do the following convolution
sinc(600t)*sinc(1000t)
find the fourier transform of sinc(600t)sinc(1000t) (two sinc functions multiplied together)
Using the convolution property of Fourier Transform to find the following convolution: sinc (t) * sinc (4t): [Hint: sinc (t) ön rect(w/2)] sinc(t)sinc(2t) 8 TT 2 sinc(t) п sinc (2t) п sinc (4t) 4
Using the convolution property of Fourier Transform to find the following convolution: sinc (t) * sinc(41) [Hint: sinc(t) TE rect(w/2)) 77 4 sinc (41) 71 sinc(2) TT sinc(t) RICO sinc(t)sinc(20)
Derive and sketch the fourier transform: g(x) = sinc(x/10)*cos(2πx) (where * denotes convolution)
need help with these two. thank you! Using the convolution property of Fourier Transform to find the following convolution: sinc(t) * sinc(40) [Hint: sinc(t) rect(w/2)] F TT sinc (4t) TE z sinc (26) TE 2 sinc(t) TT sinc (t) sinc(2t) Question 6 (10 points) Determine poles and zeros of transfer function H(s) 2(3-3) +58 +6 Zero: -3; Poles: -2 and -3 Zero: 3; Poles: -2 and -3 Zero: 2; Poles: -2 and 3 Zero: 0; Poles: 2 and -3
) For a message signal m(t) = 2 cos( 1000t) 9 cos(2000t) a) Write expressions (do not sketch) for φPM(t) and qEM(t) when A = 10, a).-10°, k,-1000T, and k,-1. For determining ΦFM(), use the indefinite integral of m(); that is, take the value of the integral at t to be 0. b) Estimate the bandwidth of φPM(t) and φFM(t).
9. Find the phasor equivalents of the following currents: (a) ii(t) = 10 cos(1000t + 30°) i2(t) = 5 cos(10000) + 5 sin(1000t).
Problem 1. Determine vc(t) and iL(t) for the following circuit if is1 = 0.04 cos(1000t) and is2 = 0.02 cos(1000t − 90o ) Assessment Problem 1. Determine v.() and i.(t) for the following circuit if i 0.04 cos(10001) and i, -0.02 cos(1000t -909) 100mH 200Ω 2002 200Ω HI Assessment Problem 2. Determine the Thevenin equivalent cireuit for the tollowing as ming that w 100 rad/ec 4Ω 112. 10mE 20mH
3. Determine the convolution of rectuln +) and recol"-). Do this analytically first and plot the result by hand. Then use the conv command in MATLAB to compute the convolution of these two signals. Also plot the result.
Find the convolution of the following functions. After integrating find the LaPlace transform of the convolution f(t)=t^2 g(t)=e^-t