Now, 2 x (+) dt 2 50, d2x(+) dt 2 -1 d2x(1) dt 2 is +2 J2x(+) ct 2 + 1 +2 = -15(++ 2) + 25 (1-0) + 15 (t-1) = -√(x + 2) + 251€) + 5 (+-2) By using differentiation in time domain property, the fourier tram form is jw2 (jw) ² x 1w) = -1.e م لم + 2 + +2+ How did he get the inside the circle

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Now, 2 x (+) is dt 2 50, d2x(+) dt 2 d2x(1) dt 2 2 G +2 d2x(+) at 2 = -15(+ + 2) + 25 (1-0) + 15 (t-1) -S(+2) + 25H) + 5 (1-2) By using differentiation in time domain property, the fourier framform is (jw) ² x 1w) = -1.e + 1 jw2 +2 20 لم +2 + How did he get the value inside the circle ni