18th Canadian Mathematical Olympiad Problems 1986



18th Canadian Mathematical Olympiad Problems 1986

1.  The triangle ABC has angle B = 90o. The point D is taken on the ray AC, the other side of C from A, such that CD = AB. ∠CBD = 30o. Find AC/CD.


2.  Three competitors A, B, C compete in a number of sporting events. In each event a points is awarded for a win, b points for second place and c points for third place. There are no ties. The final score was A 22, B 9, C 9. B won the 100 meters. How many events were there and who came second in the high jump?
3.  A chord AB of constant length slides around the curved part of a semicircle. M is the midpoint of AB, and C is the foot of the perpendicular from A onto the diameter. Show that angle ACM does not change.
4.  Show that (1 + 2 + ... + n) divides (1k + 2k + ... + nk) for k odd.
5.  The integer sequence a1, a2, a3, ... is defined by a1 = 39, a2 = 45, an+2 = an+12 - an. Show that infinitely many terms of the sequence are divisible by 1986.

Solutions

Problem 1

The triangle ABC has ∠B = 90o. The point D is taken on the ray AC, the other side of C from A, such that CD = AB. The ∠CBD = 30o. Find AC/CD.
Solution

Let angle ACB = x. Wlog we may take AC = 1. Then BC = cos x and AB = sin x. So CD = sin x. Now apply the sine rule to the triangle BCD: cos x/(sin(x-30o) = sin x/sin 30o. Hence cos x = √3 sin2x - sin x cos x. Hence (1 + sin x)2(1 - sin2x) = 3 sin4x. So 4 sin4x + 2 sin3x - 2 sin x - 1 = 0. Factorising, (2 sin3x - 1)(2 sin x + 1) = 0. But x must lie between 0 and 90o, so we cannot have sin x = -1/2. Hence sin x = 1/21/3. Hence the ratio AC/CD = 21/3.

Problem 2

Three competitors A, B, C compete in a number of sporting events. In each event a points is awarded for a win, b points for second place and c points for third place. There are no ties. The final score was A 22, B 9, C 9. B won the 100 meters. How many events were there and who came second in the high jump?
Solution

A 5, 5, 5, 5, 2; B 5, 1, 1, 1, 1; C 2, 2, 2, 2, 1. A must have come second in the event in which B won. So C came second in every other event.

Problem 3

A chord AB of constant length slides around the curved part of a semicircle. M is the midpoint of AB, and C is the foot of the perpendicular from A onto the diameter. Show that angle ACM does not change.
Solution

Let O be the center of the semicircle. Angle OMA = angle OCA = 90o, so OMAC is cyclic. Hence angle ACM = angle AOM, which is independent of the position of the chord since it has constant length.

Problem 4

Show that (1 + 2 + ... + n) divides (1k + 2k + ... + nk) for k odd.
Solution

Assume k is odd and let N = (1k + 2k + ... + nk). We have 2N = (nk + 1k) + ( (n-1)k + 2k) + ... + (1k + nk). But expanding (n+1 - m)k by the binomial theorem we find that it is (-m)k mod n+1 and hence mk + (n+1 - m)k is divisible by n+1. So n+1 divides 2N. Similarly, we may write 2N = 2nk + ( (n-1)k + 1k) + ( (n-2)k + 2k) + ... + (1k + (n-1)k) and each term is divisible by n. But n and n+1 are relatively prime, hence n(n+1) divides 2N. Hence 1 + 2 + ... + n = n(n+1)/2 divides N.

Problem 5

The integer sequence a1, a2, a3, ... is defined by a1 = 39, a2 = 45, an+2 = an+12 - an. Show that infinitely many terms of the sequence are divisible by 1986.
Solution

We find a3 = 1986. Define bn = residue of an mod 1986. Then bn satisfies the relation bn+2 = bn+12 - bn mod 1986. Now there are only 19862 possibile values for the pair (bn, bn+1), so some pair must repeat. But any pair of consecutive values of bn determines the rest of the sequence and all preceding terms of the sequence (since bn = bn+12 - bn+2). So the values of bn must be periodic for some period N <= 19862. We know that the value 0 occurs for n = 3, so it must occur infinitely often.
Comment. But it takes a while, the values 39, 45 next occur at b1339 , b1340 .


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