fourier transform of exp( t^2)

e−t(1+iω)dt = 2 1 + ω2 2) (i) Designate J1f(t)l = f(ω) with a a real constant of either 3) To find the Fourier transform of the non-normalized Gaussian f(t) = e− t2

1 mar 2010 · 2 Example 1 Find the Fourier transform of f(t) = exp(−t) and hence using inversion, deduce that ∫ ∞ 0 dx 1+x2 = π 2 and ∫ ∞ 0 x sin(xt)

−ax 2 Introduction Let a > 0 be constant We define a function fa(x) by fa(x)=e− ax2 and denote by ˆ fa(w) the Fourier transform of fa(x) We wish to show that

Definition of Fourier Transform Р ¥ ¥- - = dt etf F tjw w )( )( ) ( 0 ttf- 0 )( tj e F w t df tt )( )()0( )( wd p w w F j F + )(t d 1 tj e 0 w ) (2 0 wwpd - (t) sgn wj 2  

2 ω sin(ω/2) It is common to define the sinc function as follows: sinc(x) = sin(πx) πx Thus the following Fourier transform pair has been established: e−btu(t) F

Fourier transform of rectangular pulse g(t) = A rect( t T ) G(f) = ∫ 1 1g(t) exp(- j2πft) dt = A∫ T/2 T/2 Aexp(-j2πft) dt = -A 1 j2πf exp(-j2πft)\\\\ t=T/2 t=T/2 = - A

(Fourier transform) The Fourier transform ofa function f(x) is F( f)( ξ) = 1 2 π √ ∫− ∞ ∞ e− iξx f(x) dx (1) The inverse transform is F− 1 (u)(x) = 1 2 π √ ∫ − ∞ To obtain the formula in variables x, t we need to compute F− 1 (cos(cξt )) 

Fourier Transform of Gaussian Let f(t) be a Gaussian: f(t) = e −π t 2 By the definition of Fourier transform we see that: F(s) = / ∞ −∞ e −πt 2 e −j2πst dt