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Counting subgroup formula for the groups formed by cartesian Product of the generalized quaternion group with cyclic group of order two
The main goal of this note is to determine an explicit formula of finite group formed by taking the Cartesian product of the generalized quaternion group of two power order with a order two cyclic group
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| Format: | Conference Proceeding |
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| Published: |
2015
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| LEADER | 00000njm a2000000a 4500 | ||
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| 001 | oai:repository.ui.edu.ng:123456789/7899 | ||
| 042 | |a dc | ||
| 720 | |a EniOluwafe, M. |e author | ||
| 260 | |c 2015 | ||
| 520 | |a The main goal of this note is to determine an explicit formula of finite group formed by taking the Cartesian product of the generalized quaternion group of two power order with a order two cyclic group | ||
| 024 | 8 | |a ui_inpro_enioluwafe_counting_2015 | |
| 024 | 8 | |a In: Payne, V. F., Ajayi, D. O. A. and Adeyemo, H. P.(eds.) Proceedings of Conference in honour of Professor S.A. Ilori, on Perspectives and Developments in Mathematics, held between 12th January – 13th January, pp. 143–146 | |
| 024 | 8 | |a http://ir.library.ui.edu.ng/handle/123456789/7899 | |
| 653 | |a Quaternion groups | ||
| 653 | |a Cyclic subgroups | ||
| 653 | |a Cartesian products | ||
| 653 | |a Number of subgroups | ||
| 245 | 0 | 0 | |a Counting subgroup formula for the groups formed by cartesian Product of the generalized quaternion group with cyclic group of order two |