Question #3583d

1 Answer
A. S. Adikesavan
Nov 27, 2016

#r=2(3 cos theta - 4 sin theta )#. Graph is inserted.

Explanation:

The conversion formula is

#(x, y)=r(cos theta, sin theta)#

So, the polar equation is

(r cos theta- 3 )^2+(r sin theta + 4 )^2=25#.

Expanding and simplifying,

#r=2(3 cos theta - 4 sin theta )#

The circle passes through the pole (r = 0 ) ,

when #theta =tan^(-1)(3/4)=36.87^o# and also when #theta =

216.87^o#.

This interpretation of reaching the pole is important, in the polar

frame. This discloses the directions of entry into, and exit from, the

pole.

graph{(x-3)^2+(y+4)^2-25=0 [-20, 20, -10, 10]}

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