(→Periodic Functions in Continuous Time) |
|||
Line 11: | Line 11: | ||
== Non-Periodic Functions in Continuous Time == | == Non-Periodic Functions in Continuous Time == | ||
− | * Functions are classified as non-periodic if there exists no <math>T\!</math> such that <math>y(x+T)=y(x)\!</math>. | + | * Functions are classified as non-periodic if there exists no <math>T>0\!</math> such that <math>y(x+T)=y(x)\!</math>. |
<br> | <br> | ||
The following is an example of a non-periodic function: | The following is an example of a non-periodic function: |
Revision as of 13:41, 4 September 2008
Periodic Functions in Continuous Time
- Functions are classified as periodic if there exists $ T>0\! $ such that $ y(x+T)=y(x)\! $.
The following is an example of a periodic function:
This function is periodic because $ y(x)=y(x+T)\! $ for $ T=0, 2, 4, 6\! $ etc.
Non-Periodic Functions in Continuous Time
- Functions are classified as non-periodic if there exists no $ T>0\! $ such that $ y(x+T)=y(x)\! $.
The following is an example of a non-periodic function:
This function is not periodic because there exists no T where $ y(x)=y(x+T)\! $.