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Presented paper, above all, completes two other papers, made previously by the authors and cited in References, concerning the orbits of the Kaprekar’s transformations. In the current paper many detailed facts for five initial Kaprekar’s transformations (from T2 to T6) are described. There are introduced some new concepts and there is shown how important is the observation of numerical results giving...
In the present paper we give the solution of E. Kronheimer’s problem (problem A6516 in Amer.Math.Month.), alternative to three other solutions included in paper [1].
In this paper a completely elementary method of generating the trigonometric equalities and identities is presented. Among them, the equalities connected with roots of Perrin’s polynomial and the generalizations of known Ramanujan’s equalities are proven.
Wituła and Słota in [College Math. J. 42 (2011), 328] proposed a way of proving the relation (1) given below which appeared to be a genuine result. Authors of the present paper, inspired by the form of this limit, try to find some generalizations of this one, also in the context of some special functions (e.g. the gamma function, the generalized Laguerre polynomials).
In this paper the, so called, full matrices are distinguished. A number of basic properties of such matrices are also presented. Moreover, few possible directions for further research are indicated.
The paper presents a thematic overview and selected results connected with the asymptotic behavior of sequences of arithmetic and geometric means of fixed sequences of positive real numbers. A lot of original results and the independent proofs of known results are presented. Some rarely cited classical results (including the Kalecki Theoremand the Hurwitz identity) are recalled and used.
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