Using the Laplace Transform to solve a spring mass system that is critically damped

Problem Statement

An 98 Newton weight is attached to a spring with a spring constant k of 40 N/m. The spring is stretched 4 m and rests at its equilibrium position. It is then released from rest with an initial upward velocity of 2 m/s. The system contains a damping force of 40 times the initial velocity.

Solution

Given

$m={\frac {98}{9.81}}$

${\text{Spring Constant k=40}}\,$

${\text{Damping Constant C=40}}\,$

${\text{x(0)=0}}\,$

${\dot {x}}(0)=-4$

${\text{Standard equation: }}\,$

$m{\frac {d^{2}x}{dt^{2}}}+C{\frac {dx}{dt}}+khx=0$

Solving the problem

${\text{Therefore the equation representing this system is.}}\,$

${\frac {98}{9.8}}{\frac {d^{2}x}{dt^{2}}}=-40x-40{\frac {dx}{dt}}$

${\text{Now we put the equation in standard form}}\,$

${\frac {d^{2}x}{dt^{2}}}+{\frac {40}{10}}{\frac {dx}{dt}}+{\frac {40}{10}}x=0$

${\text{Now that we have the equation written in standard form we need to send}}\,$ ${\text{it through the Laplace Transform.}}\,$

${\mathcal {L}}[{\frac {d^{2}x}{dt^{2}}}+{\frac {40}{10}}{\frac {dx}{dt}}+{\frac {20}{5}}x]$

${\text{And we get the equation (after some substitution and simplification)}}.\,$

$\mathbf {s} ^{2}{X}(s)+4\mathbf {s} {X}(s)+4\mathbf {X} (s)=-4$

$\mathbf {X} (s)(s^{2}+4s+4)=-4$

$\mathbf {X} (s)=-{\frac {4}{(s+2)^{2}}}$

${\text{Now that we have completed the Laplace Transform}}\,$ ${\text{and solved for X(s) we must so an inverse Laplace Transform. }}\,$

${\mathcal {L}}^{-1}[-{\frac {4}{(s+2)^{2}}}]$

${\text{and we get}}\,$

$\mathbf {x} (t)=-4te^{-2t}$

${\text{So there you have it the equation of a Critically Damped spring mass system.}}\,$

Apply the Initial and Final Value Theorems to find the initial and final values

Initial Value Theorem

\lim _{s\rightarrow \infty }sF(s)=f(0)\,

Final Value Theorem

\lim _{s\rightarrow 0}sF(s)=f(\infty )\,

Applying this to our problem

${\text{The Initial Value Theorem}}\,$

$\lim _{s\rightarrow \infty }\mathbf {sX} (s)=-{\frac {4}{(s+2)^{2}}}\,$

$\lim _{s\rightarrow \infty }\mathbf {s} {X}(s)=-{\frac {4}{(\infty +2)^{2}}}=0\,$

${\text{So as you can see the value for the initial position will be 0. Because the infinity in the denominator always makes the function tend toward zero.}}\,$