How do you graph $r=10costheta$ ?

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Answer 1 · 2016-09-24T07:04:53

The graph is the circle of radius 5 with center at (5, 0) on the initial line $theta = 0$ . This passes through the pole r = 0..

The polar equation of the family of circles through the pole r = 0)

and center at (a. 0) is

$r = 2a cos theta$ . The radius a is the parameter for the family.

So, here, $r = 10 cos theta$ represents a member of this family,

with parameter a = 5.

The general polar equation of the grand family of all circles, with

center at Cartesian $(alpha, beta)$ and radius 'a' is

( from $(x-alpha)^2+(y-beta)^2 = a^2$ )

$r = alpha cos theta + beta sin theta +-sqrt(((alpha cos theta +beta sin theta)^2- (alpha^2+beta^2-a^2))$

As $r >=0$ , negative sign is for $alpha^2 + beta^2 > a^2$ , when

the pole r = 0 is outside the circle.

Easy-to-remember direct polar form is

$a^2 = r^2 - 2 r b cos (theta-gamma) +b^2$ ,

with the center at polar $( b, gamma)$ and radius 'a'.

In this example $r = 10 cos theta$ ,

Cartesian $alpha = 5, beta = 0$ .

Radius a = 5, and in the polar coordinates ,

the center is $(b, gamma)$ = (5, 0) .

Graph of $r = 10 cos theta$ :
graph{x^2+y^2 -10x = 0[-11 11 -5.5 5.5]}

How do you graph r=10costhetar=10costheta?