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MEMO 2008 ekipno problem 6

On a blackboard there are $n \geq 2, n \in \mathbb{Z}^{+}$ numbers. In each step we select two numbers from the blackboard and replace both of them by their sum. Determine all numbers $n$ for which it is possible to yield $n$ identical number after a finite number of steps.

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Lista Tekst Dva stupca

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#	Naslov	Oznake	Rj.
2523	3 hrpe novcica	komb	5
2522	brojevi u krugu	komb	5
2511	skakavac 2012 trece kolo ss1 2	komb skakavac	3
2415	MEMO 2008 pojedinačno problem 2	2008 MEMO komb ploča	8
2401	skakavac 2012 prvo kolo ss3 2	komb skakavac	0
1959	IMO Shortlist 1997 problem 3	1997 komb shortlist	0

Školjka

MEMO 2008 ekipno problem 6

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