Semigroup and Monoid Construction of Some Polygonal Numbers
Yazarlar (1)
| Bildiri Türü | Tebliğ/Bildiri |
| Bildiri Alt Türü | Özet Metin Olarak Yayınlanan Tebliğ (Uluslararası Kongre/Sempozyum) |
| Bildiri Niteliği | Alanında Hakemli Uluslararası Kongre/Sempozyum |
| Bildiri Dili | İngilizce |
| Kongre Adı | International Conference on Mathematics and Its Applications in Science and Engineering (ICMASE 2021) Salamanca University (Spain) |
| Kongre Tarihi | 01-07-2021 / 02-07-2021 |
| Basıldığı Ülke | İspanya |
| Basıldığı Şehir | Salamanca (Online) |
| Bildiri Linki | https://2021.icmase.com/ |
| Özet |
| Polygonal numbers are natural numbers that can be represented by regular geometric shapes. Polygonal numbers start from certain point and continue to increase by the same common difference. If the common difference is one, then the geometric structure is called a triangular number. If it is two, then it becomes a square; if it is three, then it becomes a pentagonal number. And so on. Many special numbers have been created by taking inspiration from polygonal numbers. Pythagoras triples, Perfect numbers, Mersenne numbers, Cullen Numbers, Woodal Numbers, Fermat numbers, Lucas numbers, Thabit numbers, etc. are such numbers. |
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