Difference between revisions of "Inequality"

m (Famous inequalities)
Line 12: Line 12:
 
* [[Chebyshevs inequality | Chebyshev's Inequality]]
 
* [[Chebyshevs inequality | Chebyshev's Inequality]]
 
* [[Geometric inequalities]]
 
* [[Geometric inequalities]]
* [[Holder's Inequality]]
+
* [[Hölder's inequality]]
 
* [[Isoperimetric inequalities]]
 
* [[Isoperimetric inequalities]]
 
* [[Jensen's Inequality]]
 
* [[Jensen's Inequality]]

Revision as of 18:05, 10 July 2006

The subject of mathematical inequalities is tied closely with optimization methods. While most of the subject of inequalities is often left out of the ordinary educational track, they are common in mathematics Olympiads.


Motivation

We say that a>b (or, equivalently, b<a) if a and b are real numbers, and a-b is a positive number. However, there are many inequalities that are much more interesting and also very important, such as the ones listed below.


Famous inequalities

Here are some of the more famous and useful inequalities, as well as general inequalities topics.

Problem solving tactics

substitution, telescoping, induction, etc. (write me please!)


Resources

Books

Intermediate

Olympiad

Articles

Olympiad


Classes

Olympiad


See also