How do you determine a point in common of $r = 1 + cos theta$ and $r = 2 cos theta$ ?

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Answer 1 · 2016-09-28T03:45:49

(2, 0) and r = 0.

The two meet when $r=1+cos theta=2cos theta$ .

Therein, $cos theta = 1$ , and so, theta = 0#. The common r = 2.

The first equation $r = 1 + cos theta$ gives a full cardioid,

for $theta in [-pi, pi]$ .

The second $r = 2 cos theta$ represents the unit circle with center

at (1,0) and the whole circle is drawn for $theta in [-pi/2, pi/2]$

Interestingly, seemingly common point r=0 is not revealed here.

The reason is that,,

for $r = 2 cos theta$ , r = 0, when $theta = +-pi/2$

and for $r = 1 + cos theta$ , r - 0, when theta = +-pi.

Thus the polar coordinate $theta$ is not the same for both at r = 0.

This disambiguation is important to include, as we see, r = 0 as a

common point that is reached in different directions.

This is a reason for my calling r = 0 a null vector that has contextual

direction.

How do you determine a point in common of r = 1 + cos thetar = 1 + cos theta and r = 2 cos thetar = 2 cos theta?