If a possible representation of a band pass signal is obtained by expressing xl (t) as $x_l (t)=a(t)e^{jθ(t})$ then what are the equations of a(t) and θ(t)?

Question

TuteeHUB · Accepted Answer

a(t) = $\sqrt{u_c^2 (t)-u_s^2 (t)}$ and θ(t)=$tan^{-1}\frac{u_s (t)}{u_c (t)}$

TuteeHUB · Answer

a(t) = $\sqrt{u_c^2 (t)+u_s^2 (t)}$ and θ(t)=$tan^{-1}\frac{u_s (t)}{u_c (t)}$

TuteeHUB · Answer

a(t) = $\sqrt{u_c^2 (t)-u_s^2 (t)}$ and θ(t)=$tan^{-1}\frac{u_s (t)}{u_c (t)}$

TuteeHUB · Answer

a(t) = $\sqrt{u_c^2 (t)+u_s^2 (t)}$ and θ(t)=$tan^{-1}\frac{u_c (t)}{u_s (t)}$

TuteeHUB · Answer

a(t) = $\sqrt{u_s^2 (t)-u_c^2 (t)}$ and θ(t)=$tan^{-1}⁡\frac{u_s (t)}{u_c (t)}$

1.	If a possible representation of a band pass signal is obtained by expressing xl (t) as \(x_l (t)=a(t)e^{jθ(t})\) then what are the equations of a(t) and θ(t)?
A.	a(t) = \(\sqrt{u_c^2 (t)+u_s^2 (t)}\) and θ(t)=\(tan^{-1}\frac{u_s (t)}{u_c (t)}\)
B.	a(t) = \(\sqrt{u_c^2 (t)-u_s^2 (t)}\) and θ(t)=\(tan^{-1}\frac{u_s (t)}{u_c (t)}\)
C.	a(t) = \(\sqrt{u_c^2 (t)+u_s^2 (t)}\) and θ(t)=\(tan^{-1}\frac{u_c (t)}{u_s (t)}\)
D.	a(t) = \(\sqrt{u_s^2 (t)-u_c^2 (t)}\) and θ(t)=\(tan^{-1}⁡\frac{u_s (t)}{u_c (t)}\)
Answer» B. a(t) = \(\sqrt{u_c^2 (t)-u_s^2 (t)}\) and θ(t)=\(tan^{-1}\frac{u_s (t)}{u_c (t)}\)

If a possible representation of a band pass signal is obtained by expressing xl (t) as \(x_l (t)=a(t)e^{jθ(t})\) then what are the equations of a(t) and θ(t)?

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