The mathematically gifted elementary students ’ revisiting of Euler’s polyhedron theore
Mathematics education research indicates the value of a meaning-making and problem-solving approach ...
In this article Geoff Tennant summarises the first half of Imre Lakatos's seminal 1976 book, "Proofs...
Praca dyplomowa jest o twierdzeniu Eulera o wielościanach. Praca napisana na podstawie oryginalnych ...
This paper explores how the constructions of mathematically gifted fifth and sixth grade students us...
This talk will describe the author’s work translating a paper of Euler on number theory, and how res...
This talk will tell the story of how a geometry problem of Diophantus led all the way to a paper of ...
Let the number of vertices, edges, and faces of a polyhedron be V, E, and F. The Euler characteristi...
In the present paper we explain the well-known Euler formula for solids, as an interesting argument...
Title: Platonic and Archimedean solids and their properties in teaching of mathematics at secondary ...
Este trabalho baseia-se no estudo dos Poliedros e o Teorema de Euler, aplicando estratégias de ensin...
An examination of the historical development of mathematics and how mathematical history has changed...
In Slovenian elementary schools the curriculum addresses only the simplest polyhedra, such as prisms...
Knowledge about PolyhedraGenerate nets of polyhedra, suitable for constructing the polyhedra out of ...
The diploma paper presents the history of regular polyhedrons, typological properties, area and volu...
It is increasingly clear that the shapes of reality – whether of the natural world, or of the built ...
Mathematics education research indicates the value of a meaning-making and problem-solving approach ...
In this article Geoff Tennant summarises the first half of Imre Lakatos's seminal 1976 book, "Proofs...
Praca dyplomowa jest o twierdzeniu Eulera o wielościanach. Praca napisana na podstawie oryginalnych ...
This paper explores how the constructions of mathematically gifted fifth and sixth grade students us...
This talk will describe the author’s work translating a paper of Euler on number theory, and how res...
This talk will tell the story of how a geometry problem of Diophantus led all the way to a paper of ...
Let the number of vertices, edges, and faces of a polyhedron be V, E, and F. The Euler characteristi...
In the present paper we explain the well-known Euler formula for solids, as an interesting argument...
Title: Platonic and Archimedean solids and their properties in teaching of mathematics at secondary ...
Este trabalho baseia-se no estudo dos Poliedros e o Teorema de Euler, aplicando estratégias de ensin...
An examination of the historical development of mathematics and how mathematical history has changed...
In Slovenian elementary schools the curriculum addresses only the simplest polyhedra, such as prisms...
Knowledge about PolyhedraGenerate nets of polyhedra, suitable for constructing the polyhedra out of ...
The diploma paper presents the history of regular polyhedrons, typological properties, area and volu...
It is increasingly clear that the shapes of reality – whether of the natural world, or of the built ...
Mathematics education research indicates the value of a meaning-making and problem-solving approach ...
In this article Geoff Tennant summarises the first half of Imre Lakatos's seminal 1976 book, "Proofs...
Praca dyplomowa jest o twierdzeniu Eulera o wielościanach. Praca napisana na podstawie oryginalnych ...