2. Express the function f(t) = 1, -5<t<0                                   &nb

Express the function f(t) = t, defined ONLY in the domain 0<t<3, as i) a half-range...

Express the function f(t) = t, defined ONLY in the domain 0<t<3, as i) a half-range sine series and ii) a half-range cosine series. In each case, confirm the value of f(t) at t=2.

In the interval −π < t < 0,       f(t) = 1; and for 0 < t...

In the interval −π < t < 0,       f(t) = 1; and for 0 < t < π, f(t) = 0.     f(t) = f(t+2 π) Find the following for f(t) as associated with the Fourier series: a0 =? an =?   bn =? ωo =?

The sketch of the following periodic function f(t) given in one period, f(t) = {(3t+1), -1...

The sketch of the following periodic function f(t) given in one period, f(t) = {(3t+1), -1 < t <= 1 and 0, -3 < t <= -1 a) Find period of the function, 2p? b) Find Fourier coeff, a0, an (n =>1), bn? c) Fourier series representation of f(t)? d) Result from (c), find the first four non-zero term?

Find the Fourier Series of the function: f(x)=0, -5<x<0, f(x)=3, 0<x<5 with a period=10. Write briefly...

Find the Fourier Series of the function: f(x)=0, -5<x<0, f(x)=3, 0<x<5 with a period=10. Write briefly about how such a series expansion could be used? For example, in digital to analog conversion?

Expand the function f(x) = x^2 in a Fourier sine series on the interval 0 ≤...

Expand the function f(x) = x^2 in a Fourier sine series on the interval 0 ≤ x ≤ 1.

Find the Fourier series of the function: f(x) = {0, -pi < x < 0 {1,...

Find the Fourier series of the function: f(x) = {0, -pi < x < 0 {1, 0 <= x < pi

a. Let f be an odd function. Find the Fourier series of f on [-1, 1]...

a. Let f be an odd function. Find the Fourier series of f on [-1, 1] b. Let f be an even function. Find the Fourier series of f on [-1, 1]. c. At what condition for f would make the series converge to f at x=0 and x=1?

Calculate the Fourier series expansion of the function: f(x) =1/2(π-x) , when 0 < x ≤...

Calculate the Fourier series expansion of the function: f(x) =1/2(π-x) , when 0 < x ≤ π   and f(x) = - 1/2(π+x), when -π ≤ x < 0

Find the Fourier series for the following function (which has period 2): f(x)= −x if −1<x<0...

Find the Fourier series for the following function (which has period 2): f(x)= −x if −1<x<0   x if 0 < x < 1

Derive the Fourier series for the function f(x) = x + 1/2 for −1 < x...

Derive the Fourier series for the function f(x) = x + 1/2 for −1 < x < 1; plot the function and its Fourier series for −3 < x < 3.