Pure geometry or Euclidean geometry is a body of theorems and corollaries logically derived from certain axioms and postulates as presented in Euclid’s Elements. Later geometers, both Greek and others, have added to this. Occasionally some algebra is brought in but not trigonometry. Abraham Lincoln is said to have read the Elements just for the reasoning
It is increasingly clear that the shapes of reality – whether of the natural world, or of the built ...
Ever since the very beginning of ancient philosophy, from Pythagoras to Plato, we know that the worl...
From all theorems of elementary geometry in school there are many important theorems as Pythagorean ...
Though the modernization of the school mathematics has been promoted in the area of algebra, probabi...
There are two ways to study projective geometry: 1) an extension fo the Eucildean geometry taught in...
Since the beginnings of a transmission of geometric knowledge two different aspects of geometry are ...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...
In this paper, following the previous one, the author made a research about next two subjects on the...
David Hilbert's Foundations of Geometry (1899) contain nineteen statements, labelled axioms, from wh...
Geometry problems are important for training of the mind, imagination and other highly valuable huma...
My thesis discusses the history and development of geometry, specifically Euclidean\ud geometry. I u...
Visual reasoning is central to mathematics. It is an integral part of mathematical and scientific in...
Why did I have you read sections of Euclid’s Elements? To appreciate how different mathematics is du...
Focusing methodologically on those historical aspects that are relevant to supporting intuition in a...
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
It is increasingly clear that the shapes of reality – whether of the natural world, or of the built ...
Ever since the very beginning of ancient philosophy, from Pythagoras to Plato, we know that the worl...
From all theorems of elementary geometry in school there are many important theorems as Pythagorean ...
Though the modernization of the school mathematics has been promoted in the area of algebra, probabi...
There are two ways to study projective geometry: 1) an extension fo the Eucildean geometry taught in...
Since the beginnings of a transmission of geometric knowledge two different aspects of geometry are ...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...
In this paper, following the previous one, the author made a research about next two subjects on the...
David Hilbert's Foundations of Geometry (1899) contain nineteen statements, labelled axioms, from wh...
Geometry problems are important for training of the mind, imagination and other highly valuable huma...
My thesis discusses the history and development of geometry, specifically Euclidean\ud geometry. I u...
Visual reasoning is central to mathematics. It is an integral part of mathematical and scientific in...
Why did I have you read sections of Euclid’s Elements? To appreciate how different mathematics is du...
Focusing methodologically on those historical aspects that are relevant to supporting intuition in a...
All our geometry, whether limited to circles and. straight lines or extended to include conic sectio...
It is increasingly clear that the shapes of reality – whether of the natural world, or of the built ...
Ever since the very beginning of ancient philosophy, from Pythagoras to Plato, we know that the worl...
From all theorems of elementary geometry in school there are many important theorems as Pythagorean ...