Find F(s). 1. ℒ{te4t } 2. ℒ{t16e−6t} 3. ℒ{(1 − et + 6e−3t)cos(2t)} 4. ℒ-1{(1/(s-3)3 }

Find F(s). ℒ{(1 − e^t + 2e^−5t)cos 6t} F(s) =

Find F(s). ℒ{(1 − e^t + 2e^−5t)cos 6t} F(s) =

Find the Laplace Transform of the following functions: 1. e^(-2t+1) 2. cos^2(2t) 3. sin^2(3t)

Find the Laplace Transform of the following functions: 1. e^(-2t+1) 2. cos^2(2t) 3. sin^2(3t)

If u(t) = sin(6t), cos(2t), t and v(t) = t, cos(2t), sin(6t) , use Formula 4...

If u(t) = sin(6t), cos(2t), t and v(t) = t, cos(2t), sin(6t) , use Formula 4 of this theorem to find d dt u(t) · v(t) .

graph f(t)=t^6-4t^4-2t^3+3t^2+2t on the interval [-3/2,5,2] using matlab

graph f(t)=t^6-4t^4-2t^3+3t^2+2t on the interval [-3/2,5,2] using matlab

Find an arc length parametrization of r(t)=<3t^2, 2t^3>. r(g(s))=<_______________, +-____________________>

Find an arc length parametrization of r(t)=<3t^2, 2t^3>. r(g(s))=<_______________, +-____________________>

Find derivative for the following  : 1- m(t) =-3t (6t^4 -1)^5 m'(t) = 2- y= (3x+2)^5 (4x+1)^-3...

Find derivative for the following  : 1- m(t) =-3t (6t^4 -1)^5 m'(t) = 2- y= (3x+2)^5 (4x+1)^-3 dy/dx 3- y= (10x^2 - 20x +20) e^-4x

Find a unit tangent vector to the curve r = 3 cos 3t i + 3...

Find a unit tangent vector to the curve r = 3 cos 3t i + 3 sin 2t j at t = π/6 .

Find the Laplace transform of: (t^3 - 3t +2)e^(-2t)

Find the Laplace transform of: (t^3 - 3t +2)e^(-2t)

Find the length of the curve x = 3t^(2), y = 2t^(3) , 0 ≤ t...

Find the length of the curve x = 3t^(2), y = 2t^(3) , 0 ≤ t ≤ 1

Find the derivative of the parametric curve x=2t-3t2, y=cos(3t) for 0 ≤ ? ≤ 2?. Find...

Find the derivative of the parametric curve x=2t-3t2, y=cos(3t) for 0 ≤ ? ≤ 2?. Find the values for t where the tangent lines are horizontal on the parametric curve. For the horizontal tangent lines, you do not need to find the (x,y) pairs for these values of t. Find the values for t where the tangent lines are vertical on the parametric curve. For these values of t find the coordinates of the points on the parametric curve.