DOIAbstract
International audienceWe present three theorems due to Menelaus of Alexandria (1st-2nd c. AD) that concern spherical triangles and we make relations with modern mathematical works
International audienceWe present three theorems due to Menelaus of Alexandria (1st-2nd c. AD) that concern spherical triangles and we make relations with modern mathematical works
The study of geometry provides a rich and attractive field of manipulatives, because geometry is pr...
Pythagoras ’ theorem, Euclid’s formula for the area of a triangle as one half the base times the hei...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
Abstract: In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
This generalization of the Theorem of Menelaus from a triangle to a polygon with n sides is proven b...
Hyperbolic Geometry appeared in the first half of the 19th century as an attempt to understand Eucli...
The Menelaus Theorem, which involves the ratios between the chords of arcs arranged in a certain man...
International audienceWe comment on some combinatorial aspects of Nasir al-din al-Tusi's treatise on...
Spherical geometry was studied in ancient times as a subset of Euclidian three-dimensional space. I...
The Doctrine of Triangles is the second half of Glen Van Brummelen’s history of trigonometry. The fi...
The Pythagorean numbers play a significant role in the theory of higher arithmetic as they come in t...
AbstractMenelaus's theorem is basically for triangles. Some authors have developed in quadrilateral....
We provide hyperbolic analogues of some classical theorems in spherical geometry due to Menelaus, E...
The study of geometry provides a rich and attractive field of manipulatives, because geometry is pr...
Pythagoras ’ theorem, Euclid’s formula for the area of a triangle as one half the base times the hei...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
Abstract: In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
This generalization of the Theorem of Menelaus from a triangle to a polygon with n sides is proven b...
Hyperbolic Geometry appeared in the first half of the 19th century as an attempt to understand Eucli...
The Menelaus Theorem, which involves the ratios between the chords of arcs arranged in a certain man...
International audienceWe comment on some combinatorial aspects of Nasir al-din al-Tusi's treatise on...
Spherical geometry was studied in ancient times as a subset of Euclidian three-dimensional space. I...
The Doctrine of Triangles is the second half of Glen Van Brummelen’s history of trigonometry. The fi...
The Pythagorean numbers play a significant role in the theory of higher arithmetic as they come in t...
AbstractMenelaus's theorem is basically for triangles. Some authors have developed in quadrilateral....
We provide hyperbolic analogues of some classical theorems in spherical geometry due to Menelaus, E...
The study of geometry provides a rich and attractive field of manipulatives, because geometry is pr...
Pythagoras ’ theorem, Euclid’s formula for the area of a triangle as one half the base times the hei...
This paper deals with Napoleon Bonaparte’s special interest in science, and in particular, in mathem...
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