Higher-order tangent and secant numbers期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

Higher-order tangent and secant numbers

Authors:	Djurdje Cvijovi?

Affiliation:	Atomic Physics Laboratory, Vin?a Institute of Nuclear Sciences, P.O. Box 522, 11001 Belgrade, Serbia

Abstract:

Keywords:	Tangent numbers Tangent numbers of order mmlsi17" class=" mathmlsrc" onclick=" submitCitation('/science?_ob=MathURL& _method=retrieve& _eid=1-s2.0-S0898122111005116& _mathId=si17.gif& _pii=S0898122111005116& _issn=08981221& _acct=C000054348& _version=1& _userid=3837164& md5=350b0ec4ce069d2d5c05bf345fc101da')" style=" cursor:pointer " alt=" Click to view the MathML source" title=" Click to view the MathML source" > formulatext" title=" click to view the MathML source" >k Secant numbers Secant numbers of order mmlsi18" class=" mathmlsrc" onclick=" submitCitation('/science?_ob=MathURL& _method=retrieve& _eid=1-s2.0-S0898122111005116& _mathId=si18.gif& _pii=S0898122111005116& _issn=08981221& _acct=C000054348& _version=1& _userid=3837164& md5=a393116ea8e46aa63488928053353502')" style=" cursor:pointer " alt=" Click to view the MathML source" title=" Click to view the MathML source" > formulatext" title=" click to view the MathML source" >k Higher-order (or, generalized) tangent and secant numbers Derivative polynomials
本文献已被 ScienceDirect 等数据库收录！