Add to ORKGIn an earlier issue of At Right Angles, we had studied a gem of Euclidean geometry called Napoleon's Theorem, a result discovered in post-revolution France. We had offered proofs of the theorem that were computational in nature, based on trigonometry and complex numbers. We continue our study of the theorem in this article, and offer proofs that are more geometric in nature; they make extremely effective use of the geometry of rotations
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
This paper is geared towards the students and admirers of Sir Isaac Newton, to assert by this paper,...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...
In this article we discuss a gem from Euclidean geometry that was discovered in post-revolution Fran...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
This thesis discusses about Napoleon’s theorem on a quadrilateral that has is two pairs of parallel ...
The thesis describes the introduction of complex numbers in teaching at secondary school, highlights...
An elementary geometric construction, known as Napoleon’s theorem, produces an equilateral triangle,...
This dissertation aims to study the basic theory of complex numbers and its geometric interpretation...
We give changes of the well-known 'Napoleon's theorem' in such a manner that certain n-simplices tak...
We re-derive Thales, Pythagoras, Apollonius, Stewart, Heron, al Kashi, de Gua, Terquem, Ptolemy, Bra...
[EN] Geometric constructions with straightedge and compass go as far back as to the time of the anci...
The target of the this diploma thesis called ''The Napoleon's theorem'' is a detailed concentration ...
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
This paper is geared towards the students and admirers of Sir Isaac Newton, to assert by this paper,...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...
In this article we discuss a gem from Euclidean geometry that was discovered in post-revolution Fran...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
This thesis discusses about Napoleon’s theorem on a quadrilateral that has is two pairs of parallel ...
The thesis describes the introduction of complex numbers in teaching at secondary school, highlights...
An elementary geometric construction, known as Napoleon’s theorem, produces an equilateral triangle,...
This dissertation aims to study the basic theory of complex numbers and its geometric interpretation...
We give changes of the well-known 'Napoleon's theorem' in such a manner that certain n-simplices tak...
We re-derive Thales, Pythagoras, Apollonius, Stewart, Heron, al Kashi, de Gua, Terquem, Ptolemy, Bra...
[EN] Geometric constructions with straightedge and compass go as far back as to the time of the anci...
The target of the this diploma thesis called ''The Napoleon's theorem'' is a detailed concentration ...
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
This paper is geared towards the students and admirers of Sir Isaac Newton, to assert by this paper,...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...