Generalized Fibonacci Numbers — Yüksel Soykan

Generalized Fibonacci Numbers
Yüksel SoykanMinel Yayın
Generalized Fibonacci Numbers
Yüksel SoykanÖzet Recently there have been so many studies of the sequences of numbers in the literature and the sequences of numbers were widely used in many research areas such as architecture nature art physics and engineering The Fibonacci numbers occurs everywhere in nature These numbers has applications to distinct branches of mathematics as well as varied situations of the world In this book closed forms of the sum formulas for generalized Fibonacci Horadam numbers are presented and then as special cases the sum formulas of Fibonacci Lucas Pell Pell Lucas Jacobsthal Jacobsthal Lucas Mersenne Mersenne Lucas p Mersenne p Mersenne Lucas balancing modified Lucas balancing Lucasbalancing modified Oresme Oresme Lucas Oresme modified p Oresme p Oresme Lucas p Oresme numbers are given We present the proofs to indicate how these formulas in general were discovered Of course all the listed formulas of the sums may be proved by induction but that method of proof gives no clue about their discovery The content of the book is recent and reflects current research in the field of recurrent sequences There are lots of applications of the sum formulas For example computations of the Frobenius norm spectral norm maximum column length norm and maximum row length norm of circulant r circulant geometric circulant semicirculant matrices with the generalized m step Fibonacci sequences require the sum of the numbers I would be delighted to hear from the users of the book about any possible errors and corrections Prof Yüksel Soykan Bülent Ecevit University In this book closed forms of the sum formulas for generalized Fibonacci Horadam numbers are presented and then as special cases the sum formulas of Fibonacci Lucas Pell Pell Lucas Jacobsthal Jacobsthal Lucas Mersenne Mersenne Lucas p Mersenne p Mersenne Lucas balancing modified Lucas balancing Lucas balancing modified Oresme Oresme Lucas Oresme modified p Oresme p Oresme Lucas p Oresme numbers are given We present the proofs to indicate how these formulas in general were discovered Of course all the listed formulas of the sums may be proved by induction but that method of proof gives no clue about their discovery

MİNEL YAYIN

Minel Yayın
Recently there have been so many studies of the sequences of numbers in the literature and the sequences of numbers were widely used in many research areas such as architecture nature art physics and engineering The Fibonacci numbers occurs everywhere in nature These numbers has applications to distinct branches of mathematics as well as varied situations of the world In this book closed forms of the sum formulas for generalized Fibonacci Horadam numbers are presented and then as special cases the sum formulas of Fibonacci Lucas Pell Pell Lucas Jacobsthal Jacobsthal Lucas Mersenne Mersenne Lucas p Mersenne p Mersenne Lucas balancing modified Lucas balancing Lucasbalancing modified Oresme Oresme Lucas Oresme modified p Oresme p Oresme Lucas p Oresme numbers are given We present the proofs to indicate how these formulas in general were discovered Of course all the listed formulas of the sums may be proved by induction but that method of proof gives no clue about their discovery The content of the book is recent and reflects current research in the field of recurrent sequences There are lots of applications of the sum formulas For example computations of the Frobenius norm spectral norm maximum column length norm and maximum row length norm of circulant r circulant geometric circulant semicirculant matrices with the generalized m step Fibonacci sequences require the sum of the numbers I would be delighted to hear from the users of the book about any possible errors and corrections Prof Yüksel Soykan Bülent Ecevit University In this book closed forms of the sum formulas for generalized Fibonacci Horadam numbers are presented and then as special cases the sum formulas of Fibonacci Lucas Pell Pell Lucas Jacobsthal Jacobsthal Lucas Mersenne Mersenne Lucas p Mersenne p Mersenne Lucas balancing modified Lucas balancing Lucas balancing modified Oresme Oresme Lucas Oresme modified p Oresme p Oresme Lucas p Oresme numbers are given We present the proofs to indicate how these formulas in general were discovered Of course all the listed formulas of the sums may be proved by induction but that method of proof gives no clue about their discovery

Minel Yayın
Recently there have been so many studies of the sequences of numbers in the literature and the sequences of numbers were widely used in many research areas such as architecture nature art physics and engineering The Fibonacci numbers occurs everywhere in nature These numbers has applications to distinct branches of mathematics as well as varied situations of the world In this book closed forms of the sum formulas for generalized Fibonacci Horadam numbers are presented and then as special cases the sum formulas of Fibonacci Lucas Pell Pell Lucas Jacobsthal Jacobsthal Lucas Mersenne Mersenne Lucas p Mersenne p Mersenne Lucas balancing modified Lucas balancing Lucasbalancing modified Oresme Oresme Lucas Oresme modified p Oresme p Oresme Lucas p Oresme numbers are given We present the proofs to indicate how these formulas in general were discovered Of course all the listed formulas of the sums may be proved by induction but that method of proof gives no clue about their discovery The content of the book is recent and reflects current research in the field of recurrent sequences There are lots of applications of the sum formulas For example computations of the Frobenius norm spectral norm maximum column length norm and maximum row length norm of circulant r circulant geometric circulant semicirculant matrices with the generalized m step Fibonacci sequences require the sum of the numbers I would be delighted to hear from the users of the book about any possible errors and corrections Prof Yüksel Soykan Bülent Ecevit University In this book closed forms of the sum formulas for generalized Fibonacci Horadam numbers are presented and then as special cases the sum formulas of Fibonacci Lucas Pell Pell Lucas Jacobsthal Jacobsthal Lucas Mersenne Mersenne Lucas p Mersenne p Mersenne Lucas balancing modified Lucas balancing Lucas balancing modified Oresme Oresme Lucas Oresme modified p Oresme p Oresme Lucas p Oresme numbers are given We present the proofs to indicate how these formulas in general were discovered Of course all the listed formulas of the sums may be proved by induction but that method of proof gives no clue about their discovery