Homework Four

Nick Christman

1. Find $ℱ [g (t) e^{j 2 π f_{0} t}]$

This is a fairly straightforward property and is known as complex modulation

$ℱ [g (t) e^{j 2 π f_{0} t}] = \int_{- \infty}^{\infty} [g (t) e^{j 2 π f_{0} t}] e^{- j 2 π f t} d t$

Combining terms, we get:

$\int_{- \infty}^{\infty} [g (t) e^{j 2 π f_{0} t}] e^{- j 2 π f t} d t = \int_{- \infty}^{\infty} g (t) e^{- j 2 π (f - f_{0}) t} d t$

Now let's make the following substitution $θ = f - f_{0}$

This now gives us a surprisingly familiar function:

$\int_{- \infty}^{\infty} g (t) e^{- j 2 π (f - f_{0}) t} d t = \int_{- \infty}^{\infty} g (t) e^{- j 2 π θ t} d t$

This looks just like $G (θ)$ !

We can now conclude that:

$ℱ [g (t) e^{j 2 π f_{0} t}] = G (θ) = G (f - f_{0})$

Looks good - Kevin

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