Problems
In certain country, there are \(n\) cities. Some of them are connected by roads, roads go in both directions. It is possible to get from any city to any other city using only roads, however, for any pair of cities, there is always only one way to get from one of them to the other, there are no alternative routes.
Show that there are exactly \(n-1\) roads in this country.
If \(x\) is any positive real number and \(n \ge 2\) is a positive natural number, show that \[(1+x)^n > 1+nx\]
Anna and Bob play a game with the following rules: they both receive a positive integer number. They do not know each other’s numbers, but they do know that their numbers come one after another – they do not know which one is larger. (If Anna gets \(n\), Bob gets either \(n-1\) or \(n+1\)). Anna then asks Bob – “do you know what number I have?” If Bob does know, he has to say Anna’s number and he wins the game. If he does not, he has to say that he does not. Then, he asks Anna if she knows his number. If Anna does not know, she asks Bob. This continues until one of them finds out what is the other’s number. Assuming that both Anna and Bob know mathematics sufficiently well to be able to solve this problem, find out who wins the game and how.
For simplicity let’s assume Bob always gets the odd number and Anna always gets the even number - two consecutive numbers have opposite parity!
A real number \(y\) is such that \(y+\frac1{y}\) happens to be an integer number. Show that for any natural \(n\), it is also true that \(y^n + \frac1{y^n}\) is an integer number.
Let’s start with covering the plane with triangles of the following shape.
Now let’s try to cover the plane with convex quadrilaterals.
Draw how to tile the whole plane with figures, made from squares \(1\times 1\), \(2\times 2\), \(3\times 3\), and \(4\times 4\), where squares are used the same amount of times in the design of the figure.
Draw the plane tiling with:
squares;
rectangles \(1\times 3\);
regular triangles;
regular hexagons.
Draw the plane tiling using trapeziums of the following shape:
Here the sides \(AB\) and \(CD\) are parallel.
For any triangle, prove you can tile the plane with that triangle.