Practice Question on "Signals and Systems"
Topic: Signal Power
Contents
Question
Compute the power of the signal $ x(t)= 2j $
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Answer 1=
$ P_{\infty}=\lim_{T\rightarrow \infty} {1 \over {2T}} \int_{-T}^T | x(t) |^2 dt = \lim_{T\rightarrow \infty} {1 \over {2T}} \int_{-T}^T 4 dt = \lim_{T\rightarrow \infty} {1 \over {2T}} 4t \Big| ^T _{-T} = \lim_{T\rightarrow \infty} {1 \over {2T}} 8T = 4 $
- looks good!
Answer 2
$ P_{\infty}=\lim_{T\rightarrow \infty} {1 \over {2T}} \int_{-\infty}^\infty| x(t) |^2 dt = \lim_{T\rightarrow \infty} {1 \over {2T}} \int_{-\infty}^\infty 4 dt = \lim_{T\rightarrow \infty} {1 \over {2T}} \infty= \frac{\infty}{\infty}=1 $
- You made a limit manipulation error.
Answer 3=
$ P_{\infty}=\lim_{T\rightarrow \infty} {1 \over {2T}} \int_{-T}^T (2j)^2 dt = \lim_{T\rightarrow \infty} {1 \over {2T}} \int_{-T}^T -4 dt = \lim_{T\rightarrow \infty} {1 \over {2T}} -4t \Big| ^T _{-T} = \lim_{T\rightarrow \infty} {1 \over {2T}} -8T = -4 $
- Power cannot be negative, so your answer cannot be correct.
Answer 4=
$ |x|^2=4 \quad 4 \frac{\infty}{\infty}=4 $
- Sorry but I don't understand your explanation.