Question

How do you write the equation for a circle with radius a and touching both axes?

Answer 1

The family of circles touching both the axes in any of the four quadrants is given by `f(x, y, a) = x^2+y^2+-2ax+-2ay+a^2=0`.

Explanation:

If the radius is a, the center of the circle will be at `(+-a, +-a)`.

The four pairs of signs is indicative of the quadrant in which the

circle lies..

So, the equation is

`f(x, y, a) = (x+-a)^2+(y+-a)^2-a^2`

`=x^2+y^2+-2ax+-2ay+a^2=0`.

'a' is the parameter. for this family of circles f(x, y, a) = 0..