Find the Laplace Transform of x(t) below: (x(t) 1 21 14 6 -1 O O O...
(1 point) Find the inverse Laplace transform f(t) = C-' (F(3)) of the function F(s) = 45 52 - 16 f(t) = -1 { 4s s2 - 16 } help (formulas) (6+4+2}- Preview My Answers Submit Answers
Find the Laplace transform F(s) - {0} of the function: f(t) = 1-21 0314 2-34 4 <t<6 14 6 by splitting the integral into three pieces. Enter your answers in order of increasing domain.
Find the Laplace transform of the function f(t). f(t) = sint if o St<$21; f(t) = 0 if t> 21 Click the icon to view a short table of Laplace transforms. F(S) =
(4gts) Furst, consider the following two fanctions of time. Find the Laplace transform of each, and evaluate it at s = 4Hz F,(4Hz) ()-4 exp( -6)+5 cos(5t) 0-10 exp(-3t) cos(8t)+300 exp(-20) F,(4Hz) h Next, consider the following two functions of complex frequency s. Find the inverse Laplace transform of each, and evaluate it at 920ms 16 1(920ms) F,(6) s+4s + 68 16 400 200 d. F(s) S(920ms) (s+5y s+6 (You should enter at least 4 digits of precision for each....
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(1 point) Find the Laplace transform F(s) of f(t) { O, t<6 5 sin(at), 6<t<7 0, t> 7 F(8)
A signal x(t) has the following Laplace transform X(s)= 2s+4 $2+45+5 Get x(t) (inverse Laplace Transform) (assume x(t)=0 for t<0) Answer:
Question 1 Find the final value of x(t) with laplace transform: 53 +25 +as+b c54 +55 +25 +65 X(5)=- where a-23, b=37, and c=46. Question 2 Which one of the following represents the Laplace inverse of Y(s) = 4 y(t) = 4t ,120 y(t) = 4u(t) Cy(t)= e-4, t 20 y(t) = 45(t)
Find the Laplace transform of the following continuous-time signal. x(t)=2 e-*cos(30)u(t) Your answer: 5+1 X(s) = s? + 25 + 10 Ox(s) = 25+ 2 52 + 25 + 10 X(s)= 25+2 52 + 25 +9 o X(s)= 5 + 1 s²+25+9 X(s) = 35+3 52 +2s + 10
Find Laplace transform of ?(?) = 2 + 5? Find Laplace transform of ?(?) = 2?-t + 3??-4t Find time function corresponding to this Laplace transform: ?(?) = (2s2+s+1)/(s3-1) Solve this ODE using Laplace transform : ?̈(?)+2?̇(?)+4?(?)=0; ?(0)=1, ?̇(0)=2 Solve this ODE using the Laplace transform : ?̈(?)−2?̇(?)+3?(?)=0; ?(0)=2, ?̇(0)=1
Express the function below using window and step functions and compute its Laplace transform. Ag(t) 10- --00 2 6 10 Click here to view the table of Laplace transforms. Click here to viow the table of nronerties of lanlace transforms O A. g(t) = (2t- 3)uột - 3) + (-2t + 7)-(1-7) O B. g(t) = (2t- 6)Il3,5(t) +(-2t + 14)II5,7t) O c. g(t) = u(t-3)+(21-6)I13,5(t)+(-2t + 14)I15,7(t) + u(t-7) OD. g(t) = (2-6)113,7(t)+(-2t + 14)u(t-5) Compute the Laplace transform...