To install click the Add extension button. That's it.

The source code for the WIKI 2 extension is being checked by specialists of the Mozilla Foundation, Google, and Apple. You could also do it yourself at any point in time.

Kelly Slayton
Congratulations on this excellent venture… what a great idea!
Alexander Grigorievskiy
I use WIKI 2 every day and almost forgot how the original Wikipedia looks like.
Live Statistics
English Articles
Improved in 24 Hours
Added in 24 Hours
Show all languages
What we do. Every page goes through several hundred of perfecting techniques; in live mode. Quite the same Wikipedia. Just better.

Undefined (mathematics)

From Wikipedia, the free encyclopedia

In mathematics, the term undefined is often used to refer to an expression which is not assigned an interpretation or a value (such as an indeterminate form, which has the propensity of assuming different values).[1][2] The term can take on several different meanings depending on the context. For example:

  • In various branches of mathematics, certain concepts are introduced as primitive notions (e.g., the terms "point", "line" and "angle" in geometry). As these terms are not defined in terms of other concepts, they may be referred to as "undefined terms".
  • A function is said to be "undefined" at points outside of its domain – for example, the real-valued function is undefined for negative  (i.e., it assigns no value to negative arguments).
  • In algebra, some arithmetic operations may not assign a meaning to certain values of its operands (e.g., division by zero). In which case, the expressions involving such operands are termed "undefined".[3]

Undefined terms

In ancient times, geometers attempted to define every term. For example, Euclid defined a point as "that which has no part". In modern times, mathematicians recognize that attempting to define every word inevitably leads to circular definitions, and therefore leave some terms (such as "point") undefined (see primitive notion for more).

This more abstract approach allows for fruitful generalizations. In topology, a topological space may be defined as a set of points endowed with certain properties, but in the general setting, the nature of these "points" is left entirely undefined. Likewise, in category theory, a category consists of "objects" and "arrows", which are again primitive, undefined terms. This allows such abstract mathematical theories to be applied to very diverse concrete situations.

In arithmetic

The expression 0/0 is undefined in arithmetic, as explained in division by zero (the same expression is used in calculus to represent an indeterminate form).

Mathematicians have different opinions as to whether 00 should be defined to equal 1, or be left undefined.

Values for which functions are undefined

The set of numbers for which a function is defined is called the domain of the function. If a number is not in the domain of a function, the function is said to be "undefined" for that number. Two common examples are , which is undefined for , and , which is undefined (in the real number system) for negative .

In trigonometry

In trigonometry, the functions and are undefined for all , while the functions and are undefined for all .

In computer science

Notation using ↓ and ↑

In computability theory, if is a partial function on and is an element of , then this is written as , and is read as "f(a) is defined."[4]

If is not in the domain of , then this is written as , and is read as " is undefined".

The symbols of infinity

In analysis, measure theory and other mathematical disciplines, the symbol is frequently used to denote an infinite pseudo-number, along with its negative, . The symbol has no well-defined meaning by itself, but an expression like is shorthand for a divergent sequence, which at some point is eventually larger than any given real number.

Performing standard arithmetic operations with the symbols is undefined. Some extensions, though, define the following conventions of addition and multiplication:

  •    for all .
  •    for all .
  •    for all .

No sensible extension of addition and multiplication with exists in the following cases:

  • (although in measure theory, this is often defined as )

For more detail, see extended real number line.

Singularities in complex analysis

In complex analysis, a point where a holomorphic function is undefined is called a singularity. One distinguishes between removable singularities (i.e., the function can be extended holomorphically to ), poles (i.e., the function can be extended meromorphically to ), and essential singularities (i.e., no meromorphic extension to can exist).


  1. ^ "The Definitive Glossary of Higher Mathematical Jargon — Indeterminate". Math Vault. 2019-08-01. Retrieved 2019-12-15.
  2. ^ Weisstein, Eric W. "Undefined". Retrieved 2019-12-15.
  3. ^ "Undefined vs Indeterminate in Mathematics". Retrieved 2019-12-15.
  4. ^ Enderton, Herbert B. (2011). Computability: An Introduction to Recursion Theory. Elseveier. pp. 3–6. ISBN 978-0-12-384958-8.

Further reading

  • Smart, James R. (1988). Modern Geometries (Third ed.). Brooks/Cole. ISBN 0-534-08310-2.
This page was last edited on 5 July 2021, at 18:25
Basis of this page is in Wikipedia. Text is available under the CC BY-SA 3.0 Unported License. Non-text media are available under their specified licenses. Wikipedia® is a registered trademark of the Wikimedia Foundation, Inc. WIKI 2 is an independent company and has no affiliation with Wikimedia Foundation.