On two derivative sequences from scaled geometric mean sequence terms.
Journal article
Larcombe, Peter J., Rabago, Julius, F. T. and Fennessey, Eric J. 2018. On two derivative sequences from scaled geometric mean sequence terms. Palestine Journal of Mathematics.
Authors | Larcombe, Peter J., Rabago, Julius, F. T. and Fennessey, Eric J. |
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Abstract | The so called geometric mean sequence recurrence, with additional scaling variable, produces a sequence for which the general term has a known closed form. Two types of derivative sequence—comprising products of such sequence terms—are examined. In particular, the general term closed forms formulated are shown to depend strongly on a mix of three existing sequences, from which sequence growth rates are deduced and other results given. |
Keywords | Geometric mean sequence |
Year | 2018 |
Journal | Palestine Journal of Mathematics |
Publisher | Palestine Polytechnic University |
ISSN | 2219-5688 |
Web address (URL) | http://hdl.handle.net/10545/623238 |
http://creativecommons.org/licenses/by/4.0/ | |
hdl:10545/623238 | |
Publication dates | 2018 |
Publication process dates | |
Deposited | 18 Dec 2018, 13:37 |
Contributors | University of Derby |
File | File Access Level Open |
File | File Access Level Open |
File | File Access Level Open |
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https://repository.derby.ac.uk/item/95591/on-two-derivative-sequences-from-scaled-geometric-mean-sequence-terms
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