Questions tagged [fourier-series]

A Fourier series is a decomposition of a periodic function as a linear combination of sines and cosines, or complex exponentials.

If $f$ is a periodic function with period $2\pi$, a Fourier series for $f$ is an expansion of the form $$ f(x) = \frac{a_0} 2 + \sum_{n = 1}^\infty a_n \cos nx + \sum_{n = 1}^\infty b_n \sin nx .$$

This decomposition is useful for solving partial differential equations, and it has important applications in the study of waves.

If $f$ is continuously differentiable, a theorem of Dirichlet states that a Fourier expansion exists where the infinite sums converge uniformly to $f$. Under the weaker assumption that $f \in L^2[0,2\pi]$, there exists a Fourier expansion where the infinite sums converge to $f$ in the $L^2$ sense.

The sines and cosines appearing in the Fourier expansion form an orthogonal basis for $L^2[0,2\pi]$. Therefore, a simple way of evaluating the $a_n$ and $b_n$ coefficients is by orthogonal projection, $$ a_n = \frac 1 \pi \int_0^{2\pi} f(x) \cos nx\ \mathrm dx, \ \ \ \ \ \ \ \ \ b_n = \frac 1 \pi \int_0^{2\pi} f(x) \sin nx\ \mathrm dx.$$

5656 questions
0
votes
2 answers

Show identity using fourier-coefficents.

I have to show that $$\sum_{i=1}^{\infty}\frac{(-1)^n}{4n^2-1} = \frac{2-\pi}{4}$$ using the fourier-coefficents of $\cos(\frac{x}{2}), x \in ]-\pi,\pi[$. I know that $c_0 = \frac{2}{\pi}$ and that $$c_n = \frac{(-1)^n}{2\pi(\frac14-n^2)}$$ and I…
0
votes
0 answers

Finding the Fourier series of a piecewise function (see description)

I'm struggling with this fouries series exercise. I'm pretty sure I get the wrong answer, but I don't know where I'm going wrong. The task Find the Fourier series of f(x), given that f(x) is a periodic function. My attempt at solving the…
0
votes
0 answers

How to proceed with this Fourier series?

$$f(x)=\begin{cases}0&-5\leq x<0\\3&0\leq x<5\end{cases}\\\text{with } f(x+10)=f(x)$$ is the function I need to make a Fourier series on, I know where to start, but I get confused along the way and I don't know in general how to "finish up" a…
0
votes
0 answers

Beginner to Fourier series, stuck on an exercise.

This is the function I need to make a Fourier series on, I know where to start, but I get confused along the way and I don't know in general how to "finish up" a Fourier series. My own solution so far so you can follow my thoughts, used variables…
0
votes
0 answers

Calculating $\sum_{n=1}^\infty \frac{n^2}{(4n^2-1)^2}$ using Fourier series

Let $f(x)$ be a periodic function such that $f(x+\pi)=f(x)$ and $f(x)=\cos{x}$ for $0 < x < \pi$, I need to calculate the series $$\sum_{n=1}^\infty \frac{n^2}{(4n^2-1)^2}$$ using $f(x)$'s Fourier series. I defined a new function $g(x)$ such that…
0
votes
1 answer

Expansion in sine Fourier series

find the half range sine expansion Fourier series of the following function f(t)=t(π-t) 0≤t≤π find bn
0
votes
0 answers

Does the Fourier series of abs(x) converge uniformly?

$f(x)=|x|, x\in[-\pi,\pi[$ is a $2\pi$-periodic function. Does the Fourier series for $f(x)$ converge uniformly to $f(x),x\in\mathbb{R}$? Answer in my book is yes, but how can it when $f'(x)=\frac{x}{|x|}$ is not defined at $x=0$ i.e. function is…
0
votes
0 answers

Fourier series exponential form

The Fourier series exponential form is $$\sum_{k=-n}^n c_n e^{2\pi ikx}$$ Is $e^{-2\pi ik} = 1$ and why and why is $-e^{-\pi ik}$ equal to ${(-1)^{k+1}}$ and $e^{-\pi ik} = {(-1)^{k}}$, for this I can imagine for $k=0$ that both are equal but for…
0
votes
0 answers

Prove that $2\pi$ periodic function, $f$, with Fourier coefficients equal zero if $n$ is odd

Let $f$ be a continuous, $2\pi$-periodic function and suppose that its Fourier coefficients, $a_n$ and $b_n$, equal $0$ when $n$ is odd, i.e., \begin{equation} \int_{-\pi}^\pi f(x)\cos (nx)\,dx=\int_{-\pi}^\pi f(x)\sin (nx)\,dx=0,\quad n \ne…
water
  • 3
0
votes
1 answer

Fourier series question

How do we know that a Fourier series expansion does exist for a given function $f(x)$? I mean, if $f(x)=x$ and we suppose that $x=a_1\sin(x)+a_2\sin(2x)$ with $-\pi\leq x \leq \pi$ the Fourier coefficients $a_1$ and $a_2$ still being the same as if…
dot dot
  • 1,582
  • 1
  • 12
  • 22
0
votes
1 answer

Fourier series identity

I need to prove that $\dfrac{a \sin(bx)}{1 - 2a \cos(bx) + a^2} = \sum_{n=1}^\infty a^n \sin(nbx)$ where $|a| < 1$. It seems that this can be proved by using Euler's formula identities for $\cos(bx)$ and $\sin(bx)$ and substituting $z = e^{ibx}$.…
Algar
  • 3
0
votes
0 answers

So I am learning how to do Fourier series expansion

So I am learning how to do Fourier series expansions by writing the function expression from given graphs: To find the series, we calculate A0,An and Bn and plug those values in the main Fourier series formula and get a few trigonometric components…
0
votes
1 answer

Determine a formula for a given 'bn' in a Fourier representation

I have a function $ f $ and it's derivative $f'$ that are both continuous on $ [0,2\pi] $ and for any $x$ in this range : $$ f'(x) = a_0 + \sum_{n=1}^\infty (a_n\cos(nx) + b_n\sin(nx))$$ I've been asked to: Determine a formula for $b_8$ in terms of…
Charlie P
  • 253
0
votes
0 answers

Obtaining Fourier Coefficients without calculating them?

I have a graph for a function $f(x)$: If I have the fourier series representation of the function, is it possible for me to obtain the fourier coefficients without actually having to calculate them? Would I be able to do this using the graph and…
Charlie P
  • 253
0
votes
0 answers

Why must Complex Fourier series be used to find Summation of $1/(n^2+1)$?

Now I am not by any means skilled in this level of calculus, but I don't understand something. When I use Fourier series and calculate the coefficients by using $f(x)=e^x$, and plug in $x=\pi$, I get something completely different for…