Summation of certain reciprocal series related to the generalized Fibonacci and Lucas numbers (Q2765397)
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scientific article; zbMATH DE number 1694695
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Summation of certain reciprocal series related to the generalized Fibonacci and Lucas numbers |
scientific article; zbMATH DE number 1694695 |
Statements
24 January 2002
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generalized Fibonacci numbers
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generalized Lucas numbers
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0.9456812
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0.9456812
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0.94515884
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Summation of certain reciprocal series related to the generalized Fibonacci and Lucas numbers (English)
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The generalized Fibonacci and Lucas numbers are defined by \(U_n(p,q)= \frac{\alpha^n-\beta^n} {\alpha-\beta}\) and \(V_n(p,q)= \alpha^n+ \beta^n\), where \(\alpha= \frac{p+ \sqrt{\Delta}}{2}\), \(\beta= \frac{p- \sqrt{\Delta}}{2}\), \(\Delta= p^2-4q\), \(p>0\) and \(q<0\). Some assertions on summation of certain reciprocal series to these numbers are formulated and proved.
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