a 1. (10%) The equation for a stochastic process x(t) is x(t) = x1(t) + x2(t) + x3(t) where xi(t) = 2 xz(t) = 4sin(2113t

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A 1 10 The Equation For A Stochastic Process X T Is X T X1 T X2 T X3 T Where Xi T 2 Xz T 4sin 2113t 1 (64.8 KiB) Viewed 19 times

a 1. (10%) The equation for a stochastic process x(t) is x(t) = x1(t) + x2(t) + x3(t) where xi(t) = 2 xz(t) = 4sin(2113t+1) Xz(t) = 5sin(2t6t - 1) Which of the single sided power spectral densities shown below most likely corresponds to x(t)? Hint: the RMS value of a sinewave is times the amplitude of the sinewave. V2 Gx(f) (a) 48(f) 88(f -3) 12.58(f - 6 Gx(f) (b) 258(t) 28(f -3) 88(f - 6 1 0 6 f hz 0 6 f IZ Gx(f) (c) Gx(f) (d) 168(f) 28(f - 6T 12.58(f - 12 ) 168(1), 28(f -3) 12.58(f - 6) 0 6 TE 1217 f hz 0 3 G f hz Gx(f) (e) Gx(1) (f) 48 (f) 88f-6T) 12.58(f - 12T 258(1) 28(1 - 6T) 88(f - 12 0 6 12 f hz 0 6. 12 f hz