Fall 2009/JonathanS: Difference between revisions

Problem

A simple pendulum with a length ${\displaystyle \ell =2}$ is pulled back and released from an initial angle ${\displaystyle {\theta }_0=12^o}$.

Solution

Assuming no damping and a small angle(${\displaystyle \theta <15^o}$), the equation for the motion of a simple pendulum can be written as:

${\displaystyle \frac{{\mathrm{d}}^2\theta }{\mathrm{d}{t}^2}+\frac{g}{\ell }\theta =0.}$

We can then use the Laplace Transform to convert from the time(t) domain into the s domain.

Given

${\displaystyle {ℒ}\{f(t)\}=F(s)}$

${\displaystyle \frac{{\mathrm{d}}^2\theta }{\mathrm{d}{t}^2}=f^{{\text{'}}^{\prime }}(t)}$

${\displaystyle {ℒ}\{f^{{\text{'}}^{\prime }}(t)\}=s^{2}F(s)-sf(0)-f^{\text{'}}(0)}$

We have

${\displaystyle {ℒ}\{\frac{{\mathrm{d}}^2\theta }{\mathrm{d}{t}^2}+\frac{g}{\ell }\theta \}=s^{2}F(s)-sf(0)-f^{\text{'}}(0)+\frac{g}{\ell }\theta }$