RobertPaulson
New member
- Joined
- Jan 9, 2010
- Messages
- 32
Hiya, I have a question that says:
Use the connection to Fourier Series to show that
The integral from -infinity to infinity of |g(x)|^2 dx is equal to the integral from -infinity to infinity of |G(k)|^2 dk
Sorry about not being in notation, I couldn't figure it out
EDIT* sorry i forgot to say what i was asking, basically i really don't know where to begin or if the fact that capital g is relevant (later on in a different question it refers to G as being the fourier transform of g but i haven't learnt that yet).
Use the connection to Fourier Series to show that
The integral from -infinity to infinity of |g(x)|^2 dx is equal to the integral from -infinity to infinity of |G(k)|^2 dk
Sorry about not being in notation, I couldn't figure it out
EDIT* sorry i forgot to say what i was asking, basically i really don't know where to begin or if the fact that capital g is relevant (later on in a different question it refers to G as being the fourier transform of g but i haven't learnt that yet).