ABSTRACT
H(w) = L h(t) e-iwl for - 1r :::; u,• :::; 11 (A.5) 1=-oo
(A.7)
h(t)
(" H(w) cos wtdw ./o
(A.9)
Given a function h(t). such that. h(t) = () fort< 0 (A.l2)
=
A.l If h(t) is real, show that. the real and imaginary parts of its Fourier transform, as defined by Equation (A.l), arc even and odd functions . respectively.