The Fourier Transforms: Difference between revisions

Revision as of 10:04, 12 October 2007

The Fourier transform was named after Joseph Fourier, a French mathematician. A Fourier Transform takes a function to its frequency components.

    ${\mathcal {F}}[a*x(t)+b*y(t)]=a*X(f)+b*Y(f)$

    ${\mathcal {F}}[x(t-a)]=X(t)e^{j2\pi fa}$

    ${\mathcal {F}}[x(a*t)]={\frac {1}{a}}X({\frac {f}{a}})$

   - if x(t) is real, then  $X(-f)=F(t)^{*}$

   - if x(t) is imaginary, then  $X(-f)=-X(f)^{*}$

   - if x(t) is even, then  $X(-f)=X(f)\$$

   - if x(t) is odd, then  $X(-f)=-X(f)\$.$

@@ Line 20: / Line 20: @@
 === Symmetries ====
 '''
-    * if x(t) is real, then <math> X(-f) = F(t)^*</math>
+    - if x(t) is real, then <math> X(-f) = F(t)^*</math>
-    * if x(t) is imaginary, then <math>X(-f) = -X(f)^*</math>
+    - if x(t) is imaginary, then <math>X(-f) = -X(f)^*</math>
-    * if x(t) is even, then <math>X(-f) = X(f)$</math>
+    - if x(t) is even, then <math>X(-f) = X(f)$</math>
-    * if x(t) is odd, then <math> X(-f) = -X(f)$.</math>'''
+    - if x(t) is odd, then <math> X(-f) = -X(f)$.</math>'''