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    Hubungan Deret Bertingkat Berdasarkan Bilangan Eulerian dengan Operator Beda

    Rank series defined as: is a generalization of the fixed rank series (the sum of powers), in which its closed solution has been found empirically by Jacob Bernoulli in 1731. This paper will explore the relationship between rank series and differential operator. To see this relationship, examples for the case m = 1.2 and α = 1.2. are provided.

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    Hubungan Deret Bertingkat Berdasarkan Bilangan Eulerian dengan Operator Beda

    Rank series defined as: is a generalization of the fixed rank series (the sum of powers), in which its closed solution has been found empirically by Jacob Bernoulli in 1731. This paper will explore the relationship between rank series and differential operator. To see this relationship, examples for the case m = 1.2 and α = 1.2. are provided.

    Zugriff

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    Hubungan Deret Bertingkat Berdasarkan Bilangan Eulerian dengan Operator Beda

    Rank series defined as: is a generalization of the fixed rank series (the sum of powers), in which its closed solution has been found empirically by Jacob Bernoulli in 1731. This paper will explore the relationship between rank series and differential operator. To see this relationship, examples for the case m = 1.2 and α = 1.2. are provided.

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    Titel:

    Hubungan Deret Bertingkat Berdasarkan Bilangan Eulerian dengan Operator Beda

    Beteiligte:

    Alexander Agung Santoso Gunawan (Autor:in)

    Erschienen in:

    ComTech, Vol 2, Iss 1, Pp 154-159 (2011)

    Erscheinungsdatum:

    2011

    ISSN:

    2087-1244 , 2476-907X

    DOI:

    https://doi.org/10.21512/comtech.v2i1.2727

    Medientyp:

    Aufsatz (Zeitschrift)

    Format:

    Elektronische Ressource

    Sprache:

    Unbekannt

    Schlagwörter:

    rank series, fixed rank series, differential operator , Technology , T , Engineering (General). Civil engineering (General) , TA1-2040 , Science , Q

    Metadata by DOAJ is licensed under ​CC BY-SA 1.0

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