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2.4. HARMONIC FOURIER SERIES 57 Problem 2. Consider the function f in L? (0,2m) given by...
= Problem #2: The function f(x) sin(4x) on [0:1] is expanded in a Fourier series of period Which of the following statement is true about the Fourier series of f? (A) The Fourier series of f has only cosine terms. (B) The Fourier series of f has neither sine nor cosine terms. (C) The Fourier series of f has both sine and cosine terms. (D) The Fourier series of f has only sine terms.
find the Fourier cosine and sine series for the function f defined on an interval 0<t<L and sketch the graphs of the two extensions of f to which these two series converge: f(t)=1-t, 0<t<1
Fourier Series Expand each function into its cosine series and sine series for the given period P = 2π f(x) = cos x
Problem 11.5. Find the Fourier cosine series of the function f(x): f(x) = 1 +X, 0 < x < .
(1 point) Find the appropriate Fourier cosine or sine series expansion for the function f(x) = sin(x), -A<<. Decide whether the function is odd or even: f(3) = C + C +
a) Expand the given function in a Fourier series in the range of [-411, 41] (12 Marks) f(x) = { 1 0<x SI (sin(x) < x < 211 To what values will the Fourier Sine Series converge at x = -31, x = 0 and x = 27t? (3 Marks)
Question 4. Calculate the Fourier sine series and the Fourier cosine series of the function f(x) = sin(x) on the interval [0, 1]. Hint: For the cosine series, it is easiest to use the complex exponential version of Fourier series. Question 5. Solve the following boundary value problem: Ut – 3Uzx = 0, u(0,t) = u(2,t) = 0, u(x,0) = –2? + 22 Question 6. Solve the following boundary value problem: Ut – Uxx = 0, Uz(-7,t) = uz (77,t)...
(2) Consider the function f(x)- 1 (a) Find the Fourier sine series of f (b) Find the Fourier cosine series of f. (c) Find the odd extension fodd of f. (d) Find the even extension feven of f. (e) Find the Fourier series of fod and compare it with your result -x on 0<a < 1. in (a) (f) Find the Fourier series of feven and compare it with your result in (b)
3. A function f(t) defined on an interval 0 <t<L is given. Find the Fourier cosine and sine series off. f(t) = 6t(11 – t), 0 <t<n
(1 point) Consider the Fourier sine series: ) 14, sin( f(z) a. Find the Fourier coefficients for the function f(x)-9, 0, TL b. Use the computer to draw the Fourier sine series of f(x), for x E-15, 151, showing clearly all points of convergence. Also, show the graphs with the partial sums of the Fourier series using n = 5 and n = 20 terms. (1 point) Consider the Fourier sine series: ) 14, sin( f(z) a. Find the Fourier...