The Journal of the Indian Mathematical Society

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On the Generalized Newtonian Binomial Theorem


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1 School of Naval Architecture & Ocean Engineering, Shanghai Jiao Tong University, Shanghai-200030, China
     

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In this paper, a generalized binomial theorem about the real function (1+t)α (α≠ 0, 1, 2, . . . ) is proposed, which is proved to be convergent to (1 + t)α in the region -1<t<-2/ℏ-1(ℏ>0) for all real values of α(α≠0,1,2, . . .), and even in the region -2/ℏ-1<t<-1(ℏ>0) for such values of α that (1+t)α has meanings for t<-1, so that it can be convergent to (1+t)α in the whole region where (1+t)α has meanings. Moreover, the classical Newtonian binomial expression is a special case of it at ℏ=-1.
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  • On the Generalized Newtonian Binomial Theorem

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Authors

Shi-Jun Liao
School of Naval Architecture & Ocean Engineering, Shanghai Jiao Tong University, Shanghai-200030, China

Abstract


In this paper, a generalized binomial theorem about the real function (1+t)α (α≠ 0, 1, 2, . . . ) is proposed, which is proved to be convergent to (1 + t)α in the region -1<t<-2/ℏ-1(ℏ>0) for all real values of α(α≠0,1,2, . . .), and even in the region -2/ℏ-1<t<-1(ℏ>0) for such values of α that (1+t)α has meanings for t<-1, so that it can be convergent to (1+t)α in the whole region where (1+t)α has meanings. Moreover, the classical Newtonian binomial expression is a special case of it at ℏ=-1.