Chapter 4 sampling of continous-time signals 4. 1 periodic sampling .2 discrete-time processing of continuous-time signals 4.3 continuous-time processing of discrete-time signal 4. 4 digital processing of analog signals 5 changing the sampling rate using discrete-time processing
Chapter 4 sampling of continous-time signals 4.5 changing the sampling rate using discrete-time processing 4.1 periodic sampling 4.2 discrete-time processing of continuous-time signals 4.3 continuous-time processing of discrete-time signal 4.4 digital processing of analog signals
4.1 periodic sampling 1. ideal sample x[s]=x(o1-=X(I T:sample period fs-1/T sample rate s=2兀/T: sample rate x(1) x2(D) x s( 2T-T0 2T t 2T-T0 T 2T rIn 101234n 2-101234
4.1 periodic sampling 1.ideal sample x[n] x (t)| x (nT) = c t=nT = c T:sample period fs=1/T:sample rate Ωs=2π/T:sample rate
CD x2() xn=xc(nT) Figure 4.1 ideal continous-time-to-discrete-time(C/D)converter
Figure 4.1 ideal continous-time-to-discrete-time(C/D)converter
time normalization t→t/T=n C/ converter s(t onversion from impulse train x() to discrete-time x团n]=x(n7 sequence Figure 4.2(a)mathematic model for ideal C/D
Figure 4.2(a) mathematic model for ideal C/D =− = − n (t nT) time normalization t→t/T=n
AcUs F ture 43 gt BN 2) S(n) frequency spectrum change of ideal sample -29 29 30.Ω Xu C2-C2N≥2N A)=7∑x(a No aliasing C2-2N< aliasing 米1 (3-9x dX(e0)=Xs(1g)l=0/7 aliasing frequency 丌 O=QT XC((O-k2)/7
Figure 4.3 s −N N frequency spectrum change of ideal sample s −N N aliasing frequency No aliasing aliasing =− = − k s c s X j k T X j ( ( )) 1 ( ) = T =− = = − = k c s T j X j k T T X e X j ( ( 2 )/ ) 1 ( ) ( ) | / / 2 s 2