3

Part of 2009 Bosnia And Herzegovina - Regional Olympiad

Problems(3)

Regional Olympiad - FBH 2009 Grade 9 Problem 3

Source: Regional Olympiad - Federation of Bosnia and Herzegovina 2009

Is it possible in a plane mark

10

10

10

green points (all distinct) such that three conditions hold:

i)

For every red point

A

there exists a blue point closer to point

A

than any other green point

ii)

For every blue point

B

there exists a green point closer to point

B

than any other red point

iii)

For every green point

C

there exists a red point closer to point

C

than any other blue point

combinatoricsColoring

Regional Olympiad - FBH 2009 Grade 10 Problem 3

Source: Regional Olympiad - Federation of Bosnia and Herzegovina 2009

Decomposition of number

n

n

as a sum of positive integers (not neccessarily distinct). Order of addends is important. For every positive integer

n

show that number of decompositions is

2^{n-1}

Decompositioncombinatorics

Regional Olympiad - FBH 2009 Grade 11 Problem 3

Source: Regional Olympiad - Federation of Bosnia and Herzegovina 2009

n

positive integers on the board. We can add only positive integers

c=\frac{a+b}{a-b}

a

b

are numbers already writted on the board.

a)

Find minimal value of

n

, such that with adding numbers with described method, we can get any positive integer number written on the board

b)

n

, find numbers written on the board at the beginning

boardMinimalcombinatorics