Find the equation of a circle passing through the origin and intercepting lengths a and b on the axes.

From the figure

AD = b units and AE = a units.

D(0, b), E(a, 0) and A(0, 0) lies on the circle. C is the centre.

The general equation of a circle: (x - h)² + (y - k)² = r²

…(i), where (h, k) is the centre and r is the radius.

Putting A(0, 0) in (i)

(0 - h)² + (0 - k)² = r²

h² + k² = r² …(ii)

Similarly putting D(0, b) in (i)

(0 - h)² + (b - k)² = r²

h² + k² + b² - 2kb = r²

r² + b² - 2kb = r²

b² - 2kb = 0

(b- 2k)b = 0

Either b = 0ork =

Similarly putting E(a, 0) in (i)

(a - h)² + (0 - k)² = r²

h² + k² + a² - 2ha = r²

r² + a² - 2ha = r²

a² - 2ha = 0

(a- 2h)a = 0

Either a = 0orh =

Centre = C

r² = h² + k²

Putting the value of r² , h and k in equation (i)

(x - h)² + (y - k)² = r²

which is the required equation.