Consider the equation of circle. x2+y2−6x−4y+4=0 Its centre is (3,2) and radius is r=3 Let P(h,k) be the point on the line 4x−3y=6 from which the tangent are drawn to circle as shown in figure below.
Let the angle between the tangents be 2α . Therefore, 2α=tan−1
(h−3)2+(k−2)2=25 h2+k2−6h−4k=12 …… (I) Now (h,k) lies on 4x−3y=6 Hence, 4h−3k=6…… (II) Solve equation (I) and (II). When k=6 then h=6 And When k=−2 then h=0.