Difference between revisions of "Floating point"

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* [[Computing]]
 
* [[Computing]]
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* [[Mathematics]]
 
* [[Real number]]
 
* [[Real number]]
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== External links ==  
 
== External links ==  
  
 
* [https://en.wikipedia.org/wiki/Floating_point Floating point] @ Wikipedia
 
* [https://en.wikipedia.org/wiki/Floating_point Floating point] @ Wikipedia

Revision as of 15:05, 30 August 2015

In computing, floating point is the formulaic representation which approximates a real number so as to support a trade-off between range and precision.

Description

A number is, in general, represented approximately to a fixed number of significant digits (the significand) and scaled using an exponent; the base for the scaling is normally two, ten, or sixteen.

The term floating point refers to the fact that a number's radix point (decimal point, or, more commonly in computers, binary point) can "float"; that is, it can be placed anywhere relative to the significant digits of the number. This position is indicated as the exponent component, and thus the floating-point representation can be thought of as a kind of scientific notation.

A floating-point system can be used to represent, with a fixed number of digits, numbers of different orders of magnitude: e.g. the distance between galaxies or the diameter of an atomic nucleus can be expressed with the same unit of length. The result of this dynamic range is that the numbers that can be represented are not uniformly spaced; the difference between two consecutive representable numbers grows with the chosen scale.

Over the years, a variety of floating-point representations have been used in computers. However, since the 1990s, the most commonly encountered representation is that defined by the IEEE 754 Standard.

The speed of floating-point operations, commonly measured in terms of FLOPS, is an important characteristic of a computer system, especially for applications that involve intensive mathematical calculations.

See also

External links