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- In [[mathematics]], the '''Fourier series''', named after [[Joseph Fourier]] (1768—1830), refers to an infinite ...xi;), ''Fourier's theorem'' states that an [[infinite series]], known as a Fourier series, is equivalent (in some sense) to such a function:7 KB (1,088 words) - 10:11, 11 June 2012
- 12 bytes (1 word) - 13:01, 26 September 2007
- * {{cite book | author=I.N. Sneddon | title=Fourier series | series=Library of Mathematics | publisher=Routledge and Kegan Paul | year155 bytes (20 words) - 17:44, 9 November 2008
- 181 bytes (25 words) - 16:58, 12 January 2010
- 604 bytes (87 words) - 17:03, 12 January 2010
Page text matches
- was a French mathematician and physicist credited with describing the Fourier series based on which the Fourier transform has been formed.174 bytes (24 words) - 00:30, 2 July 2008
- * {{cite book | author=I.N. Sneddon | title=Fourier series | series=Library of Mathematics | publisher=Routledge and Kegan Paul | year155 bytes (20 words) - 17:44, 9 November 2008
- The decomposition of a [[signal]] into a [[Fourier series]].96 bytes (12 words) - 07:32, 7 April 2010
- Fourier series of the following real vector fields: electric field, magnetic field, and ve141 bytes (18 words) - 03:20, 5 December 2009
- {{rpl|Fourier series}}162 bytes (18 words) - 10:54, 26 July 2023
- ...a French mathematician and physicist. He is credited with describing the [[Fourier series]] based on which the [[Fourier transform]] has been formed. He is also gene *Mathematics - Fourier series1 KB (184 words) - 13:47, 27 July 2020
- {{r|Fourier series}}436 bytes (54 words) - 11:42, 15 June 2009
- ...spatial domain, [[separation of variables]] is often used along with the [[Fourier series]].807 bytes (129 words) - 22:12, 3 September 2010
- {{r|Fourier series}}794 bytes (118 words) - 02:53, 7 November 2008
- {{r|Fourier series}}635 bytes (94 words) - 17:06, 12 January 2010
- ...nction. Formally speaking, a Fourier transform can be thought of as the "[[Fourier series]]" of function with an infinite period, and this was the conceptual idea th3 KB (547 words) - 07:21, 24 December 2008
- * [[Fourier series]]896 bytes (139 words) - 00:49, 2 July 2008
- {{r|Fourier series}}823 bytes (110 words) - 08:09, 22 September 2008
- In [[mathematics]], the '''Fourier series''', named after [[Joseph Fourier]] (1768—1830), refers to an infinite ...xi;), ''Fourier's theorem'' states that an [[infinite series]], known as a Fourier series, is equivalent (in some sense) to such a function:7 KB (1,088 words) - 10:11, 11 June 2012
- {{r|Fourier series}}547 bytes (68 words) - 19:27, 11 January 2010
- {{r|Fourier series}}716 bytes (105 words) - 18:25, 13 July 2012
- Then, the expansion into the Fourier series can be written as ==Numerical test of the expansion to the Fourier series==11 KB (1,680 words) - 18:00, 8 September 2020
- * R. V. Churchill, "Fourier Series and Boundary Value Problems", pp. 70-72, (1963) McGraw-Hill, ISBN 0-07-0108895 bytes (121 words) - 16:48, 26 August 2009
- ...ity of Illinois at Urbana-Champaign}} An explanation of the application of Fourier series to music.1 KB (173 words) - 12:02, 12 June 2012
- ...r function ''f''(''x''), with 0 ≤ ''x'' ≤ ''L'', has the following [[Fourier series|Fourier expansion]]: The substitution of the Fourier series of '''A''' into the wave equation yields for the individual terms,15 KB (2,576 words) - 00:07, 1 December 2010