- Thread starter
- #1

- Thread starter Uniman
- Start date

- Thread starter
- #1

- Feb 13, 2012

- 1,704

It is necessary to remember that in a point $t_{0}$ where f(t) isn't continous, the Fourier Series converges to...

$\displaystyle S_{0} = \frac{1}{2}\ \{\lim_{t \rightarrow t_{0} +} f(t) + \lim_{t \rightarrow t_{0} -} f(t) \}$

... under the assumption that both limits exist...

Kind regards

$\chi$ $\sigma$