Final answer:
The zeros of H(z) of a finite impulse response filter with a real and even unit-sample response h(n) occur in mirror-image pairs about the unit circle because the conjugate reciprocal of any zero z is also a zero when H(z) has real coefficients, which is the case due to h(n) being real and even.
Step-by-step explanation:
To show that zeros of the system function H(z) of a finite impulse response filter with real and even unit-sample response h(n) occur in mirror-image pairs about the unit circle, we begin with the fact that h(n) is real and even. This means that h(n) = h(-n) for all n and, hence, the z-transform H(z) is real-valued on the unit circle (i.e., for |z|=1).
Let's consider that H(z)=0 for z=ρeˆθ, where ρ and θ are real numbers. Due to h(n) being even, H(z) can be represented as a sum of cosines which implies that if z is a zero, then its complex conjugate z* is also zero, which in our case would be ρe-jθ since the complex conjugate mirrors the angle θ across the real axis.
The property that needs to be proved is that if H(z)=0 for z=ρejθ, then H(z)=0 for z=1/ρejθ. This comes from the conjugate reciprocal property of polynomials with real coefficients which states that if a complex number is a zero then its conjugate reciprocal (1/ρ)ejθ is also a zero. The filter coefficients being real ensures that the polynomial representing H(z) only has real coefficients, which lets us apply this property to conclude the desired result: zeros occur in pairs such that if z=ρejθ is a zero, so is z=(1/ρ)ejθ, which shows the mirror-image pairing about the unit circle.