In attempt to provide an answer to the question of origin of deductive proofs, I argue that Aristotle’s philosophy of math is more accurate opposed to a Platonic philosophy of math, given the evidence of how mathematics began. Aristotle says that mathematical knowledge is a posteriori, known through induction; but once knowledge has become unqualified it can grow into deduction. Two pieces of recent scholarship on Greek mathematics propose new ways of thinking about how mathematics began in the Greek culture. Both claimed there was a close relationship between the culture and mathematicians; mathematics was understood through imaginative processes, experiencing the proofs in tangible ways, and establishing a consistent unified form of argu...
The foundation of Mathematics is both a logico-formal issue and an epistemological one. By the firs...
Demonstrative logic, the study of demonstration as opposed to persuasion, is the subject of Aristotl...
Teaching and learning mathematics require a set of appreciation, methodology, approaches and relatio...
In attempt to provide an answer to the question of origin of deductive proofs, I argue that Aristotl...
An examination of the emergence of the phenomenon of deductive argument in classical Greek mathemati...
Walter Burkert who is heavily skeptical to the achievements of Pythagoras or Pythagoreans in the his...
We can now recognize Aristotle\u27s many accomplishments in logical theory, not the least of which i...
1. Philosophy, science and mathematics in Greece. Plato and Aristotle drew the distinction between p...
It is generally agreed among researchers and teachers that students have difficulty understanding th...
The last two decades have witnessed a debate concerning whether Aristotle\u27s syllogistic is a syst...
Logic/Mathematics/Computation: A word of warning • Logic is OLD. Mathematics is OLD. But, SO IS comp...
Since the time of Aristotle's students, interpreters have considered Prior Analytics to be a treatis...
Thesis (Ph. D.)--University of Rochester. Dept. of Philosophy, 2010.There is no one Aristotelian tex...
AbstractTeaching and learning mathematics require a set of appreciation, methodology, approaches and...
Abstract. In the Organon Aristotle describes some deductive schemata in which inconsis-tencies do no...
The foundation of Mathematics is both a logico-formal issue and an epistemological one. By the firs...
Demonstrative logic, the study of demonstration as opposed to persuasion, is the subject of Aristotl...
Teaching and learning mathematics require a set of appreciation, methodology, approaches and relatio...
In attempt to provide an answer to the question of origin of deductive proofs, I argue that Aristotl...
An examination of the emergence of the phenomenon of deductive argument in classical Greek mathemati...
Walter Burkert who is heavily skeptical to the achievements of Pythagoras or Pythagoreans in the his...
We can now recognize Aristotle\u27s many accomplishments in logical theory, not the least of which i...
1. Philosophy, science and mathematics in Greece. Plato and Aristotle drew the distinction between p...
It is generally agreed among researchers and teachers that students have difficulty understanding th...
The last two decades have witnessed a debate concerning whether Aristotle\u27s syllogistic is a syst...
Logic/Mathematics/Computation: A word of warning • Logic is OLD. Mathematics is OLD. But, SO IS comp...
Since the time of Aristotle's students, interpreters have considered Prior Analytics to be a treatis...
Thesis (Ph. D.)--University of Rochester. Dept. of Philosophy, 2010.There is no one Aristotelian tex...
AbstractTeaching and learning mathematics require a set of appreciation, methodology, approaches and...
Abstract. In the Organon Aristotle describes some deductive schemata in which inconsis-tencies do no...
The foundation of Mathematics is both a logico-formal issue and an epistemological one. By the firs...
Demonstrative logic, the study of demonstration as opposed to persuasion, is the subject of Aristotl...
Teaching and learning mathematics require a set of appreciation, methodology, approaches and relatio...