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- The '''exponential function''' of <math>z</math>, denoted by <math> \exp(z)</math> or <font style="vert The study of the exponential function began with [[Leonhard Euler]] around 1730.<ref>William Dunham, ''Euler, the6 KB (1,021 words) - 12:18, 11 June 2009
- 142 bytes (21 words) - 05:53, 29 October 2008
- Auto-populated based on [[Special:WhatLinksHere/Exponential function]]. Needs checking by a human.837 bytes (109 words) - 16:27, 11 January 2010
Page text matches
- {{r|Exponential function}}2 KB (260 words) - 08:13, 9 December 2009
- #redirect[[exponential function]]33 bytes (3 words) - 04:21, 29 October 2008
- Auto-populated based on [[Special:WhatLinksHere/Exponential function]]. Needs checking by a human.837 bytes (109 words) - 16:27, 11 January 2010
- ...to solve equations in which the unknown appears both outside and inside an exponential function or a logarithm.152 bytes (22 words) - 10:36, 24 January 2009
- *[[exponential function]]1 KB (175 words) - 08:22, 12 February 2009
- {{r|Exponential function}}547 bytes (68 words) - 19:27, 11 January 2010
- * [[e (mathematics)]] - the constant that serves as the basis for the exponential function.192 bytes (31 words) - 12:43, 31 May 2009
- ...functions]] as well as the most basic [[transcendental functions]]: the [[exponential function]], the [[logarithm]], the [[trigonometric function|trigonometric functions] ====Exponential function====8 KB (1,289 words) - 13:46, 26 May 2009
- |[[Exponential function]]8 KB (1,184 words) - 14:58, 8 December 2009
- The '''exponential function''' of <math>z</math>, denoted by <math> \exp(z)</math> or <font style="vert The study of the exponential function began with [[Leonhard Euler]] around 1730.<ref>William Dunham, ''Euler, the6 KB (1,021 words) - 12:18, 11 June 2009
- ...tal]], ''e'' is the base of the [[natural logarithm]]s. Its inverse, the [[exponential function]] for K and C constants. For this reason, the exponential function plays a central role in [[analysis]].3 KB (527 words) - 12:19, 16 March 2008
- For example, the [[exponential function|exponential]] never takes on the value 0.6 KB (827 words) - 14:44, 19 December 2008
- {{r|Exponential function}}547 bytes (71 words) - 14:07, 8 March 2024
- ...</math>, is one such object, whereas one can prove that the graph of the [[exponential function]]---all solutions <math>(x,y)</math> of the equation <math>y - e^x = 0</mat2 KB (287 words) - 10:43, 11 June 2009
- ...an [[eigenvector]] with [[eigenvalue]] equal to unity. For instance, the [[exponential function]] is a fixed point of the [[differential operator]] because the derivative10 KB (1,562 words) - 07:20, 13 November 2013
- ...in [[calculus]] that this law requires that the quantity is given by the [[exponential function]], if we use the correct time scale. This explains the name. This image shows a slightly more complicated example of an exponential function overtaking subexponential functions:14 KB (2,099 words) - 13:37, 10 April 2024
- and so are [[sine]], [[cosine]] and the [[exponential function]]. ...metric functions are in fact closely related to and can be defined via the exponential function using [[Eulers formula in complex analysis|Euler's formula]]).9 KB (1,434 words) - 15:35, 7 February 2009
- ...solve equations in which the unknown appears both outside and inside an [[exponential function]] or a [[logarithm]], such as <math>3x+2=e^x</math> or <math>x=\ln(4x)</mat14 KB (2,354 words) - 21:43, 25 September 2011
- The exponential function of an imaginary number is given as ...not [[one-to-one function|one-to-one]] and hence neither is this complex [[exponential function]]. Therefore it has no inverse function, as the concept of "function" is g19 KB (3,039 words) - 12:51, 7 March 2023
- The same [[Taylor series|series]] may be used to define the ''complex'' exponential function The complex exponential function has the important property that18 KB (3,028 words) - 17:12, 25 August 2013