A circle with centre at the origin and radius equal to a meets the axis of x and A and B. P(α) and Q(β) are two points on this circle so that α−β=2γ, where γ is a constant. The locus of the point of intersection of AP and BQ is
Coordinates of A are (–a, 0) and of P are (acosα,asinα)
∴ Equation of AP is y=asinαa(cosα+1)(x+a)⇒y=tan(α2)(x+a)→(1)
Similarly equation of BQ = y=asinβa(cosβ−1)(x−a)⇒y=−cot(β2)(x−a)→(2)
From (1) and (2), tan(α2)=yα+x,tan(β2)=a−xy
Now α−β=2γ
⇒tanγ=tan(α/2)−tan(β/2)(a+x)y+(a−x)y=yα+x−a−xy1+yα+x.a−xy⇒tanγ=tan(α/2)−tan(β/2)1+tan(α/2)tan(β/2)=x2+y2−a22ay⇒x2+y2−2aytanγ=a2 which is required locus.