Despre soluțiile unor ecuații diofantice neliniare

Articolul precedent

Articolul urmator

153

Ultima descărcare din IBN:
2024-04-26 17:05

Căutarea după subiecte
similare conform CZU

511.526/.528 (1)

Теория чисел (38)

SM ISO690:2012

. 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

EXPORT metadate:
Google Scholar
Crossref
CERIF

DataCite
Dublin Core

Science and education: new approaches and perspectives
Seria 25, Vol.3, 2023

Conferința "Ştiință și educație: noi abordări și perspective"
25, Chişinău, Moldova, 24-25 martie 2023

Despre soluțiile unor ecuații diofantice neliniare

About solutions of some non – linear diophantine equations

DOI:https://doi.org/10.46727/c.v3.24-25-03-2023.p293-298

CZU: 511.526/.528

Pag. 293-298

Universitatea Pedagogică de Stat „Ion Creangă“ din Chişinău

Disponibil în IBN: 29 octombrie 2023

Descarcă PDF

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)}.

Cuvinte-cheie
Diophantine equation, Integer solutions

Cerif XML Export

<?xml version='1.0' encoding='utf-8'?>
<CERIF xmlns='urn:xmlns:org:eurocris:cerif-1.5-1' xsi:schemaLocation='urn:xmlns:org:eurocris:cerif-1.5-1 http://www.eurocris.org/Uploads/Web%20pages/CERIF-1.5/CERIF_1.5_1.xsd' xmlns:xsi='http://www.w3.org/2001/XMLSchema-instance' release='1.5' date='2012-10-07' sourceDatabase='Output Profile'>
<cfResPubl>
<cfResPublId>ibn-ResPubl-189410</cfResPublId>
<cfResPublDate>2023</cfResPublDate>
<cfVol>Seria 25, Vol.3</cfVol>
<cfStartPage>293</cfStartPage>
<cfISBN> 978-9975-46-787-2</cfISBN>
<cfURI>https://ibn.idsi.md/ro/vizualizare_articol/189410</cfURI>
<cfTitle cfLangCode='RO' cfTrans='o'>Despre soluțiile unor ecuații diofantice neliniare </cfTitle>
<cfKeyw cfLangCode='RO' cfTrans='o'>Diophantine equation; Integer solutions</cfKeyw>
<cfAbstr cfLangCode='EN' cfTrans='o'><p>In this paper, it is show that the Diophantine exponential equation: has exactly three non &ndash; negative integer solutions {(3,0,3),(2,1,4),(8,2,20)}, the Diophantine exponential equation: has exactly three non&ndash;negative integer solutions:{(3,0,3), (1,1,4),(7,2,18)}, the Diophantine exponential equation has exactly two non&ndash;negative integer solutions:{(3,0,3), (6,2,17)}.</p></cfAbstr>
<cfResPubl_Class>
<cfClassId>eda2d9e9-34c5-11e1-b86c-0800200c9a66</cfClassId>
<cfClassSchemeId>759af938-34ae-11e1-b86c-0800200c9a66</cfClassSchemeId>
<cfStartDate>2023T24:00:00</cfStartDate>
</cfResPubl_Class>
<cfResPubl_Class>
<cfClassId>e601872f-4b7e-4d88-929f-7df027b226c9</cfClassId>
<cfClassSchemeId>40e90e2f-446d-460a-98e5-5dce57550c48</cfClassSchemeId>
<cfStartDate>2023T24:00:00</cfStartDate>
</cfResPubl_Class>
<cfPers_ResPubl>
<cfPersId>ibn-person-10580</cfPersId>
<cfClassId>49815870-1cfe-11e1-8bc2-0800200c9a66</cfClassId>
<cfClassSchemeId>b7135ad0-1d00-11e1-8bc2-0800200c9a66</cfClassSchemeId>
<cfStartDate>2023T24:00:00</cfStartDate>
</cfPers_ResPubl>
</cfResPubl>
<cfPers>
<cfPersId>ibn-Pers-10580</cfPersId>
<cfPersName_Pers>
<cfPersNameId>ibn-PersName-10580-2</cfPersNameId>
<cfClassId>55f90543-d631-42eb-8d47-d8d9266cbb26</cfClassId>
<cfClassSchemeId>7375609d-cfa6-45ce-a803-75de69abe21f</cfClassSchemeId>
<cfStartDate>2023T24:00:00</cfStartDate>
</cfPersName_Pers>
</cfPers>
</CERIF>