6.5 Analog Filtering 395Thus, the desired filter with a dc gain of 10 is obtained by multiplyingH(S)by 10. Furthermore,
if we letS=s/100 be the normalized Laplace variable whenS=j′hp=j1, we get thats=jhp=
j100, orhp=100, the desired half-power frequency. Thus, the denormalized filter in frequency
H(s)is obtained by replacingS=s/100. The denormalized filter in magnitude and frequency
is thenH(s)=10
(s/ 100 )^2 +√
2 (s/ 100 )+ 1=
105
s^2 + 100√
2 s+ (^104) n
Design
For the Butterworth low-pass filter, the design consists in finding the parametersN, the minimum
order, andhp, the half-power frequency, of the filter from the constrains in the passband and in the
stopband.
The loss function for the low-pass Butterworth is
α()=−10 log 10 |HN(/hp)|^2 =10 log 10 ( 1 +
(
/hp) 2 N
)
The loss specifications are
0 ≤α()≤αmax 0 ≤≤p
αmin≤α() <∞ ≥sAt=p, we have that
10 log 10 ( 1 +(
p/hp) 2 N
)≤αmaxso that
(
p
hp
) 2 N
≤ 10 0.1αmax− 1 (6.40)and similarly for=s, we have that
10 0.1αmin− 1 ≤(
s
hp) 2 N
(6.41)
We then have that from Equation (6.40) and (6.41), the half-power frequency is in the range
p
( 10 0.1αmax− 1 )^1 /^2 N≤hp≤s
( 10 0.1αmin− 1 )^1 /^2 N(6.42)
and from the log of the two extremes of Equation (6.42), we have that
N≥
log 10 [( 10 0.1αmin− 1 )/( 10 0.1αmax− 1 )]
2 log 10 (s/p)