when we have need to know the temperature in a bar about any distance we can use fourier series to know that and then we can apply sufficient temperature.
what are the limitations of forier series over fourier transform
The Fourier series is a specific type of infinite mathematical series involving trigonometric functions that are used in applied mathematics. It makes use of the relationships of the sine and cosine functions.
Yes. For example: A square wave has a Fourier series.
Fourier series is series which help us to solve certain physical equations effectively
Fourier series and the Fourier transform
when we have need to know the temperature in a bar about any distance we can use fourier series to know that and then we can apply sufficient temperature.
what are the limitations of forier series over fourier transform
yes a discontinuous function can be developed in a fourier series
The Fourier series is a specific type of infinite mathematical series involving trigonometric functions that are used in applied mathematics. It makes use of the relationships of the sine and cosine functions.
no
Yes. For example: A square wave has a Fourier series.
Fourier series is series which help us to solve certain physical equations effectively
Fourier series is the sum of sinusoids representing the given function which has to be analysed whereas discrete fourier transform is a function which we get when summation is done.
The fourier series of a sine wave is 100% fundamental, 0% any harmonics.
Joseph Fourier was the French mathematician and physicist after whom Fourier Series, Fourier's Law, and the Fourier Transform were named. He is commonly credited with discovering the greenhouse effect.
Yes, a Fourier series can be used to approximate a function with some discontinuities. This can be proved easily.