Moments equalities for nonnegative integer-valued random variables

Author

Rifi, Muhammad I.

Source

IUG Journal of Natural Studies

Issue

Vol. 11, Issue 1 (31 Jan. 2003), pp.1-6, 6 p.

Publisher

The Islamic University-Gaza Deanship of Research and Graduate Affairs

Publication Date

2003-01-31

Country of Publication

Palestine (Gaza Strip)

No. of Pages

6

Main Subjects

Mathematics

Topics

Abstract EN

We present and prove two theorems about equalities for the nth moment of nonnegative integer-valued random variables.

These equalities generalize the well-known equality for the first moment of a nonnegative integer-valued random variable, X, in terms of its cumulative distribution function, or in terms of P (X > x).

American Psychological Association (APA)

Rifi, Muhammad I.. 2003. Moments equalities for nonnegative integer-valued random variables. IUG Journal of Natural Studies،Vol. 11, no. 1, pp.1-6.
https://search.emarefa.net/detail/BIM-162707

Modern Language Association (MLA)

Rifi, Muhammad I.. Moments equalities for nonnegative integer-valued random variables. IUG Journal of Natural Studies Vol. 11, no. 1 (Jan. 2003), pp.1-6.
https://search.emarefa.net/detail/BIM-162707

American Medical Association (AMA)

Rifi, Muhammad I.. Moments equalities for nonnegative integer-valued random variables. IUG Journal of Natural Studies. 2003. Vol. 11, no. 1, pp.1-6.
https://search.emarefa.net/detail/BIM-162707

Data Type

Journal Articles

Language

English

Record ID

BIM-162707