Fourier Transform Properties

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Some properties to choose from if you are having difficulty....

Max Woesner

1. Find [cos(w0t)g(t)]
 Recall w0=2πf0, so [cos(w0t)g(t)]=[cos(2πf0t)g(t)]=cos(2πf0t)g(t)ej2πftdt
Also recall cos(θ)=12(ejθ+ejθ),so cos(2πf0t)g(t)ej2πftdt=12[ej2πf0t+ej2πf0t]g(t)ej2πftdt
Now 12[ej2πf0t+ej2πf0t]g(t)ej2πftdt=12ej2π(ff0)tg(t)dt+12ej2π(f+f0)tg(t)dt=12G(ff0)+12G(f+f0)
So [cos(w0t)g(t)]=12[G(ff0)+G(f+f0)]


reviewed by Joshua Sarris


2. Find [g(t)h*(t)dt]
 Recall g(t)=1[G(f)]=G(f)ej2πftdf
Similarly, h(t)=1[H(f)]=H(f)ej2πftdf
So [g(t)h*(t)dt]=G(f')ej2πf'tdf'(H(f')ej2πf'tdf')*dt
Now G(f')ej2πf'tdf'(H(f')ej2πf'tdf')*dt=G(f')H*(f')ej2π(f'f')tdtdf'df'

Note that ej2π(f'f')tdt=δ(f'f')

So [g(t)h*(t)dt]=G(f)H*(f)df

Someone please review this!

Nick Christman

Find [10tg(t)ej2πft0]

To begin, we know that

[10tg(t)ej2πft0]=10tg(t)ej2πft0ej2πftdt=10tg(t)ej2πf(t0t)dt

But recall that ej2πf(t0t)δ(t0t) or δ(tt0)


Because of this definition, our problem has now been simplified significantly:

[10tg(t)ej2πft0]=10tg(t)δ(tt0)dt=10t0g(t0)

Therefore,

[10tg(t)ej2πft0]=10t0g(t0)


Joshua Sarris

Find [sin(w0t)g(t)]


Recall w0=2πf0,

so expanding we have,

[sin(w0t)g(t)]=[sin(2πf0t)g(t)]=sin(2πf0t)g(t)ej2πftdt

Also recall sin(θ)=1j2(ejθejθ),

so we can convert to exponentials.

sin(2πf0t)g(t)ej2πftdt=1j2[ej2πf0tej2πf0t]g(t)ej2πftdt

Now integrating gives us,

1j2[ej2πf0tej2πf0t]g(t)ej2πftdt=1j2ej2π(ff0)tg(t)dt12ej2π(f+f0)tg(t)dt=1j2G(ff0)1j2G(f+f0)


So we now have the identity,

[sin(w0t)g(t)]=1j2[G(ff0)G(f+f0)]

or rather

[sin(w0t)g(t)]=12j[G(f+f0)+G(ff0)]

Reviewed by Max

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