Question: Consider a complex sequence h[n] = h r [n] + jh i [n], where h r [n] and h i [n] are both real sequences,
Consider a complex sequence h[n] = hr[n] + jhi[n], where hr[n] and hi[n] are both real sequences, and let H(ejω) = HR(ejω) + j HI(ejω) denote the Fourier transform of h[n], where HR(ejω) and HI(ejω) are the real and imaginery parts, respoectively, of H(ejω).
Let HER(ejω) and HOR(ejω) denote the even and odd parts, respectivelly, of HR(ejω), and let HEI(ejω), and HOI(ejω) denote the even and odd parts, respectively, of HI(ejω). Furthermore, let HA(ejω) and HB(ejω) denote the real and imaginary parts of the Fourier transform of hr[n], and let HC(ejω) and HD(ejω) denote the real and imaginary parts of the Fourier transform of hi[n]. Express HA(ejω), HB(ejω), HC(ejω), and HD(ejω) in terms of HER(ejω), HOR(ejω), HEI(ejω), and HOI(ejω).
Step by Step Solution
3.50 Rating (160 Votes )
There are 3 Steps involved in it
Get step-by-step solutions from verified subject matter experts
Document Format (1 attachment)
30-E-T-E-D-S-P (495).docx
120 KBs Word File
Study Help