Add to ORKGThis article will be devoted to generalisations of Fermat’s equation xn + yn = zn. Very soon after the Wiles and Taylor proof of Fermat’s Last Theorem, it was wondered what would happen if the exponents in the three term equation would be chosen differently. Or if coefficients other than 1 would be chosen. We discuss the reduction of the resolution of such equations to the determination of rational points on finite sets of algebraic curves (over Q if possible) and explain the full resolution of the particular equation with exponents 2, 3, 5
An elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions and parity cons...
A possibility of elementary proof of Fermat Last Theorem (FLT) on the basis of parity considerations...
AbstractIn this paper the equation x1n + y1n = z1n is solved in positive integers x, y,z, n. If the ...
This paper is devoted to the generalized Fermat equation xp + yq = zr, where p, q and r are integers...
AbstractThis paper continues the search to determine for what exponents n Fermat's Last Theorem is t...
A conjectured generalization of Fermat's Last Theorem states that the equation $x^p + y^q = z^r$ has...
This article is dedicated to the proof of Fermat's theorem in general form. It is shown that besides...
An elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions and parity cons...
A possibility of elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions a...
This paper presents two solutions to the Fermat’s Last Theorem (FLT). The first one using some algeb...
This paper presents two solutions to the Fermat’s Last Theorem (FLT). The first one using some algeb...
An elementary proof that the equation x2n + y2n = z2n can not have any non-zero positive integer sol...
Abstract. The Fermat equation is solved in integral two by two matrices of determinant one as well a...
Abstract. We determine the set of primitive integral solutions to the generalised Fermat equation x2...
Deep methods from the theory of elliptic curves and modular forms have been used to prove Fermat's l...
An elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions and parity cons...
A possibility of elementary proof of Fermat Last Theorem (FLT) on the basis of parity considerations...
AbstractIn this paper the equation x1n + y1n = z1n is solved in positive integers x, y,z, n. If the ...
This paper is devoted to the generalized Fermat equation xp + yq = zr, where p, q and r are integers...
AbstractThis paper continues the search to determine for what exponents n Fermat's Last Theorem is t...
A conjectured generalization of Fermat's Last Theorem states that the equation $x^p + y^q = z^r$ has...
This article is dedicated to the proof of Fermat's theorem in general form. It is shown that besides...
An elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions and parity cons...
A possibility of elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions a...
This paper presents two solutions to the Fermat’s Last Theorem (FLT). The first one using some algeb...
This paper presents two solutions to the Fermat’s Last Theorem (FLT). The first one using some algeb...
An elementary proof that the equation x2n + y2n = z2n can not have any non-zero positive integer sol...
Abstract. The Fermat equation is solved in integral two by two matrices of determinant one as well a...
Abstract. We determine the set of primitive integral solutions to the generalised Fermat equation x2...
Deep methods from the theory of elliptic curves and modular forms have been used to prove Fermat's l...
An elementary proof of Fermat Last Theorem (FLT) on the basis of binomial expansions and parity cons...
A possibility of elementary proof of Fermat Last Theorem (FLT) on the basis of parity considerations...
AbstractIn this paper the equation x1n + y1n = z1n is solved in positive integers x, y,z, n. If the ...