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dc.contributor.advisorFellows, J. N.eng
dc.contributor.authorMoore, Carl Manfordeng
dc.date.issued1900eng
dc.date.submitted1900eng
dc.descriptionHandwritteneng
dc.descriptionThesis advisor: J.N. Fellowseng
dc.descriptionM.A. University of Missouri 1900eng
dc.description.abstractWe shall define an infinite series as a succession of series formed after sum definite law. Most generally the series are actual numbers or are at least regarded as constraints, and we are concerned with their sum. There may be either a finite or an infinite number of terms. Thus we have two theories, finite and infinite series. But it is only in the latter that the notion of convergency and divergency present themselves.eng
dc.description.digitizationDigitized at the University of Missouri--Columbia MU Libraries Digitization Lab in 2011.eng
dc.format.extent46 leaveseng
dc.identifier.merlinb24099600eng
dc.identifier.oclc25988080eng
dc.identifier.urihttp://hdl.handle.net/10355/15327eng
dc.languageEnglisheng
dc.publisherUniversity of Missourieng
dc.relation.ispartofcollectionUniversity of Missouri-Columbia. Graduate School. Theses and Dissertations.eng
dc.relation.ispartofcommunityUniversity of Missouri-Columbia. Libraries. MU Libraries Locally Digitized Materialseng
dc.subject.lcshSeries, Infiniteeng
dc.subject.lcshConvergenceeng
dc.titleConvergence of infinite serieseng
dc.typeThesiseng
thesis.degree.disciplineMathematics (MU)eng
thesis.degree.grantorUniversity of Missourieng
thesis.degree.levelMasterseng
thesis.degree.nameM.A.eng


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