Ancient Greek Mathematics
In
these chapters It is important to watch the very rapid development of mathematics
from primitive algorithms to a full-fledged theory, that stands today as a model
for students and all of science, as well. Even still, the Greek contributions
took time. There were false starts and dead ends. There was a point of view,
a philosophy that denied research into new directions. As indicated above there
are three distinct periods to regard the goals below:
- The early period. (600+ - 450 BCE)
- The classical period. (450 - 300 BCE)
- The Helenistic period. (300 - 400 CE)
Goals
Among the many features you should regard
are:
Teaching and Pedagogy.
- Pedagogy. Analyse how you would approach teaching mathematics in the style
where there are a very limited number of books.
- How would you teach arithmetic in the Greek alphabetic system?
- View the nature of books. With no examples, no color, no preambles, and
no discussion, how it is possible to use them to teach? What is the added
responsibility of the teacher? Or have things changed very little with our
modern textbooks?
Mathematics.
- The idea of proof.
- The concept of modeling natural phenomena (even the
cosmos) on a unified basis.
- The introduction of axioms.
- The formation of numbers as objects transcending counting
with individual meanings, and the division of valuations to length and number
- a necessary consequence of incommensurables.
- Prime numbers and number theory.
- The earliest concepts of limit. (The Method of Exhaustion.)
- Greek counting and calculation.
- Greek astronomy and the impact of geometry on it.
- Greek notions of infinity.
Goals.
In the readings for this chapter, focus on the following questions.
- Pedagogy. Analyse how you would approach teaching mathematics in the style
where there are no principles, only practice.
- Can you identify problems that could not be solved by ancient methods, but
which are very near to ones that can.
- What were the stimuli for the particular methods and algoithms developed.
- Why were conic sections never considered?
- How are nonlinear equations considered, solved? What do the Egyptians do?
What do the Babylonians do?
- What evidence can you discern about general principles.
- What was the relation between the exact and the approximate? Was the distinction
clearly understood? Is there similarity with the training of young students
today. At what age are these distinctions finally absolute?
- Can you identify sufficient mathematics to handle the needs of commerce?
to what level?
References
- A History of Mathematics, 2nd Ed., Carl B. Boyer, Revised by Uta
C. Merzbach, Wiley, NY, 1991.
- A History of Mathematics - An Introduction, Victor Katz, Harper
Collins, NY, 1993.
- The History of Mathematics - An Introduction, David M. Burton, McGraw-Hill,
New York, 1997.
- A History of Mathematics, 5th Ed., Florian A. Cajori, Chelsea, New
York, 1991.
- History of Mathematics , 2 volumes, David E. Smith, Dover, New York,
1958.
