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- Parsevals_theorem abstract "In mathematics, Parseval's theorem usually refers to the result that the Fourier transform is unitary; loosely, that the sum (or integral) of the square of a function is equal to the sum (or integral) of the square of its transform. It originates from a 1799 theorem about series by Marc-Antoine Parseval, which was later applied to the Fourier series. It is also known as Rayleigh's energy theorem, or Rayleigh's Identity, after John William Strutt, Lord Rayleigh.Although the term "Parseval's theorem" is often used to describe the unitarity of any Fourier transform, especially in physics and engineering, the most general form of this property is more properly called the Plancherel theorem.".
- Parsevals_theorem wikiPageExternalLink Eight_Mathematical.pdf.
- Parsevals_theorem wikiPageExternalLink ParsevalsTheorem.html.
- Parsevals_theorem wikiPageExternalLink Parseval.html.
- Parsevals_theorem wikiPageID "28314528".
- Parsevals_theorem wikiPageID "706435".
- Parsevals_theorem wikiPageLength "56".
- Parsevals_theorem wikiPageLength "5767".
- Parsevals_theorem wikiPageOutDegree "1".
- Parsevals_theorem wikiPageOutDegree "37".
- Parsevals_theorem wikiPageRedirects Parsevals_theorem.
- Parsevals_theorem wikiPageRevisionID "410496328".
- Parsevals_theorem wikiPageRevisionID "676852187".
- Parsevals_theorem wikiPageWikiLink Angular_frequency.
- Parsevals_theorem wikiPageWikiLink Bessels_inequality.
- Parsevals_theorem wikiPageWikiLink Category:Theorems_in_Fourier_analysis.
- Parsevals_theorem wikiPageWikiLink Complex_conjugate.
- Parsevals_theorem wikiPageWikiLink Complex_conjugation.
- Parsevals_theorem wikiPageWikiLink Continuous_Fourier_transform.
- Parsevals_theorem wikiPageWikiLink Cyclic_group.
- Parsevals_theorem wikiPageWikiLink Discrete-time_Fourier_transform.
- Parsevals_theorem wikiPageWikiLink Discrete_Fourier_transform.
- Parsevals_theorem wikiPageWikiLink Discrete_time.
- Parsevals_theorem wikiPageWikiLink Discrete_time_and_continuous_time.
- Parsevals_theorem wikiPageWikiLink Energy_(signal_processing).
- Parsevals_theorem wikiPageWikiLink Engineering.
- Parsevals_theorem wikiPageWikiLink Fourier_series.
- Parsevals_theorem wikiPageWikiLink Fourier_transform.
- Parsevals_theorem wikiPageWikiLink Haar_measure.
- Parsevals_theorem wikiPageWikiLink Imaginary_unit.
- Parsevals_theorem wikiPageWikiLink John_William_Strutt.
- Parsevals_theorem wikiPageWikiLink John_William_Strutt,_3rd_Baron_Rayleigh.
- Parsevals_theorem wikiPageWikiLink Lebesgue_measure.
- Parsevals_theorem wikiPageWikiLink Marc-Antoine_Parseval.
- Parsevals_theorem wikiPageWikiLink Mathematics.
- Parsevals_theorem wikiPageWikiLink Parsevals_identity.
- Parsevals_theorem wikiPageWikiLink Parsevals_theorem.
- Parsevals_theorem wikiPageWikiLink Physics.
- Parsevals_theorem wikiPageWikiLink Plancherel_theorem.
- Parsevals_theorem wikiPageWikiLink Plancherels_theorem.
- Parsevals_theorem wikiPageWikiLink Pontryagin_dual.
- Parsevals_theorem wikiPageWikiLink Pontryagin_duality.
- Parsevals_theorem wikiPageWikiLink Radian.
- Parsevals_theorem wikiPageWikiLink Series_(mathematics).
- Parsevals_theorem wikiPageWikiLink Signal_(electrical_engineering).
- Parsevals_theorem wikiPageWikiLink Signal_(information_theory).
- Parsevals_theorem wikiPageWikiLink Square-integrable_function.
- Parsevals_theorem wikiPageWikiLink Square_integrable.
- Parsevals_theorem wikiPageWikiLink Topological_group.
- Parsevals_theorem wikiPageWikiLink Unitary_operator.
- Parsevals_theorem wikiPageWikiLink Wiener–Khinchin_theorem.
- Parsevals_theorem wikiPageWikiLinkText "Parseval's theorem".
- Parsevals_theorem hasPhotoCollection Parsevals_theorem.
- Parsevals_theorem wikiPageUsesTemplate Template:R_from_modification.
- Parsevals_theorem wikiPageUsesTemplate Template:Reflist.
- Parsevals_theorem subject Category:Theorems_in_Fourier_analysis.
- Parsevals_theorem type Redirect.
- Parsevals_theorem comment "In mathematics, Parseval's theorem usually refers to the result that the Fourier transform is unitary; loosely, that the sum (or integral) of the square of a function is equal to the sum (or integral) of the square of its transform. It originates from a 1799 theorem about series by Marc-Antoine Parseval, which was later applied to the Fourier series.".
- Parsevals_theorem label "Parseval's theorem".
- Parsevals_theorem label "Parsevals theorem".
- Parsevals_theorem sameAs Teorema_de_Parseval.
- Parsevals_theorem sameAs Satz_von_Parseval.
- Parsevals_theorem sameAs Relación_de_Parseval.
- Parsevals_theorem sameAs Teorema_di_Parseval.
- Parsevals_theorem sameAs パーセバルの定理.
- Parsevals_theorem sameAs Парсеваль_теоремасы.
- Parsevals_theorem sameAs Twierdzenie_Parsevala.
- Parsevals_theorem sameAs Teorema_de_Parseval.
- Parsevals_theorem sameAs m.034ddr.
- Parsevals_theorem sameAs Теорема_Парсеваля.
- Parsevals_theorem sameAs Q1443036.
- Parsevals_theorem sameAs Q1443036.
- Parsevals_theorem sameAs 帕塞瓦尔定理.
- Parsevals_theorem wasDerivedFrom Parsevals_theorem?oldid=410496328.
- Parsevals_theorem wasDerivedFrom Parsevals_theoremoldid=676852187.
- Parsevals_theorem isPrimaryTopicOf Parsevals_theorem.