Add to ORKGThe famous Euclid’s theorem on the infinity of prime numbers represents a typical case of difficulties for students. In this work we present some reflections and proposals to contrast such difficulties, focused on: a) the problem of proofs by contradiction – in this case viewed as inessential – also in relation with the dychotomy potential/actual infinite; b) a comparison between the current proof and the original Euclid’s one, especially for its potential influence on the building of algebraic language; c) the opportunity of privileging students’ exploratory activities as necessary steps toward the construction of the proof, and the chances that a wise use of technologies offer to this exploratio
Dirichlet’s 1837 theorem that every coprime arithmetic progression a mod m contains infinitely many ...
Presentación que mediante ejemplos se muestra la teoría planteada por Euclides sobre la infinitud de...
In the Reality we know, we cannot say if something is infinite whether we are doing Physics, Biology...
The famous Euclid’s theorem on the infinity of prime numbers represents a typical case of difficulti...
Theorem. There are infinitely many primes. Euclid’s proof of this theorem is a classic piece of math...
The prime numbers, 2, 3, 5, 7, 11, …, are integers divisible only by themselves and one. Euclid's El...
Euclid's classic proof about the infinitude of prime numbers has been a standard model of ...
In Book IX of the Elements, Euclid recorded a constructive proof that there are infinitely many prim...
RESUMEN: Uno de los temas más estudiados a lo largo de la historia de las matemáticas ha sido la inf...
Prime numbers is one of kind number that have many uses, one of which is cryptography. The uniquenes...
This paper presents a complete and exhaustive proof of the infinitude of Mersenne prime numbers. The...
Praca, podzielona na cztery części, obrazuje podstawowe twierdzenie teorii liczb mówiące o istnieniu...
Dedicated to the 70th birthday of Alfonz Haviar Abstract. A concept of a superprime meaning a prime ...
Prime numbers have been a source of fascination for mathemati-cians since antiquity. The proof that ...
This paper presents a complete and exhaustive proof that an Infinite Number of Triplet Primes exist....
Dirichlet’s 1837 theorem that every coprime arithmetic progression a mod m contains infinitely many ...
Presentación que mediante ejemplos se muestra la teoría planteada por Euclides sobre la infinitud de...
In the Reality we know, we cannot say if something is infinite whether we are doing Physics, Biology...
The famous Euclid’s theorem on the infinity of prime numbers represents a typical case of difficulti...
Theorem. There are infinitely many primes. Euclid’s proof of this theorem is a classic piece of math...
The prime numbers, 2, 3, 5, 7, 11, …, are integers divisible only by themselves and one. Euclid's El...
Euclid's classic proof about the infinitude of prime numbers has been a standard model of ...
In Book IX of the Elements, Euclid recorded a constructive proof that there are infinitely many prim...
RESUMEN: Uno de los temas más estudiados a lo largo de la historia de las matemáticas ha sido la inf...
Prime numbers is one of kind number that have many uses, one of which is cryptography. The uniquenes...
This paper presents a complete and exhaustive proof of the infinitude of Mersenne prime numbers. The...
Praca, podzielona na cztery części, obrazuje podstawowe twierdzenie teorii liczb mówiące o istnieniu...
Dedicated to the 70th birthday of Alfonz Haviar Abstract. A concept of a superprime meaning a prime ...
Prime numbers have been a source of fascination for mathemati-cians since antiquity. The proof that ...
This paper presents a complete and exhaustive proof that an Infinite Number of Triplet Primes exist....
Dirichlet’s 1837 theorem that every coprime arithmetic progression a mod m contains infinitely many ...
Presentación que mediante ejemplos se muestra la teoría planteada por Euclides sobre la infinitud de...
In the Reality we know, we cannot say if something is infinite whether we are doing Physics, Biology...