Andere Kunden interessierten sich auch für
![Special higher degree diophantine problems with solutions]( "Special higher degree diophantine problems with solutions")
Special higher degree diophantine problems with solutions16,99 €![Special Diophantine Problems on Integer Pairs, Triples with Solutions]( "Special Diophantine Problems on Integer Pairs, Triples with Solutions")
Special Diophantine Problems on Integer Pairs, Triples with Solutions22,99 €![Techniques of Solving Diophantine EQU'S Lead to Dio-Gandhi EQU'S]( "Techniques of Solving Diophantine EQU'S Lead to Dio-Gandhi EQU'S")
Techniques of Solving Diophantine EQU'S Lead to Dio-Gandhi EQU'S39,99 €![Possible Solutions of the Diophantine Equation]( "Possible Solutions of the Diophantine Equation")
Possible Solutions of the Diophantine Equation23,99 €![LAGRANGE''S METHOD IN THEORY OF DIOPHANTINE EQUATIONS]( "LAGRANGE''S METHOD IN THEORY OF DIOPHANTINE EQUATIONS")
LAGRANGE''S METHOD IN THEORY OF DIOPHANTINE EQUATIONS32,99 €![Special Quadratic Equations With Gaussian Integer Solutions]( "Special Quadratic Equations With Gaussian Integer Solutions")
Special Quadratic Equations With Gaussian Integer Solutions16,99 €![Diophantine Approximation and Dirichlet Series]( "Diophantine Approximation and Dirichlet Series")
Diophantine Approximation and Dirichlet Series88,99 €
This book contains a reasonable collection of special sextic Diophantine problems in three, four, five and six variables. Different sets of integer solutions to each of the sextic diophantine equations considered in this book are illustrated along with a few interesting properties among the solutions. The formal prerequisites for the material are minimal. It is hoped that these problems may create an interest in the hearts of researchers and lovers of mathematics who approach it with pure love for its own beauty. The authors hope that seeing the excitement of solving these higher degree diophantine equations, young mathematicians and researchers realize that there are lots and lots of other problems in number theory which are going to be challenging in the future. There is no doubt that, to have deep and thorough knowledge of the higher degree problems presented here, one must do a lot more than reading these problems. "To succeed, we must first believe that we can, the more you can dream the more you can do" as remarked by Michael Korda. There is no wonder that Diophantine equations are beautiful and tricky enough to keep a mathematician occupied for entire life.