Find the equation of the circle which passes through the points $(2, - 2)$ , and $(3, 4)$ and whose centre lies on the line $x + y = 2$ .

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Solution

Let the equation of the circle be
$x^{2} + y^{2} + 2 g x + 2 f y + c = 0$
As it passes through the point $(2, - 2)$ and $(3, 4)$
$4 + 4 + 4 g - 4 f + c = 0$ and $9 + 16 + 6 g + 8 f + c = 0$
$8 + 4 g - 4 f + c = 0$ and $25 + 6 g + 8 f + c = 0$
Substracting the two equations, we get
$17 + 2 g + 12 f = 0$
As the centre is $(- f, - g)$
$- f - g = 2$
$f + g = - 2$
$17 - 4 + 10 f = 0$
$f = - 1.3$
$g = - 0.7$
Equation of the circle is
$x^{2} + y^{2} - 1.4 x - 2.6 y + c = 0$
$4 + 4 + 5.2 - 2.8 + c = 0$
$c = - 10.4$
$x^{2} + y^{2} - 1.4 x - 2.6 y - 10.4 = 0$

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