P

is a point on the circumference of a circle radius

r

which touches another circle radius

2 r

on the inside. The smaller circle rolls, without slipping, around the inner circumference of the larger circle.

Herbert of Sha Tin College, Hong Kong sent a very good solution to this problem. Well done Herbert.

The point $P$ is a fixed point on the smaller circle. The point $P_{o}$ is the position of $P$ when $P$ is at the point of contact between the two circles. Consider the general position where the point of contact is the point $C$ but here we do not assume that $P_{1}$ is the position of the point $P$ .

By showing that the lengths of the arcs

P_{o} C

and

P_{1} C

are equal, we shall prove that

P_{1}

must be the position of the point

P

when the point of contact is at

C

. Hence we shall show that

P

must always lie on the diameter of the large circle through

{OP}_{o}

Let $M$ be the centre of the small circle, then $MO = {MP}_{1} = MC = r$ and the triangle ${OMP}_{1}$ is isosceles. Hence

$∠ {MOP}_{1} = ∠ {MP}_{1} O = θ$

$∠ P_{1} MC = π - (π - 2 θ) = 2 θ .$

Hence, using the formula " arc length = radius x angle at the centre of the circle":

$P_{0} C = (2 r) (θ) = 2 r θ$

and

$P_{1} C = (r) (2 θ) = 2 r θ .$

Hence $P$ must be at the point $P_{1}$ because the circle rolls without slipping, which shows that the locus of P is the diameter of the larger circle.