13th Vietnamese Mathematical Olympiad 1975 Problems
A1. The roots of the equation x3 - x + 1 = 0 are a, b, c. Find a8 + b8 + c8.
A2. Find all real x which satisfy (x3 + a3)/(x + a)3 + (x3 + b3)/(x + b)3 + (x3 + c3)/(x + c)3 + 3(x - a)(x - b)(x - c)/( 2(x + a)(x + b)(x + c) ) = 3/2.
B1. Find all terms of the arithmetic progression -1, 18, 37, 56, ... whose only digit is 5.
B2. Show that the sum of the maximum and minimum values of the function tan(3x)/tan3x on the interval (0, π/2) is rational.
B3. L is a fixed line and A a fixed point not on L. L' is a variable line (in space) through A. Let M be the point on L and N the point on L' such that MN is perpendicular to L and L'. Find the locus of M and the locus of the midpoint of MN.
Solution
13th VMO 1975
Problem A1 The roots of the equation x3 - x + 1 = 0 are a, b, c. Find a8 + b8 + c8.Answer
10
Solution
We have a+b+c = 0, ab+bc+ca = -1, abc = -1.
a2+b2+c2 = (a+b+c)2 - 2(ab+bc+ca) = 2. Similarly, a2b2+b2c2+c2a2 = (ab+bc+ca)2 - 2abc(a+b+c) = 1. Hence a4+b4+c4 = (a2+b2+c2)2 - 2(a2b2+b2c2+c2a2) = 2. Similarly, a4b4+b4c4+c4a4 = (a2b2+b2c2+c2a2)2 - 2a2b2c2(a2+b2+c2) = 1 - 4 = -3. Finally a8+b8+c8 = (a4+b4+c4)2 - 2(a4b4+b4c4+c4a4) = 4 + 6 = 10.
Thanks to Suat Namli
13th VMO 1975
Problem B1 Find all terms of the arithmetic progression -1, 18, 37, 56, ... whose only digit is 5.Answer
5...5 with 18k+5 digits for k = 0, 1, 2, 3, ...
Solution
The general term is 19k - 1 and this must equal 5(10n - 1)/9 for some n. Hence 5·10n = 171k - 4 = -4 mod 19. So we certainly require 10n = 3 mod 19 and hence n = 5 mod 18. Conversely if n = 5 mod 18, then 10n = 3 mod 19, so 5·10n = -4 mod 19, so 5·10n = 19h - 4 for some h. So 5(10n - 1) = 19h - 9. Now lhs and 9 are divisible by 9, so 19h must be divisible by 9, so h must be divisible by 9. Put h = 9k and we get 19k - 1 = 5(10n - 1)/9.
Thanks to Suat Namli
Labels:
Vietnam Mathematical Olympiad
Previous Article
