2012 Romania Team Selection Test

Part of Romania Team Selection Test

Subcontests

(5)

1

Maximum number of balanced sets with nonempty intersections

p

q

be two given positive integers. A set of

p+q

a_1<a_2<\cdots <a_{p+q}

is said to be balanced iff

a_1,\ldots,a_p

were an arithmetic progression with common difference

q

a_p,\ldots,a_{p+q}

where an arithmetic progression with common difference

p

. Find the maximum possible number of balanced sets, so that any two of them have nonempty intersection.
Comment: The intended problem also had "

p

q

are coprime" in the hypothesis. A typo when the problems where written made it appear like that in the exam (as if it were the only typo in the olympiad). Fortunately, the problem can be solved even if we didn't suppose that and it can be further generalized: we may suppose that a balanced set has

m+n

a_1<\cdots <a_{m+n-1}

a_1,\ldots,a_m

is an arithmetic progression with common difference

p

a_m,\ldots,a_{m+n-1}

is an arithmetic progression with common difference

q

2

Atoms among 100 digit numbers

S

be a set of positive integers, each of them having exactly

100

10

representation. An element of

S

is called atom if it is not divisible by the sum of any two (not necessarily distinct) elements of

S

S

contains at most

10

atoms, at most how many elements can

S

Special orientation of planar graph

Prove that a finite simple planar graph has an orientation so that every vertex has out-degree at most 3.

5

4

5