Fourier-series expansion - перевод на русский
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Fourier-series expansion - перевод на русский

DECOMPOSITION OF PERIODIC FUNCTIONS INTO SUMS OF SIMPLER SINUSOIDAL FORMS
Fourier expansion; Fourier coefficient; Fourier mode; Fourier theorem; Fourier Theorem; Fourier coefficients; Fourier sine series; Fourier decomposition; Trigonometric sum; Fourier modes; Trigonometric approximation; Fourier's theorem; Normal Fourier modes; Hilbert Spaces and Fourier analysis; Examples of Fourier Series; Fouriers Series; Fourier Series; Continuous-time Fourier series; Complex Fourier series
  • pages=Appendix B}}</ref> in Appendix B.)
  • The [[atomic orbital]]s of [[chemistry]] are partially described by [[spherical harmonic]]s, which can be used to produce Fourier series on the [[sphere]].
  • Heat distribution in a metal plate, using Fourier's method
  • Sines and cosines form an orthogonal set, as illustrated above. The integral of sine, cosine and their product is zero (green and red areas are equal, and cancel out) when <math>m</math>, <math>n</math> or the functions are different, and π only if <math>m</math> and <math>n</math> are equal, and the function used is the same. They would form an orthonormal set, if the integral equaled 1 (that is, each function would need to be scaled by <math>1/\sqrt{\pi}</math>).
  • Animated plot of the first five successive partial Fourier series
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Fourier-series expansion      

общая лексика

разложение в ряд Фурье

fourier series         

общая лексика

ряд Фурье

Fourier coefficient         
коэффициент ряда Фурье

Определение

дрифт
муж., мор. конец борта при окончании шканец, юта и бака.
| Разность между толщиной болта и размером дыры или гнезда его: простор, зазор.

Википедия

Fourier series

A Fourier series () is an expansion of a periodic function into a sum of trigonometric functions. The Fourier series is an example of a trigonometric series, but not all trigonometric series are Fourier series. By expressing a function as a sum of sines and cosines, many problems involving the function become easier to analyze because trigonometric functions are well understood. For example, Fourier series were first used by Joseph Fourier to find solutions to the heat equation. This application is possible because the derivatives of trigonometric functions fall into simple patterns. Fourier series cannot be used to approximate arbitrary functions, because most functions have infinitely many terms in their Fourier series, and the series do not always converge. Well-behaved functions, for example smooth functions, have Fourier series that converge to the original function. The coefficients of the Fourier series are determined by integrals of the function multiplied by trigonometric functions, described in Common forms of the Fourier series below.

The study of the convergence of Fourier series focus on the behaviors of the partial sums, which means studying the behavior of the sum as more and more terms from the series are summed. The figures below illustrate some partial Fourier series results for the components of a square wave.

Fourier series are closely related to the Fourier transform, which can be used to find the frequency information for functions that are not periodic. Periodic functions can be identified with functions on a circle, for this reason Fourier series are the subject of Fourier analysis on a circle, usually denoted as T {\displaystyle \mathbb {T} } or S 1 {\displaystyle S_{1}} . The Fourier transform is also part of Fourier Analysis, but is defined for functions on R n {\displaystyle \mathbb {R} ^{n}}

Since Fourier's time, many different approaches to defining and understanding the concept of Fourier series have been discovered, all of which are consistent with one another, but each of which emphasizes different aspects of the topic. Some of the more powerful and elegant approaches are based on mathematical ideas and tools that were not available in Fourier's time. Fourier originally defined the Fourier series for real-valued functions of real arguments, and used the sine and cosine functions in the decomposition. Many other Fourier-related transforms have since been defined, extending his initial idea to many applications and birthing an area of mathematics called Fourier analysis.

Как переводится Fourier-series expansion на Русский язык