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181   $ctxt$2rdacontent
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200 10$aHungarian problem book III $ebased on the Eo?tvo?s Competition, 1929-1943 /$fcompiled by G. Ha?jos, G. Neukomm, and J. Sura?nyi ; translated and edited by Andy Liu$b[electronic resource]
210  1$aWashington :$cMathematical Association of America,$d2001.
215   $a1 online resource (xviii, 142 pages) $cdigital, PDF file(s)
225 0 $aAnneli Lax new mathematical library ;$vv. 42
300   $aTitle from publisher's bibliographic system (viewed on 02 Oct 2015).
311   $a0-88385-644-1 
327   $aEo?tvo?s mathematics competition problems -- Combinatorics problems -- Number theory problems -- Algebra problems -- Geometry problems, part I -- Geometry problems, part II.
330   $aThe Eo?tvo?s Mathematics Competition is the oldest high school mathematics competition in the world, with a tradition dating back to 1894. In 1963, the first two of the Hungarian problem books were published in the New Mathematical Library by the MAA. This book is continuation of those volumes, taking the competition up through 1943.  In the Hungarian Problem Book III, forty-five problems in all are presented in six chapters. Problems are classified into five groups: combinatorics, number theory, algebra, and geometry (in two parts). Multiple solutions are presented along with background material providing generalizations and remarks about the problems.   This book is intended for beginners, although the experienced student will find much here. Beginners are encouraged to work the problems in each section and then to compare their results against the solutions presented in the book. They will find much material in each section to aid them in improving their problem-solving techniques.
410  0$aAnneli Lax New Mathematical Library
517 3 $aHungarian problem book 3
606   $aMathematics$vProblems, exercises, etc
615  0$aMathematics
676   $a510/.76
700   $aHajo?s$b Gyo?rgy$0366360
702   $aNeukomm$b G.
702   $aSura?nyi$b Ja?nos$f1918-
702   $aLiu$b Chiang-Fung Andrew
801  0$bUkCbUP
801  1$bUkCbUP
906   $aBOOK
912   $a9910790364603321
996   $aHungarian problem book III$91108228
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