x2−6y2x2−4y2=9 Consider the line, x−y=23 On solving (i) and (iii), we get only x=3,y=23 Hence (3,23) is the point of contact of conic (i), and line (iii) On solving (ii) and (iii), we get only x=3, y=23 Hence (3,23) is also the point of contact of conic (ii) and line (iii). Hence line (iii) is the common tangent to both the given conics.