Fall 2009/JonathanS

Problem

A simple pendulum with a length L = 0.5m is pulled back and released from an initial angle $θ_{0} = 1 2^{o}$ . Find it's location at t = 3s.

Solution

Assuming no damping and a small angle( $θ < 1 5^{o}$ ), the equation for the motion of a simple pendulum can be written as

\frac{d^{2} θ}{d t^{2}} + \frac{g}{ℓ} θ = 0 .

Substituting values we get

\frac{d^{2} θ}{d t^{2}} + \frac{9.81}{0.5} θ = 0 .

$\Rightarrow \frac{d^{2} θ}{d t^{2}} + 19.62 θ = 0 .$

Remember the identities

ℒ {f (t)} = F (s) = \int_{0}^{\infty} e^{- s t} f (t) d t .

ℒ {f^{'^{'}} (t)} = s^{2} F (s) - s f (0) - f^{'} (0)

Now we can take the Laplace Transform to change the second order differential equation, from the t domain, into a simple linear equation, from the s domain, that's much easier to work with

ℒ {\frac{d^{2} θ}{d t^{2}} + 19.62 θ} = s^{2} F (s) - s f (0) - f^{'} (0) + 19.62 θ = 0

$\Rightarrow$ $s^{2} θ - s θ (0) - θ^{'} (0) + 19.62 θ = 0$

Since we know that $θ (0) = 1 2^{o}$ and the initial velocity $θ^{'} (0) = 0$ we get

s^{2} θ - 12 s + 19.62 θ = 0

$\Rightarrow$ $θ (s^{2} + 19.62) = 12 s$

$\Rightarrow$ $θ = \frac{12 s}{s^{2} + 19.62}$

$\Rightarrow$ $θ = \frac{12 s}{s^{2} + (4.429)^{2}}$

Now we can take the inverse Laplace Transform to convert our equation back into the time domain using the identity

ℒ^{- 1} {\frac{s}{s^{2} + ω^{2}}} = c o s (ω t)

We get

ℒ^{- 1} {\frac{12 s}{s^{2} + (4.429)^{2}}} = 12 c o s (4.429 t)

This will give us the angle (in degrees) of the pendulum at any given time t.

Fall 2009/JonathanS

Problem

Solution

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