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Ultima descărcare din IBN: 2024-04-26 17:05 |
Căutarea după subiecte similare conform CZU |
511.526/.528 (1) |
Теория чисел (38) |
![]() ŢARĂLUNGĂ, Boris. Despre soluțiile unor ecuații diofantice neliniare . In: Science and education: new approaches and perspectives, Ed. 25, 24-25 martie 2023, Chişinău. Chişinău: (CEP UPSC, 2023, Seria 25, Vol.3, pp. 293-298. ISBN 978-9975-46-787-2. DOI: https://doi.org/10.46727/c.v3.24-25-03-2023.p293-298 |
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Science and education: new approaches and perspectives Seria 25, Vol.3, 2023 |
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Conferința "Ştiință și educație: noi abordări și perspective" 25, Chişinău, Moldova, 24-25 martie 2023 | ||||||
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DOI:https://doi.org/10.46727/c.v3.24-25-03-2023.p293-298 | ||||||
CZU: 511.526/.528 | ||||||
Pag. 293-298 | ||||||
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Rezumat | ||||||
In this paper, it is show that the Diophantine exponential equation: has exactly three non – negative integer solutions {(3,0,3),(2,1,4),(8,2,20)}, the Diophantine exponential equation: has exactly three non–negative integer solutions:{(3,0,3), (1,1,4),(7,2,18)}, the Diophantine exponential equation has exactly two non–negative integer solutions:{(3,0,3), (6,2,17)}. |
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Cuvinte-cheie Diophantine equation, Integer solutions |
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