Given `f(x)`

and its FFT `F(u)`

, I need to prove that `df/dx = F(u)*2iu(pi)/n`

.

`df/dx = f'(x)`

and `n`

is the number of pixels of the one dimensional image `f`

.

I tried to use the convolution theorem using `conv(f,[1 -1))`

which is the same as `df/dx`

and in the frequency domain it's `F(u) .* FFT([1 -1])`

however there sizes don't match.