This paper explores how the constructions of mathematically gifted fifth and sixth grade students using Euler’s polyhedron theorem compare to those of mathematicians as discussed by Lakatos (1976). Eleven mathematically gifted elementary school students were asked to justify the theorem, find counterexamples, and resolve conflicts between the theorem and counterexamples. The students provided two types of justification of the theorem. The solid figures suggested as counterexamples were categorized as 1) solids with curved surfaces, 2) solids made of multiple polyhedra sharing points, lines, or faces, 3) polyhedra with holes, and 4) polyhedra containing polyhedra. In addition to using the monster-barring method, the students suggested two ne...
In this paper we analyze the Euler Relation generally using as a means to visualize the fundamental ...
The Mathematics Challenge for Young Australians is an enrichment program for middle level school stu...
In this essay the heuristic method of proofs and refutations, as pre- sented in the book Proofs and ...
The mathematically gifted elementary students ’ revisiting of Euler’s polyhedron theore
In this article Geoff Tennant summarises the first half of Imre Lakatos's seminal 1976 book, "Proofs...
In Slovenian elementary schools the curriculum addresses only the simplest polyhedra, such as prisms...
[[abstract]]The geometry teaching material in this study is arranged mainly according to the Polya's...
This talk will describe the author’s work translating a paper of Euler on number theory, and how res...
Traditionally, mathematics, past simple addition, subtraction, multiplication, and division, has bee...
Lakatos’s seminal work Proofs and Refutations introduced the methods of proofs and refutations by di...
Lakatos’s seminal work Proofs and Refutations introduced the methods of proofs and refutations by di...
This talk will tell the story of how a geometry problem of Diophantus led all the way to a paper of ...
In the paper we present the results of two teaching episodes, which took place in two middle school ...
One pedagogical approach to challenge a persistent misconception is to get students to test a conjec...
The paper is concerned with Imre Lakatos’ philosophy of mathematics; it contains a presentation of L...
In this paper we analyze the Euler Relation generally using as a means to visualize the fundamental ...
The Mathematics Challenge for Young Australians is an enrichment program for middle level school stu...
In this essay the heuristic method of proofs and refutations, as pre- sented in the book Proofs and ...
The mathematically gifted elementary students ’ revisiting of Euler’s polyhedron theore
In this article Geoff Tennant summarises the first half of Imre Lakatos's seminal 1976 book, "Proofs...
In Slovenian elementary schools the curriculum addresses only the simplest polyhedra, such as prisms...
[[abstract]]The geometry teaching material in this study is arranged mainly according to the Polya's...
This talk will describe the author’s work translating a paper of Euler on number theory, and how res...
Traditionally, mathematics, past simple addition, subtraction, multiplication, and division, has bee...
Lakatos’s seminal work Proofs and Refutations introduced the methods of proofs and refutations by di...
Lakatos’s seminal work Proofs and Refutations introduced the methods of proofs and refutations by di...
This talk will tell the story of how a geometry problem of Diophantus led all the way to a paper of ...
In the paper we present the results of two teaching episodes, which took place in two middle school ...
One pedagogical approach to challenge a persistent misconception is to get students to test a conjec...
The paper is concerned with Imre Lakatos’ philosophy of mathematics; it contains a presentation of L...
In this paper we analyze the Euler Relation generally using as a means to visualize the fundamental ...
The Mathematics Challenge for Young Australians is an enrichment program for middle level school stu...
In this essay the heuristic method of proofs and refutations, as pre- sented in the book Proofs and ...