Chapter 3 Transform-Domain Representation of Discrete-Time Signals
Chapter 3 Transform-Domain Representation of Discrete-Time Signals
83.1 Discrete-Time Fourier Transform Definition The discrete-time fourier transform TFT)X(eJo ) of a sequence xn is given by X(e O )=∑xnle on 1=-00 n general, X(ejo )is a complex function of the real variable o and can be written as X(ejo)=xre(eJo)+j Xim(ejo)
§3.1 Discrete-Time Fourier Transform • Definition - The discrete-time Fourier transform (DTFT) X(ej) of a sequence x[n] is given by =− − = n j j n X e x n e ( ) [ ] X(ej) = Xre(ej) + j Xim(ej) In general, X(ej) is a complex function of the real variable and can be written as
83.1 Discrete-Time Fourier Transform Xr(eo)and xim(eo)are, respectively, the real and imaginary parts of x(eJo), and are real functions of o 。x(e°) can alternately be expressed as X(ejo)= X(ejo) eje(@) where 6(0)=arg{X(e)}
§3.1 Discrete-Time Fourier Transform • Xre(ej) and Xim(ej) are, respectively, the real and imaginary parts of X(ej) , and are real functions of • X(ej) can alternately be expressed as X(ej) = | X(ej) |ej() where () = arg{X(ej) }
83.1 Discrete-Time Fourier Transform X(eo) is called the magnitude function e(o)is called the phase function Both quantities are again real functions In many applications, the dtft is called the fourier spectrum Likewise, X(ejo)l and e(@) are called the magnitude and phase spectra
§3.1 Discrete-Time Fourier Transform • | X(ej) | is called the magnitude function • () is called the phase function • Both quantities are again real functions of • In many applications, the DTFT is called the Fourier spectrum • Likewise, | X(ej) | and () are called the magnitude and phase spectra
83.1 Discrete-Time Fourier Transform For a real sequence xn, X(ejo) and Xre(ejo) are even functions of o, whereas, H(o)and Xim(ejo)are odd functions of a Note: X(ejo)= X(ejo) ejb(o+Tk) I X(ejo)jeje(o) for any integer k uniquely specified for any DTA o The phase function A(@)cannot be
§3.1 Discrete-Time Fourier Transform • For a real sequence x[n], | X(ej) | and Xre(ej) are even functions of , whereas, () and Xim(ej) are odd functions of • Note: X(ej) = | X(ej) |ej(+2k) = | X(ej) |ej() for any integer k • The phase function () cannot be uniquely specified for any DTFT