1977 Canadian MO Problems
The seven problems were all on the same day.
Contents
Problem 1
If prove that the equation has no solutions in positive integers and
Problem 2
Let be the center of a circle and be a fixed interior point of the circle different from Determine all points on the circumference of the circle such that the angle is a maximum.
Problem 3
is an integer whose representation in base is Find the smallest positive integer for which is the fourth power of an integer.
Problem 4
Let and be two polynomials with integer coefficients. Suppose that all of the coefficients of the product are even, but not all of them are divisible by 4. Show that one of and has all even coefficients and the other has at least one odd coefficient.
Problem 5
Problem 6
Let and define Show that for all values of .
Problem 7
A rectangular city is exactly blocks long and blocks wide (see diagram). A woman lives on the southwest corner of the city and works in the northeast corner. She walks to work each day but, on any given trip, she makes sure that her path does not include any intersection twice. Show that the number of different paths she can take to work satisfies .