Equation of a circle / polar coordinates

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In polar coordinates, the equation of a circle is defined with 'a' as the radius and (r0, φ) as the center. The variables 'r' and 'θ' represent points that lie on the circumference of the circle, not inside it. This is analogous to rectangular coordinates, where (x, y) points define the circle's boundary. Clarification was provided that the distinction between points on the circle versus inside it is important. The discussion emphasizes understanding the relationship between polar coordinates and the geometric representation of circles.
Marioqwe
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I was looking at the equation of a circle in polar coordinates on wikipedia,

http://en.wikipedia.org/wiki/Polar_coordinate_system

and I understand that a is the radius of the circle, and that (r0, phi) is the center of the circle. But I don't see what the r and theta refer to :(.
 
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Marioqwe said:
... I understand that a is the radius of the circle, and that (r0, phi) is the center of the circle. But I don't see what the r and theta refer to :(.
r and θ are just the variables in the equation.

Just like in rectangular coordinates, given a center (h, k) and radius r,
(x - h)2 + (y - k)2 = r2
is the equation of the circle, and x and y are the variables.

Or am I misunderstanding your question? :confused:
 
So do they just represent a point inside the circle?
 
Marioqwe said:
So do they just represent a point inside the circle?
No, they represent a set of points that lie on the circle, not inside.
 
What do you mean by [[/B]on[/B]? And by the way; sorry for giving you a hard time. English is not my first language.
 
See attached picture. The red point is on the circle, while the blue point is inside the circle.
 

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