Difference between revisions of "Mathematics"
(That's it, someone has to do this, it might as well be me.) |
|||
| Line 1: | Line 1: | ||
| + | '''Mathematics''' is the [[science]] of [[number]]s, and the study of relationships that exist between them. | ||
| + | |||
| + | ==Overview== | ||
| + | Modern mathematics is built around [[base numbers|base 10]], with ten digits. (<math>0,1,2,3,4,5,6,7,8,9</math>) Modern mathematics is separated into two categories: discrete mathematics and non-discrete. | ||
| + | ===Non-Discrete Mathematics=== | ||
| + | Non-discreet mathematics is study of mathematics that is generally applicable to the "real world", such as [[algebra]], [[geometry|Euclidean geometry]], [[statistics]], and other such topics. (Note that the real world is actually only approximately Euclidean if one studies large areas of it, infinitesimal areas actually are non-Euclidean) There is some controversy over what varieties of algebra are non-discrete, but it is generally agreed that elementary and superior algebra are non-discrete, while abstract algebra and intermediate topics such as field and graph theory and [[Diophantine]] equations are discrete. | ||
| + | ===Discrete Mathematics=== | ||
| + | [[Combinatorics]], [[number theory]], and some of the algebraic fields mentioned above are examples of discrete mathematics. Topics of discrete mathematics are generally not directly applicable to the "real world", and if they are, it is only in an abstract fashion. | ||
| + | ==History of Mathematics== | ||
| + | <!-- to be continued --> | ||
| + | |||
== See also == | == See also == | ||
* [[Math books]] | * [[Math books]] | ||
* [[Mathematics competitions]] | * [[Mathematics competitions]] | ||
| − | |||
Revision as of 18:30, 24 October 2007
Mathematics is the science of numbers, and the study of relationships that exist between them.
Contents
Overview
Modern mathematics is built around base 10, with ten digits. (
) Modern mathematics is separated into two categories: discrete mathematics and non-discrete.
Non-Discrete Mathematics
Non-discreet mathematics is study of mathematics that is generally applicable to the "real world", such as algebra, Euclidean geometry, statistics, and other such topics. (Note that the real world is actually only approximately Euclidean if one studies large areas of it, infinitesimal areas actually are non-Euclidean) There is some controversy over what varieties of algebra are non-discrete, but it is generally agreed that elementary and superior algebra are non-discrete, while abstract algebra and intermediate topics such as field and graph theory and Diophantine equations are discrete.
Discrete Mathematics
Combinatorics, number theory, and some of the algebraic fields mentioned above are examples of discrete mathematics. Topics of discrete mathematics are generally not directly applicable to the "real world", and if they are, it is only in an abstract fashion.
