<p>http://www.newtheory.org ISSN: 2149-1402</p><p>Received: 00.00.20xx Year: 2018, Number: 20, Pages: 00-00 Published: 00.00.2018 Original Article</p><p>Title of Paper Can Be Written Here (14 pt)</p><p>Birinci Acayip Yazar1,* <[email protected]> İkinci Fena Bozar2 <[email protected]> Üçüncü Tam Okur1 <[email protected]> (12 pt)</p><p>(Please write full names, do not use initials.)</p><p>1Abece University, Xyeze Department, 06100 Ankara, Turkey. 2Gaziosmanpasa University, Mathematics Department, 60240 Tokat, Turkey. (10pt)</p><p>Abstract – Abstract must be written here (10 pt) . Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. Abstract must be written here. (10 pt)</p><p>Keywords – Writing paper, journal, abstract, table design.(10 pt)</p><p>1 Section One (14 pt)</p><p>Introduction (12 pt). Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. </p><p>Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction. Introduction The remainder of this article is organized as follows. </p><p>*Corresponding Author. Journal of New Theory 20 (2018) xx-yy 2</p><p>Section 2 gives account of previous work. Our new and exciting results are described in Section 3. Finally, Section 4 gives the conclusions.</p><p>2 Section Two (14 pt)</p><p>Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. Section two. vv Section two. Section two. Section two. Section two. Section two. Section two. vv Section two. Section two. Section two. Section two. vvv Section two. Section two. </p><p>Table 1. The correct classification values of LVQ and SLDP for real datasets. (10pt)</p><p>LVQ SLDP Datasets (%) (%) Iris 95,33 96,00 Parkinson 60,00 88,72 Spect Heart 53,18 81,27 Statlog (Landsat) 20,45 68,47</p><p>Definition 2.1. [2] Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1. Definition 2.1.</p><p>0 0 2 2 2 2 2 0 0 2 0 2 0 1 0 2 2 2 2 0 0 0 1 0 2 2 0 2 2 1 2 2 2 1 0 2 2 2 2 0 2 2 2 2 1 1 2 0 1 1 2 1 2 1 1 2 0 1 2 1 2 2 0 1 2 1 2 1 2 2 2 1 1 1 1 0 2 1 1 1 1 1 2 1 0 0 1 2 2 1 1 1 1 1 1 1 0 0 0 0 1 0 0 0 1 1 0 1 1 1 0 1 0 0 0 0 1 1 0 0 1 0 0 1 1 0 0 0 1 1 0 0 0 1 0 0 1 1 0 1 0 0 1 1 0</p><p>Figure 1. The classification maps of SLDP (10pt)</p><p>Lemma 2.2. [3] Lemma lemma lemma lemma lemma lemma lemma lemm lemma lemma lemma lemma lemma lemma lemma lemma.</p><p>Proof. Proof of lemma. Proof of lemma. Proof of lemma. Proof of lemma. Proof of lemma. Proof of lemma. Proof of lemma.</p><p>Theorem 2.3. [1] Theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem. Journal of New Theory 20 (2018) xx-yy 3</p><p>Proof. Proof of Teorem Proof of Teorem. Proof of Teorem. Proof of Teorem. Proof of Teorem. Proof of Teorem. Proof of Teorem.</p><p>2.1 Subsection Two One (12 pt)</p><p>Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One Subsecion Two One.</p><p>Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. Definition 2.4. </p><p>2.2 Subsection Two Two (12 pt)</p><p>Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two Subsecion Two Two </p><p>3 Section Three (14 pt)</p><p>Section Three Section Three Section Three Section Three Section Three Section Three Section Three Section Three Section Three Section Three Section Three.</p><p>Definition 3.1. Definition 3.1. Definition 3.1. Definition 3.1. Definition 3.1. Definition 3.1. Definition 3.1. Definition 3.1. </p><p>Theorem 3.2. Theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem theorem.</p><p>Proof. Proof of Teorem Proof of Teorem. Proof of Teorem. Proof of Teorem. Proof of Teorem. Proof of Teorem. Proof of Teorem.</p><p>4 Section Four (14 pt)</p><p>Results results results results results results results results results results results results results results results results results results.</p><p>Acknowledgements (14 pt)</p><p>Acknowledgements, acknowledgements, acknowledgements, acknowledgements, acknowledgements, acknowledgements, acknowledgements, acknowledgements. Journal of New Theory 20 (2018) xx-yy 4</p><p>References (14 pt)</p><p>[1] D. Dubois, H. Prade, Fuzzy sets and systems: theory and applications, Academic Press, New York, 1980. [2] D. A. Molodtsov, Soft set theory first results, Computers and Mathematics with Applications 37 (1999) 19-31. [3] D. Pei, D. Miao, From soft sets to information systems, In: Proceedings of Granular Computing, IEEE 2005 (Eds: X. Hu, Q. Liu, A. Skowron, T.Y. Lin, R.R. Yager, B. Zhang) Volume: 2, pp: 617- 621. [4] Z. Zhang, A rough set approach to intuitionistic fuzzy soft set based decision making, Applied Mathematical Modelling, DOI:10.1016/j.apm.2011.11.071. [5] Fuzzy Logic, http://plato.stanford.edu/entries/logic-fuzzy/ (March 8, 2014).</p>