dc.creator | Batir, Necdet | |
dc.date | 2013-05-01 | |
dc.date.accessioned | 2019-11-14T11:58:47Z | |
dc.date.available | 2019-11-14T11:58:47Z | |
dc.identifier | https://www.revistaproyecciones.cl/article/view/1124 | |
dc.identifier | 10.4067/S0716-09172013000200006 | |
dc.identifier.uri | https://revistaschilenas.uchile.cl/handle/2250/112915 | |
dc.description | We prove the following very accurate approximation formula for the factorial function:n!p ηηε-ηφπ(η + 1 + 72(3(¾¾¾!+!)2332800 - (^ +1״ This gives better results than the following approximation formula, at- n -n I 1 1 31 139 9871η! Pá V27rnne n\ n +---1--------H---,V 6 72n 6480n2 155520η3 6531840η4'which is established by the author [5] and C. Mortici [16] independently, and gives similar results with32 32 ״ n 176 128, r- (η\n 8/ΙΓ־Α 32176 ~־ η! Pá ץ/π — \ 16η4 + — η3 + — η2 + —— η Ve/ V 3 9 4053 9 405 1215which is established by C. Mortici in his very new paper [8]. | es-ES |
dc.format | application/pdf | |
dc.language | spa | |
dc.publisher | Universidad Católica del Norte. | es-ES |
dc.relation | https://www.revistaproyecciones.cl/article/view/1124/1164 | |
dc.rights | Derechos de autor 2013 Proyecciones. Journal of Mathematics | es-ES |
dc.source | Proyecciones. Journal of Mathematics; Vol 32 No 2 (2013); 173-181 | en-US |
dc.source | Proyecciones. Revista de Matemática; Vol. 32 Núm. 2 (2013); 173-181 | es-ES |
dc.source | 0717-6279 | |
dc.source | 0716-0917 | |
dc.subject | Gamma function | es-ES |
dc.subject | Stirling formula | es-ES |
dc.subject | Euler-Mascheroni constant | es-ES |
dc.subject | Harmonic numbers | es-ES |
dc.subject | Inequalities | es-ES |
dc.subject | Digamma function. | es-ES |
dc.title | An approximation formula for n! | es-ES |
dc.type | info:eu-repo/semantics/article | |
dc.type | info:eu-repo/semantics/publishedVersion | |
dc.type | Artículo revisado por pares | es-ES |