Use Laplace Transform to identify Y(s) of the DE: y"-y'-by = 0, given y(0) = 1,...
Use Laplace Transform to identify Y(s) of the DE: " + y = cost, with given conditions y(0) = 1, y'(0) = 0. (Do not solve for y.) y (3) 8(82+2) None of them Y(8) = 1 - 2 32+1 + (52+1) (52 +1) Y(s) s(s2 +2) $2+1
Solve IVP by the Laplace Transform: y" + y = ezt , given y(0) = 0, y'(O) = 1. a) Identify Y(s) = L{y}. 3) Solve for y(t). 8 a) Y (s) = + $2 b) y(t) = } (e2t – cost + 3 sin t) Both of them None of them 3 2+1 +22+1 O a) Y (s) = -2 b) y(t) = e2t - cost + 3 sint
Solve IVP by the Laplace Transform: y" + y = ezt given y(0) = 0, y'(O) = 1. a) Identify Y(s) = L{y} 3) Solve for y(t). Both of them a) Y (8) 21 + 3 52 +1 $-2 b) y(t) = } (e2t - cost + 3 sin t) 1 3 a) Y (8) 8 g2+1 + $-2 g²+1 b) y(t) = 22 cost + 3 sint None of them
Need Help with this Laplace transform
Solve IVP by the Laplace Transform: y"+y=e2t , given y(0) = 0, y'(0) = 1. a) Identify Y(s) = L{y}. 3) Solve for y(t).
Use Laplace transform to identify F(x) y''-y'-6y=0 with y(0)=1 & y'(0)=2
The Laplace transform of y(t) is Y(s). Find the Laplace transform of po py(e) + 8 minute) –80(), in terms of Y(s), using y(0) = 4 and y' (O) = 3. (Do not forget to use a multiplication sign when multiplying.) and are not to mentioning el seu pare sa ive) – 8,0}-
Solve the DE, given x > 0. 2 dy dar +y = = 3 In x с Oy= (In x - 2) + 2 None of these Oy= (In x - 2) +C Both of them
QUESTION 1 The Laplace Transform y"-16y=16u(t) Use the Laplace Transform to solve y(O)=0 (y'(0)=0.
Question 9 3 pts The Laplace transform of the piecewise continuous function J4, 0< < 3 f(t) is given by 2, t> 3 2 L{f} (2 - e-st), 8 >0. S L{f} (1 – 3e-), 8>0. 8 2 L{f} (3 - e-s), 8 >0. S L{f} = (1 – 2e-st), s > 0. None of them Question 10 3 pts yll - 4y = 16 cos 2t To find the solution of the Initial-Value Problem y(0) = 0 the y...
Use Laplace Transform to solve the given initial-value problem. et y'" – 16y y(0) = y"(0) y'(o) 0 = 4