laplace transform x''(t) - x'(t) - 6 x(t)= e^(4t), x(0)=1, x'(0)=1

Use laplace transform to solve x'' + 16x = cos(4t) x(0)= 0 x'(0)= 1

Use laplace transform to solve x'' + 16x = cos(4t) x(0)= 0 x'(0)= 1

determine the Laplace transform of the following functions: a) f(t) = { 1 if 0 <...

determine the Laplace transform of the following functions: a) f(t) = { 1 if 0 < t < 5, 0 if 5 < t < 10, e^ 4t if t > 10 b) g(t) = 6e −3t − t 2 + 2t − 8

Use Laplace Transform to solve the initial value problem x''+2x'+2x=e-t x(0)=x'(0)=0.

Use Laplace Transform to solve the initial value problem x''+2x'+2x=e-t x(0)=x'(0)=0.

use the laplace transform to solve the initial value problem: y"+4y=4t, y(0)=1, y'(0)=0

use the laplace transform to solve the initial value problem: y"+4y=4t, y(0)=1, y'(0)=0

solve using the laplace transform y''-2y'+y=e^-t , y(0)=0 , y'(0)=1

solve using the laplace transform y''-2y'+y=e^-t , y(0)=0 , y'(0)=1

y^''-y^'-2y= e^t , y(0)=0 and y^'(0)=1 Solve by using laplace transform

y^''-y^'-2y= e^t , y(0)=0 and y^'(0)=1 Solve by using laplace transform

Solve y'-3y=2e^t y(0)=e^3-e using Laplace transform.

Solve y'-3y=2e^t y(0)=e^3-e using Laplace transform.

Solve this Initial Value Problem using the Laplace transform. x''(t) - 9 x(t) = cos(2t), x(0)...

Solve this Initial Value Problem using the Laplace transform. x''(t) - 9 x(t) = cos(2t), x(0) = 1, x'(0) = 3

solve the initial value problem using Laplace transform x"(t)+3x'(t)+2x(t)=t x(0)=0 x'(0)=2 differntial equations

solve the initial value problem using Laplace transform x"(t)+3x'(t)+2x(t)=t x(0)=0 x'(0)=2 differntial equations

1. Find the Laplace transform of a.) f(t)=u(t−4)⋅e^t F(s)= 2. Find the inverse Laplace transform of...

1. Find the Laplace transform of a.) f(t)=u(t−4)⋅e^t F(s)= 2. Find the inverse Laplace transform of a.) F(s)=2e^(−3s)−e^(−2s)−3e^(−6s)−e^(−9s)/s f(t) = b.) F(s)=e^(−6s)/s^2−3s−10 f(t) = c.) F(s)=4e^(−9s)/s^2+16 f(t) =