12th Swedish Mathematical Society Problems 1972



1.  Find the largest real number a such that x - 4y = 1, ax + 3y = 1 has an integer solution.
2.  A rectangular grid of streets has m north-south streets and n east-west streets. For which m, n > 1 is it possible to start at an intersection and drive through each of the other intersections just once before returning to the start?
3.  A steak temperature 5o is put into an oven. After 15 minutes, it has temperature 45o. After another 15 minutes it has temperature 77o. The oven is at a constant temperature. The steak changes temperature at a rate proportional to the difference between its temperature and that of the oven. Find the oven temperature.


4.  Put x = log102, y = log103. Then 15 < 16 implies 1 - x + y < 4x, so 1 + y < 5x. Derive similar inequalities from 80 < 81 and 243 < 250. Hence show that 0.47 < log103 < 0.482.
5.  Show that ∫ 01 (1/(1 + xn)) dx > 1 - 1/n for all positive integers n.
6.  a1, a2, a3, ... and b1, b2, b3, ... are sequences of positive integers. Show that we can find m < n such that am ≤ an and bm ≤ bn

Solutions

Problem 1
Find the largest real number a such that x - 4y = 1, ax + 3y = 1 has an integer solution.
Answer
1
Solution
For a = 1, we have x = 1, y = 1. Suppose a > 1. Then a(4y+1) = 1-3y, so y = -(a-1)/(4a+3) < 0. But a-1 < 4a+3 (since a is positive), so y > -1. Contradiction. So there are no solutions with a > 1.
Thanks to Suat Namli

Problem 2
A rectangular grid of streets has m north-south streets and n east-west streets. For which m, n > 1 is it possible to start at an intersection and drive through each of the other intersections just once before returning to the start?
Answer
mn even
Solution
Suppose a path is possible. Let N,S,E,W be the number of moves north, south, east, west. Then the total number of moves N + S + E + W = mn. Since the path is closed we have E = W and N = S. Hence N + S + E + W is even and hence mn is even.
wlog suppose n is even. The diagram shows one way of making the drive using a comb shape.
Problem 3
A steak temperature 5o is put into an oven. After 15 minutes, it has temperature 45o. After another 15 minutes it has temperature 77o. The oven is at a constant temperature. The steak changes temperature at a rate proportional to the difference between its temperature and that of the oven. Find the oven temperature.
Answer
205o
Solution
The steak temperature is obviously A - Be-kt, where A is the oven temperature, B and k are constants and t is the time. (One can write down the differential equation and solve it). Put h = e-15k.
So we have A - B = 5, A - Bh = 45, A - Bh2 = 77. Subtracting, B(1 - h) = 40, Bh(1 - h) = 32. Hence h = 4/5, B = 200, A = 205.

Problem 5
Show that ∫ 01 (1/(1 + xn)) dx > 1 - 1/n for all positive integers n.
Solution
We have 1/(1+xn) = 1 - xn/(1+xn) > 1 - xn (for x in (0,1)). Hence ∫ 01 (1/(1 + xn)) dx > 1 - ∫ 01 xn dx = 1 - 1/(n+1) > 1 - 1/n.
Thanks to Thomas Linhart


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