Find the equation of the circle passing through the points (2,3) and (–1,1) and whose centre is on the line x – 3y – 11 = 0.

Let the equation of the required circle be (x – h)²+ (y – k)² =r²

Since, the circle passes through points (2,3) and (-1,1),

(2 – h)²+ (3 – k)² =r² .................(1)

(-1 – h)²+ (1– k)² =r² ..................(2)

Since, the centre (h,k) of the circle lies on line x - 3y - 16= 0,

h - 3k =11..................... (3)

From the equation (1) and (2), we obtain

(2 – h)²+ (3 – k)² =(-1 – h)² + (1 – k)²

4 – 4h + h² +9 -6k +k² = 1 -2h +h²+1 – 2k + k²

4 – 4h +9 -6k = 1 + 2h + 1 -2k

6h + 4k =11................ (4)

On solving equations (3) and (4), we obtain h= and k= .

On substituting the values of h and k in equation (1), we get

+= r²

+= r²

+ = r²

+ = r²

r²

Thus, the equation of the required circle is

+=

+=

⇒ 4x² -28x + 49 +4y² + 20y + 25 =130

⇒ 4x² +4y² -28x + 20y - 56 =0

⇒ 4(x² +y² -7x + 5y – 14) = 0

⇒ x²+y²-7x + 5y– 14 =0