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IMO Shortlist 2007 problem A4

Find all functions $f: \mathbb{R}^{ + }\to\mathbb{R}^{ + }$ satisfying $f\left(x + f\left(y\right)\right) = f\left(x + y\right) + f\left(y\right)$ for all pairs of positive reals $x$ and $y$ . Here, $\mathbb{R}^{ + }$ denotes the set of all positive reals.

Proposed by Paisan Nakmahachalasint, Thailand

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Lista Tekst Dva stupca

Zadaci

#	Naslov	Oznake	Rj.
2040	IMO Shortlist 2000 problem A3	2000 alg funkcija shortlist	6
2068	IMO Shortlist 2001 problem A4	2001 alg funkcija shortlist	14
2149	IMO Shortlist 2004 problem A3	2004 alg funkcija shortlist	2
2180	IMO Shortlist 2005 problem A4	2005 alg funkcija shortlist	16
2235	IMO Shortlist 2007 problem A2	2007 alg funkcija shortlist	11
2236	IMO Shortlist 2007 problem A3	2007 alg nejednakost pow shortlist suma	9

Školjka

IMO Shortlist 2007 problem A4

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