $\sqrt{}$ $sqrt$ (x.x + y.y) and x = r cos T. Multiply both sided by r.
Rationalization to remove $\sqrt{}$ $sqrt$ would give a 4th degree equation.
This equation would include r = $-$ $-$ 4 + 4 cos T, also representing the same graph, drawn from r = 0 and T = 0, instead of from ( 8, 0 ). Negative r locates the point in the opposite direction.
Here, T = $π$ $pi$ gives r = $-$ $-$ 8 which is ( 9, 0 ) for the given equation. .

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How do you find the cartesian equation for $r = 4 + 4 cos T$ $r = 4 + 4cosT$ ?

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How do you find the cartesian equation for $r = 4 + 4 cos T$ $r = 4 + 4cosT$ ?