Can anyone please help solve both question? Appreciate your help. Thank you
fourier sine and cosine transform
Can anyone please help solve both question? Appreciate your help. Thank you By direct integration, find...
I really appreciate it. please explain in detail. Thank you. a) f(t) = r|t| -1<t<1 t = 1 Compute the Fourier integral representations of f(t). It > 1 NI b) g(t (t, ostsi t = 1 Compute the Fourier cosine integral representation of g. t> 0 c) Compute the Fourier sine integral representation
need help solving thank you Fourier Transforms • Find the Fourier transform of et if -a<x<a 0 otherwise. • Find the Fourier transform of S f(0) = 3 10 if - 1<x<1 otherwise
please answer both questions 3. A function f(t) defined on an interval 0 <t<L is given. Find the Fourier cosine and sine series of f. f() = 6(1-1),0 <t< 4. Find the steady state periodic solution, *xp(t) of the following differential equation. *" + 5x = F(t), where FC) is the function of period 2nt such that F(t) = 18 if 0 << < 1 and F(t) = -18 if t <t <200.
Can anyone please help solve the question? Appreciate your help. Thank you Exercise 4 1-10 Compute A" using block multiplication, where A Ans:8 8 0 0 0 16
PLEASE SOLVE BOTH QUESTIONS. THANK YOU! Find the Laplace transform, F(s) of the function f(t) = t. t > 0 F(s) = ,s > 0 Question Help: Video Message instructor Submit Question Find the inverse Laplace transform of F 88 – 13 $2 – 55 – 6 3 s +1 S - 6 f(t) = Question Help: Message instructor Submit Question
Please solve for part (b) and (c) thank you! 1. Consider the function f(x) = e-x defined on the interval 0 < x < 1. (a) Give an odd and an even extension of this function onto the interval -1 < x < 1. Your answer can be in the form of an expression, or as a clearly labelled graph. [2 marks] (b) Obtain the Fourier sine and cosine representation for the functions found above. Hint: use integration by parts....
Problem 1 Expand the periodic functions (defined on the interval T. In a sine cosine ouer seres. (a) f(x) = (1+r) for-r < x < π f(x) for 0 -π<x < 0 for sinx 0<x<π = (c) f(x) ez for-r < x < π
This is from signal and system course. please i need a clear easy to understand steps. Find the cosine representation Fourier series for the signal: x(t) = t? for – 1<t <1
Problem 1. Expand f(x) em 1. Expand fo) (1.0 ,-π < x < 0 0, 0<X<T in a sine, cosine Fourier series. write out a few 0, 0<x<π in sine,cosine Fourier series Write out aferw terms of the series
section is fourier series and first order differential equations 0 Find the Fourier Coefficients a, for the periodic function f(x) = {: for-2<2<0 O for 0 < x < 2 f(x + 4) = f(x) Find the Fourier Coefficients bn for the periodic function 2 f(x) = -{ for -3 <3 <0 10 for 0 < x <3 f(x+6) = f(x) Determine the half range cosine series of 2 f(x) 0<<< f(x + 2) = f(x) dy Given that =...