Exercise: Sawtooth Redone With Exponential Basis Functions

Author

John Hawkins

Find the Fourier Tranform with exponential basis functions of the sawtooth wave given by the equation

x (t) = t - ⌊ t ⌋

Note that this is the same function solved in Exercise: Sawtooth Wave Fourier Transform, but solved differently to compare the two methods.

The goal of this method is to find the coefficients $a_{n}$ such that

x (t) = \sum_{- \infty}^{\infty} a_{n} e^{j 2 π n t / T}

In class we showed not only that this was possible, but also that

a_{n} = \frac{1}{T} \int_{c}^{c + T} x (t) e^{- j 2 π n t / T} d t

Noting again that our period for this function is $T = 1$ , we proceed:

$a_{n} = \frac{1}{1} \int_{0}^{1} t e^{- j 2 π n t / 1} d t$

Again, the case when $n = 0$ needs to be considered separately. In this case,

a_{0} = \int_{0}^{1} t d t = \frac{1}{2}

For $n \neq 0$ , the above integral is solved easiest using integration by parts. So letting

$u = t \Rightarrow d u = d t$

$d v = e^{- j 2 π n t} d t \Rightarrow v = \frac{1}{- j 2 π n} e^{- j 2 π n t}$

we have

$a_{n} = t (\frac{1}{- j 2 π n}) e^{- j 2 π n t} |_{0}^{1} - \int_{0}^{1} (\frac{1}{- j 2 π n}) e^{- j 2 π n t} d t$