3rd Austrian-Polish Mathematics Competition 1980 Problems
1. A, B, C are infinite arithmetic progressions of integers. {1, 2, 3, 4, 5, 6, 7, 8} is a subset of their union. Show that 1980 also belongs to their union.
2. 1 = a1 < a2 < a3 < ... is an infinite sequence of integers such that an < 2n-1. Show that every positive integer is the difference of two members of the sequence.
3. P is an interior point of a tetrahedron. Show that the sum of the six angles subtended by the sides at P is greater than 540o.
4. [Missing]
Solutions
3rd APMC 1980 Problem 1
A, B, C are infinite arithmetic progressions of integers. {1, 2, 3, 4, 5, 6, 7, 8} is a subset of their union. Show that 1980 also belongs to their union.
Solution
If any two of 4, 6, 8 belong to the same set, then we are done. So assume (wlog) that 4 ∈ A, 6 ∈ B and 8 ∈ C. Then 5 cannot belong to A or B or we are done, so 5 ∈ C. Similarly 3 cannot belong to A or B or we are done, so 3 ∈ C. But if 3 and 5 are in C, then so is 7. Since 7 and 8 are in C, then so are all integers > 8 and hence 1980.
Thanks to Suat Namli
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