MathDB

4

Part of 2016 Danube Mathematical Olympiad

Problems(2)

Tiling A Special Board

Source: Mathematical Danube Competition 2016, Juniors P4

4/21/2022
A unit square is removed from the corner of an n×nn\times n grid where n2n \geq 2. Prove that the remainder can be covered by copies of the "L-shapes" consisting of 33 or 55 unit square, as depicted in the figure below. Every square must be covered once and the L-shapes must not go over the bounds of the grid. [asy] import geometry;
draw((-1.5,0)--(-3.5,0)--(-3.5,2)--(-2.5,2)--(-2.5,1)--(-1.5,1)--cycle); draw((-3.5,1)--(-2.5,1)--(-2.5,0));
draw((0.5,0)--(0.5,3)--(1.5,3)--(1.5,1)--(3.5,1)--(3.5,0)--cycle); draw((1.5,0)--(1.5,1)); draw((2.5,0)--(2.5,1)); draw((0.5,1)--(1.5,1)); draw((0.5,2)--(1.5,2)); [/asy]Estonian Olympiad, 2009
combinatoricstilingsromania
Problem 4, Number Theory

Source: Danube Contest 2016, Romania

10/29/2017
4.Prove that there exist only finitely many positive integers n such that (n1+1)(n2+2)...(nn+n)(\frac{n}{1}+1)(\frac{n}{2}+2)...(\frac{n}{n}+n) is an integer.
number theory