Let equation of circle be x2+y2+2gx+2fy+c=0 ...(i) This circle is orthogonal to x2+y2−2x+3y−7=0 ...(ii) x2+y2+5x−5y+9=0 ...(iii) x2+y2+7x−9y+29=0 ...(iv) By condition of orthogonalty, we have −2g+3f=c−7 ...(vi) 5g−5f=c+9 ...(vii) 7g−9f=c+29 ...(viii) from Eq. (vii) c=5g−5f−9 From Eqs. (vi) and (vii), we get −7g+8f=−16 and g−2f=10 {on subtracting Eq. (vii) from Eq. (viii) } On solving, we have g=−8,f=−9,c=−4 Required equation of circle. ∴x2+y2−16x−18y−4=0