<紀要論文>
Introducing Complex Numbers into Basic Growth FUnctions (2) : Applying Complex Representation of '(-1) +1' to Definite Integral of Exponential Function with Base e Expanded into Infinite Series

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概要 The present study was conducted to investigate the application of complex representation of '(-1)+1' to the definite integral of exp(t) expanded into infinite series. The results obtained were as fol...lowes. There were two set of '(-1)+1' appearing in the caluculation of definite integral of exp(t). The complex representation of '(-1)+1' left a kind of complex number by the hypothetic breakdown of multiplication form connecting complex numbers constructing '(-1)+1', but the complex number which came form the first '(-1)+1' was offset by that coming from the second '(-1)+1'. This hypothetic phenomenon might be related to the fluctation between the second '(-1)+1' occurring whenever the increase in weight was calculated. This application did not the calculation of weight increase, suggesting that the definite integral of exp(t) was attended hypothetically by pair appearences and disappearances of complex numbers with their opposites.続きを見る

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登録日 2009.04.22
更新日 2017.02.07