József Sándor

Notes on Number Theory and Discrete Mathematics

Print ISSN 1310–5132, Online ISSN 2367–8275

Volume 24, 2018, Number 1, Pages 43—48

DOI: 10.7546/nntdm.2018.24.1.43-48

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## Details

### Authors and affiliations

József Sándor

* Department of Mathematics, Babeș-Bolyai University
Cluj-Napoca, Romania
*

### Abstract

We offer proofs of certain inequalities for means conjectured by N. Elezovic [2].

### Keywords

- Means of two arguments
- Real functions
- Inequalities

### 2010 Mathematics Subject Classification

- 26D15
- 26D99

### References

- Alzer, H., & Qiu, S.-L. (2003) Inequalities for means in two variables, Arch. Math. (Basel), 80, 201–215.
- Elezovic, N. (2015) Asymptotic inequalities and comparison of classical means, J. Math. Ineq., 9, 1, 177–196.
- Elezovic, N. (2017, March 3) Message to the author.
- Sándor, J. (1990) On the identric and logharitmic means, Aequationes Math., 40, 261–270.
- Sándor, J. (1991) A note on certain inequalities for means, Arch. Math. (Basel), 56, 471–473.
- Sándor, J., & Trif, T. (2001) Some new inequalities for means of two arguments, Intern. J. Math. Math. Sci., 25, 525–532.
- Trif, T. (2005) Notes on certain inequalities for means of two variables, JIPAM, 6, 2, Article 43 (electronic).

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## Cite this paper

APASándor, J. (2018). Proofs of certain conjectures for means of two arguments. Notes on Number Theory and Discrete Mathematics, 24(1), 43-48, doi: 10.7546/nntdm.2018.24.1.43-48.

ChicagoSándor, József. “Proofs of Certain Conjectures for Means of Two Arguments.” Notes on Number Theory and Discrete Mathematics 24, no. 1 (2018): 43-48, doi: 10.7546/nntdm.2018.24.1.43-48.

MLASándor, József. “Proofs of Certain Conjectures for Means of Two Arguments.” Notes on Number Theory and Discrete Mathematics 24.1 (2018): 43-48. Print, doi: 10.7546/nntdm.2018.24.1.43-48.