The equation of the circle in the third quadrant touching each co-ordinate axis at a distance of 2 units from the origin is

The equation of the circle in the first quadrant touching each co-ordinate axis at a distance of one unit from the origin is:

The equation of the circle in the first quadrant touching each co-ordinate axis at a distance of one unit from the origing is :

Find the equation of the circle which lies in the first quadrant and touching each-co ordinate-axis at a distance of 2 units from the origin.

Find the equation of the circle which lies in the first quadrant and touching each-co ordinate-axis at a distance of 2 units from the origin.

Solve the following:Find the equation of the circle which lies in the first quadrant and touching both co-ordinate axes at a distance of 2 units from the origin.

The equation of the circle in the first quadrant which touches each axis at a distance 5 from the origin, is

The equation of the circle in the first quadrant which touches each axis at a distance 5 from the origin, is

The equation of the circle in the first quadrant which touches each axis at a distance 5 from the origin, is

The equation of the circle in the first quadrant which touch the co-ordinate axes and the line 3x+4y=12 is