Signals Systems - Reference Tables 1 Table of Fourier Transform Pairs Function, f(t) Fourier Transform, F(w) Definition of Inverse Fourier Transform ò ¥ ¥-
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[PDF] Table of Fourier Transform Pairs
Signals Systems - Reference Tables 1 Table of Fourier Transform Pairs Function, f(t) Fourier Transform, F(w) Definition of Inverse Fourier Transform Р ¥ ¥-
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Signals Systems - Reference Tables 1 Table of Fourier Transform Pairs Function, f(t) Fourier Transform, F(w) Definition of Inverse Fourier Transform ò ¥ ¥-
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Table of Fourier Transform Pairs of Energy Signals Function name Time Domain x(t) Frequency Domain X(ω) FT ( ) x t ( ) ( ) ( ) { } e j t X x t dt x t ω ω ∞ −
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Fourier Transform Tables
Table A 4 collects several discrete time infinite duration transforms Remember that for these results a difference or sum in the frequency domain is interpreted
A Tables of Fourier Series and Transform Properties
Soliman, S S and Srinath, M D Continuous and Discrete Signals and Systems, New York, Prentice-Hall, 1990 22 Tetley, L
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Signals & Systems - Reference Tables
1Table of Fourier Transform Pairs
Function, f(t)Fourier Transform, F(")
ÂJZ""
deFtf tj )(21)(Definition of Fourier Transform
ÂJJ
ZdtetfF
tj"")()( 0 ttfJ 0 tj eF J tj et f0 0 ""JF )(tf~ )(1 ~F)(tF)(2"Jf nn dttfd)( )()(""Fj n )()(tfjt n J nn dFd ÂJ tdf'')( 1tj e 0 )(2 0 (t)sgn "j 2Signals & Systems - Reference Tables
2 tj 1 )sgn(" )(tu 1)( HJÂZntjn
n eF 0JÂZ
J nn nF)(2 0 trect )2(" Sa )2(2BtSaB )(Brect" )(ttri )2( 2 "Sa )2()2cos(trecttA
22)2()cos(" J A )cos( 0 t"xz)()( 00 )sin( 0 t" xz)()( 00 j )cos()( 0 ttu" xz 22
000 )()(2 JHHHJ j )sin()( 0 ttu" xz 22
02 00 )()(2 JHHJJ j )cos()( 0 tetu t ~J 22
0 )()("~""~jjHHH
Signals & Systems - Reference Tables
3 )sin()( 0 tetu t ~J 2200 jHH t e ~J 22
2 H )2/( 22
t e J2/ 22
2 J e t etu ~J "~jH 1 t tetu ~J 2 )(1"~jH
õ Trigonometric Fourier Series
EF Z HHZ 1000)sin()cos()( nnn ntbntaatf"" where ZZZ T nT T n dtnttfTbdtnttfTadttfTa 000 000 )sin()(2 and, )cos()(2 , )(1
õ Complex Exponential Fourier Series
JÂJÂZ
ZZ T ntj n nntj n dtetfTFeFtf 0 0 )(1 where, )(Signals & Systems - Reference Tables
4Some Useful Mathematical Relationships
2)cos(
jxjx eex J HZ jeex jxjx2)sin(
J JZ )sin()sin()cos()cos()cos(yxyxyxŠZÎ )sin()cos()cos()sin()sin(yxyxyxÎZÎ )(sin)(cos)2cos( 22xxxJZ )cos()sin(2)2sin(xxxZ )2cos(1)(cos2 2 xxHZ )2cos(1)(sin2 2 xxJZ
1)(sin)(cos
22ZHxx )cos()cos()cos()cos(2yxyxyxHHJZ )cos()cos()sin()sin(2yxyxyxHJJZ )sin()sin()cos()sin(2yxyxyxHHJZ
Signals & Systems - Reference Tables
5Useful Integrals
dxx)cos( )sin(x dxx)sin( )cos(xJ dxxx)cos( )sin()cos(xxxH dxxx)sin( )cos()sin(xxxJ dxxx)cos( 2 )sin()2()cos(2 2 xxxxJH dxxx)sin( 2 )cos()2()sin(2 2 xxxxJJ dxe x~ ae x~ dxxe x~ėĘĖćĈĆJ2
1 a axe x~ dxex x~2 JJ 32222
aax axe x~ Hxdx~ x~Hln1 H 222
xdx~ )(tan1 1 x J