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<math>P=\dfrac{1}{2}(\ln 30 - \ln 14)</math>
 
<math>P=\dfrac{1}{2}(\ln 30 - \ln 14)</math>
  
<math>P=\ln {{30/14}^{\dfrac{1}{2}}</math>
+
<math>P=\ln {{30/14}^{\dfrac{1}{2}}}</math>

Revision as of 13:40, 4 September 2008

Compute the Energy and Power of the signal $ x(t)=\dfrac{2t}{t^2+5} $ between 3 and 5 seconds.

Energy

$ E=\int_{t_1}^{t_2}x(t)dt $

$ E=\int_3^{5}{\dfrac{2t}{t^2+5}dt} $

$ U=t^2+5 $

$ dU=2tdt $

Limits:

$ U(3)=3^2+5=9+5=14 $

$ U(5)=5^2+5=25+5=30 $

$ E=\int_{14}^{30}\dfrac{du}{U} $

$ E=\ln U |_{U=14}^{U=30} $

$ E=\ln 30 - \ln 14 $

$ E=\ln {30/14} $

Power

$ P=\dfrac{1}{{t_2}-{t_1}}\int_{t_1}^{t_2}x(t)dt $


$ P=\dfrac{1}{5-3}\int_3^{5}{\dfrac{2t}{t^2+5}dt} $

$ U=t^2+5 $

$ dU=2tdt $

Limits:

$ U(3)=3^2+5=9+5=14 $

$ U(5)=5^2+5=25+5=30 $

$ P=\dfrac{1}{2}\int_{14}^{30}\dfrac{du}{U} $

$ P=\dfrac{1}{2}\ln U |_{U=14}^{U=30} $

$ P=\dfrac{1}{2}(\ln 30 - \ln 14) $

$ P=\ln {{30/14}^{\dfrac{1}{2}}} $

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Ryne Rayburn