Let P be any point on the curve S = 0 such that tangents from P to x² + y2 - 2x - 4y -4 = 0 makes 60° with each other and from

Question

Let P be any point on the curve S = 0 such that tangents from P to x² + y2 - 2x - 4y -4 = 0 makes 60° with each other and from point Q perpendicular
tangents are drawn to S then
Locus of P is a circle of radius 2√3
Locus of P is a circle of radius 6
Locus of Q is a circle of radius 3√2
Locus of Q is a circle of radius 6√2

Kunduz · Accepted Answer

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