Title of article
A generalization of Bertrand's test
Author/Authors
Tabatabai Adnani, A. A. Islamic Azad University, Central Tehran Branch , Reza, A. Islamic Azad University, Central Tehran Branch , Morovati, M. School of Automotive Engineering - Iran University of Science and Technology
Pages
7
From page
145
To page
151
Abstract
One of the most practical routine tests for convergence of a positive series makes
use of the ratio test. If this test fails, we can use Rabbe's test. When Rabbe's test fails the next sharper criteria which may sometimes be used is the Bertrand's test. If this test fails, we can use a generalization of Bertrand's test and such tests can be continued innitely. For simplicity, we call ratio test, Rabbe's test, Bertrand's test as the Bertrand's test of order 0, 1 and 2, respectively. In this paper, we generalize Bertrand's test in order k for natural k > 2. It is also shown that for any k, there exists a series such that the Bertrand's test of order fails, but such test of order k + 1 is useful, furthermore we show that there exists a series such that for any k, Bertrand's test of order k fails. The only prerequisite for reading this article is a standard knowledge of advanced calculus.
Keywords
Bertrand's test , Convergence test , Series test
Journal title
Astroparticle Physics
Serial Year
2013
Record number
2436129
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