We define a function by:

and we suppose that f (x + 2) = f (x) for all x ∈ R.
(a) Draw the graph of the function f (x) over the interval [−3,
3].
(b) Find the Fourier series for the function f (x).


Let be a function defined by:
We define by extension the odd, periodic function of period p = 2
which coincides with the function f (x) on the interval [0, 1].
Draw over the interval [−1, 3] the graph of the function towards
which the Fourier series of the odd continuation of the function f
(x) converges.
f(x) = 1 + x2 pour 0 < x < 1.
Graph the function f ro -2<x<0 f(x) = +1 O 5x<1 1 1 sx<2 Find the Fourier series of fon the given interval. Give the number to which the Fourier series converges
We consider a periodic function of period p = 4 defined by:
Draw the graph of the function to which the Fourier series of the
function g (x) converges on the interval [−6, 6]
x + 2, g(x) -2 < x < 0; 0 < x < 2. 1- x,
find fourier series of
Question 3 Find Fourier series of f(x)= 0 if -55x<0 and f(x) = 1 if 0<x<5 which f(x) is defined on (-5,5).
3. Consider the periodic function defined by -ae sin(x) 0 x < 7T f(x) and f(x) f(x2t) - (a) Sketch f(x) on the interval -37 < x < 3T. (b) Find the complex Fourier series of f(x) and obtain from it the regular Fourier series
Consider f(x) = x[x] - 1<x< 1 Is the function even? Odd? Or neither/ Expand f in an appropriate series. Find the limit of the series on the interval (-1,1).
1. [8] Given x + 2, -2 < x < 0 f(x) = 12 – 2x, 0<x< 2, f(x + 4) = f(x) (a)[3] Sketch the graph of this function over three periods. Examine the convergence at any discontinuities (b)[5] Find the Fourier series of f(x) 2.[10]For the function, f(x), given on the interval 0 < x <L (a)[4] Sketch the graphs of the even extension g(x) and odd extension h(x) of the function of period 2L over three periods...
Find the required Fourier Series for the given function f(x).
Sketch the graph of f(x) for three periods. Write out the first
five nonzero terms of the Fourier Series.
cosine series, period 4 f(0) = 3 if 0<x<1, if 1<x<2 1,
(a) Find the Fourier series for f(x) = -x, -1<x<1 f(x+2) = f(x)
Suppose that the probability density function of X is f(x) {cx3 0 1< x < 5 otherwise where c is a constant. Find P(X < 2).