Asked by Alan
find the rms value of the function
i=15(1-e^-1/2t) from t=0 to t=4
i=15(1-e^-1/2t) from t=0 to t=4
Answers
Answered by
Steve
If we let r = rms of f(t), then
4r^2 = Int(15 - 15e^-1/2t)[0,4]
= 15t + 30e^(-t/2)[0,4]
= [60 + 30/e^2] - [0 + 30]
= 60 + 30/e^2 - 30
= 30 + 30/e^2
=34.06
so, r = 2.92
see wikipedia on root mean square
4r^2 = Int(15 - 15e^-1/2t)[0,4]
= 15t + 30e^(-t/2)[0,4]
= [60 + 30/e^2] - [0 + 30]
= 60 + 30/e^2 - 30
= 30 + 30/e^2
=34.06
so, r = 2.92
see wikipedia on root mean square
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