Maximum of a function

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Description

In this article, the author presents a generalization of a certain Putnam problem.

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4 p.

Creation Information

Anghel, Nicolae January 2014.

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This article is part of the collection entitled: UNT Scholarly Works and was provided by UNT College of Arts and Sciences to Digital Library, a digital repository hosted by the UNT Libraries. It has been viewed 143 times . More information about this article can be viewed below.

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UNT College of Arts and Sciences

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Description

In this article, the author presents a generalization of a certain Putnam problem.

Physical Description

4 p.

Source

  • Recreaţii Matematice: Revistă de matematică pentru elevi şi profesori, 2014, Romania: Asociaţia Recreaţii Matematice, pp. 40-41

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Publication Information

  • Publication Title: Recreaţii Matematice: Revistă de matematică pentru elevi şi profesori
  • Volume: XVI
  • Issue: 1
  • Page Start: 40
  • Page End: 41
  • Peer Reviewed: Yes

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UNT Scholarly Works

Materials from the UNT community's research, creative, and scholarly activities and UNT's Open Access Repository. Access to some items in this collection may be restricted.

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  • January 2014

Added to The UNT Digital Library

  • Nov. 13, 2014, 7:28 a.m.

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Total Uses: 143

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Anghel, Nicolae. Maximum of a function, article, January 2014; [Romania]. (digital.library.unt.edu/ark:/67531/metadc407881/: accessed October 18, 2018), University of North Texas Libraries, Digital Library, digital.library.unt.edu; crediting UNT College of Arts and Sciences.