Question

18. Given f(t) = e-at sin(bt) u(t) Using the Laplace transform properties find the Laplace transform of a) g(t) = tf(t) b) m(t) = f(t - 3) this means replace all the occurrences of t with t-3 in f(t)

Answer 1

The given problem is from Signals and Systems whose solution has been provided below.

018 f(+) = eat Sirbt)u(+) Solution We know that Laplace toans form of Sinbt) is Sinbt Laplace b S² +6² Frequency Shift property : If a(t) Leplece xo Exe(t Laplace x(sta -at ex(+) Using this property, Sinbt ult) Laplace, b. e at (Sta)²+6² b (Sta² +6² g(t) = + f(t) Time multiplication property y xH) Loploces XC) Laplece es - 4 txt as Using this property, = 6 (3 = - d F (5 L&g(t)} ds

> G(s) = d b ds L(Sta)²+6² td [[sta)²+62] ds - 6 xl-D [sta)² +67 *d let 9*+b] - G (5 = 6 [ ditch = neht [S+a) +62] 2.(sta) = (ي)) Ans 2b (sta) [[S+a)? +6?)? m(+= f(t-3 Time Shifting property. If xlto Laplace, X = X(t-to) Laplece -sto X(s. e Using this property, M (6 = F(s.e -35 b.2-3s (Sta)2 +6² An m (s) = b.e-35 (Sta)²+6²