i hope it will help you for any quary comment please...
y=ylxy' ) (7 F Solve the D.E 4. y=ylxy' ) (7 F Solve the D.E 4.
(14) < 4 > Solve by using Laplace transform: y"+9y-30e'; y(0)-0, y' (0) 0 (14) Solve by using Laplace transform: y"+9y-30e'; y(0)-0, y' (0) 0
4. Solve the initial-value problem y" – 6y' +9y = 0, y(0) = 0, y'(0) = 1
6. Given the D.E: y = 9y' + 20y = r(t) y(0) = 10 y'(O) = 2 that describes a circuit with input r(t). To find the impulse response of the system, h(t) you would: Y(S) i. Find = H(s) including the initial conditions, then find h(t) by taking the R(S) inverse Laplace transform. ii. Find Y(s) = H(s) with the initial conditions set to zero , then find h(t) by taking R(S) the inverse Laplace transform. iii. Give up...
4. Solve the initial value problem: y' +9y' + 20y = 0, y(0) = 1, and y'(0) = 0
Can you solve these dif. equations? Solve the following D.E. (3.+ 2y)dx + (4.xy + 6y2)dy = 0 Solve the following D.E. (x²y)dx + y(x3 +e-3y sin y)dy = 0
Solve the given differential equation. x2y" + xy' + 9y = 0 y(x) = ,X > 0
Use Laplace Transform to solve the following Differential Equations b) y'' +9y x?, y(0) = 0, y (0) = 0.
SOLVE #3 AND #4 PLEASE Use the Laplace transformation to solve the IVP. 1. y"-6y' + 9y-24-9t, y(0)-2, y, (0)-0 2. 9y" - 12y'4y50ey(0)--1,y'(0)2 3. У"-2y'--. 1 2 cos(2t) + 4 sin(2t),y(0)-4,y'(0)-0 Use the Laplace transformation to solve the IVP. 1. y"-6y' + 9y-24-9t, y(0)-2, y, (0)-0 2. 9y" - 12y'4y50ey(0)--1,y'(0)2 3. У"-2y'--. 1 2 cos(2t) + 4 sin(2t),y(0)-4,y'(0)-0
Solve the initial value problem. 7 dy + 9y - 9 e-X = 0, y(0) = dx 8 The solution is y(x) =