Question

The length of the common chord of the two circles $x^2+y^2+2gx+c=0$ and
$x^2+y^2+2fy-c=0$ is

• A. $2\sqrt{\frac{(g^2-c)(f^2-c)}{g^2+f^2}}$
• B. $2\sqrt{\frac{(g^2+c)(f^2+c)}{g^2+f^2}}$
• C. $2\sqrt{\frac{(g^2-c)(f^2+c)}{g^2+f^2}}$
• D. $2\sqrt{\frac{(g^2+c)(f^2-c)}{g^2+f^2}}$

Answer 1

The correct option is C $2\sqrt{\frac{(g^2-c)(f^2+c)}{g^2+f^2}}$

$x^2+y^2+2gx+c=0$
$C_1=centre(-g,0),r_1=radius=\sqrt{g^2-c}$
and $x^2+y^2+2fy-c=0$
center$\equiv (0,-f),r_2=radius=\sqrt{f^2+c}$
So, equation of common chord is
$2gx-2fy+2c=0$
Line $AB:gx-fy+c=0$----(1)
$\therefore C_{1}P=\left|\frac{-g^2+c}{\sqrt{g^2+f^2}}\right|$
So, In $\Delta C_{1}PA,$
$AP=\sqrt{g^2-c\frac{-(c-g^2)}{g^2+f^2}}$
$=\sqrt{g^2-c}\sqrt{\frac{g^2+f^2-g^2+c}{g^2+f^2}}$
$AP=\sqrt{\frac{(g^2-c)(f^2+c)}{g^2+f^2}}$
So, length of chord $AB=2AP=2\sqrt{\frac{(g^2-c)(f^2+c)}{g^2+f^2}}$