KEKONVERGENAN BARISAN INFINITESIMAL
Dona Afriyani
Abstract
This article was to find descript methode theory with number of Sequences. Base on theory has found the relationships it, are if has a free infestimal sequences line each other, then number of intestimal konvergencies with distribution of free variable in a function at conditions.
Key words: infestimal sequences, convergen, characteristic of function
References
Bhat B, Ramdas. 1981. Modern Probability Theory. Wiley Eastern Limited: New Delhi.
Chow YS, Teicher.1988. Probability Theory. Springer_Verlag: New York.
Dudewicz EJ, Mishra, SN. 1995. Statistika Madematika Modern. ITB: Bandung.
Freund’s JE. 1999. Mathematical Statistics. Sultan Chand & Sons: New Delhi.
Gupta SC, Kapoor VK. 1982.Fundaentals of Mathematicals Statistics. Sultan Chand & Sons: New Delhi.
Syafriandi M, Putra AA. 1999. Statistika Dasar. Universitas Negeri Padang: Padang.
Laha RG, Rohatgi VK. 1979. Probability Theory. John Willey & Sons: New York
DOI:
http://dx.doi.org/10.31958/js.v2i1.12
Refbacks
There are currently no refbacks.
Copyright (c) 2016 Dona Afriyani
This work is licensed under a
Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License .
<div class="statcounter"><a title="site stats" href="http://statcounter.com/" target="_blank"><img class="statcounter" src="//c.statcounter.com/11308792/0/15602361/0/" alt="site stats"></a></div>
Indexed by:
__________________________________ ______________________ __________________
Sainstek: Jurnal Sains dan Teknologi 2085-8019 (print) | 2580-278x (online)
Email: sainstek@iainbatusangkar.ac.id
View Sainstek Stats
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License .
