The locus of the foot of the perpendicular, from the origin to chords of the circle `x^2+y^2- 4x -6y - 3 = 0` which subtend a right angle at the origin, is:

The equation of the given circle is
`x^(2)+y^(2)+2gx+2fy+c` (1)
Let P(h,k) be the foot of perpendicular drawn from the origin to the chord LM of the circle S.
Slope, of `OP =(k)/(h)`
`:. ` Slope of `LM =- (h)/(k)`
Therefore, the equation of LM is
`y-k=-(h)/(k)(x-h)`
or `ky-k^(2)= -kx+h^(2)`
or `hx+ky=h^(2)=k^(2)` (2)
Now, the combined equations of lines joining the points of intersection of (1) and (2) to the origin can be obtained by making (1) homogeneous with the helop of (2) as follows `,`
`x^(2)+y^(2)+(2gx + 2fy)((hx+ky)/(h^(2)+k^(2)))+c((hx_ky)/(h^(2)+k^(2)))=0`
or `(h^(2)+k^(2))^(2)(x^(2)+y^(2))+(h^(2)+k^(2))(2gx+2fy)(hx+ky)+c(hx+ky)^(2)=0` (3)

Equation (3) represents the combined equation of OL and OM.
But `/_ LOM =90^(@)`.
Therefore, from (3), we must have
Coeff. of `x^(2) +` Coeff. of `y^(2)=0`
or `(h^(2)+k^(2))^(2)+2gh(h^(2)+k^(2))+ch^(2)+(h^(2)+k^(2))^(2)+2fk(h^(2)+k^(2))+ck^(2)=0`
or `h^(2)+k^(2)+gh+fk+(c)/(2)=0`
Therefore, the locus of (h,k) is `x^(2)+y^(2)+gx+fy+(c)/(2)=0`