There has been considerable interest during the past 2300 years in comparing different models of geometric computation in terms of their computing power. One of the most well known results is Mohr's proof in 1672 that all constructions that can be executed with straight-edge and compass can be carried out with compass alone. The earliest such proof of the equivalence of models of computation is due to Euclid in his second proposition of Book I of the Elements in which he establishes that the collapsing compass is equivalent in power to the modern compass. Therefore in the theory of equivalence of models of computation Euclid's second proposition enjoys a singular place. However, like much of Euclid's work and particularly hi...
We present two sets of lessons on the history of mathematics designed for prospective teachers: (1) ...
Examines various attempts to prove Euclid's parallel postulate — by the Greeks, Arabs and Renaissanc...
Euclid is credited with most of the theorems in geometry textbooks today. Around 300 B.C., Euclid pr...
The ancient Greeks were the first to explore ruler and compass constructions, and Euclid was the fir...
Formalizing Euclid’s first axiom. Bulletin of Symbolic Logic. 20 (2014) 404–5. (Coauthor: Daniel Nov...
Though the modernization of the school mathematics has been promoted in the area of algebra, probabi...
The present article explores the relationships between the geometric and algebraic ideas presented i...
Euclid pioneered the concept of a mathematical theory developed from axioms by a series of justified...
Title: Comparison of Euclid's and Hilbert's Axiomatic Systems of Geometry from the Didactic Viewpoin...
This "Corolarium " of the Euclides (1733) contains an original proof of propositions 1.27 ...
Ancient Greeks were fascinated with what could be constructed only using a compass and a straightedg...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...
This first complete English language edition of Euclides vindicatus presents a corrected and revised...
We are discussing one of the most unlikely hypotheses in the history of mathematics—Proclus’ hypothe...
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
We present two sets of lessons on the history of mathematics designed for prospective teachers: (1) ...
Examines various attempts to prove Euclid's parallel postulate — by the Greeks, Arabs and Renaissanc...
Euclid is credited with most of the theorems in geometry textbooks today. Around 300 B.C., Euclid pr...
The ancient Greeks were the first to explore ruler and compass constructions, and Euclid was the fir...
Formalizing Euclid’s first axiom. Bulletin of Symbolic Logic. 20 (2014) 404–5. (Coauthor: Daniel Nov...
Though the modernization of the school mathematics has been promoted in the area of algebra, probabi...
The present article explores the relationships between the geometric and algebraic ideas presented i...
Euclid pioneered the concept of a mathematical theory developed from axioms by a series of justified...
Title: Comparison of Euclid's and Hilbert's Axiomatic Systems of Geometry from the Didactic Viewpoin...
This "Corolarium " of the Euclides (1733) contains an original proof of propositions 1.27 ...
Ancient Greeks were fascinated with what could be constructed only using a compass and a straightedg...
to the forerunner of Western geometry. After a good deal of work had been devoted to the field, Eucl...
This first complete English language edition of Euclides vindicatus presents a corrected and revised...
We are discussing one of the most unlikely hypotheses in the history of mathematics—Proclus’ hypothe...
We report on our efforts to explore geometry using constructive mathematics and intuitionistic logic...
We present two sets of lessons on the history of mathematics designed for prospective teachers: (1) ...
Examines various attempts to prove Euclid's parallel postulate — by the Greeks, Arabs and Renaissanc...
Euclid is credited with most of the theorems in geometry textbooks today. Around 300 B.C., Euclid pr...