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- Compute the power and energy of the signal We will find the average power in one cycle of the cosine waveform.1,007 B (151 words) - 12:45, 24 February 2015
- ==Power==1 KB (185 words) - 09:12, 2 September 2008
- We will compute the Power and Energy of a 440HZ sin wave, also known as an "A". == Average Power ==917 B (143 words) - 08:29, 4 September 2008
- == Average Power ==1 KB (193 words) - 12:29, 2 September 2008
- ==Power== According to formula of Power of a singal,we can get:945 B (160 words) - 15:01, 3 September 2008
- == Signal Power == <math>\, Power = \frac{1}{2\pi - 0}\int_0^{2\pi}{|cos(x)|^2dx}</math>650 B (86 words) - 05:49, 3 September 2008
- == Average Power ==644 B (94 words) - 05:39, 3 September 2008
- The function that we are using in this example to compute the signal power and energy is: == Power Calculation ==1 KB (170 words) - 17:37, 3 September 2008
- Given the Signal <math>x(t)=3sin(2*pi*3t)</math>, Find the energy and power of the signal from 0 to 5 seconds. == Power ==1 KB (206 words) - 07:36, 4 September 2008
- This page calculates the energy and power of the <math>2\sin(t)\cos(t)</math> signal. == Power ==1 KB (240 words) - 07:03, 4 September 2008
- This page calculates the Energy and Power of the signal <math>2\sin(t)\cos(t)</math> ==Power==1 KB (221 words) - 07:17, 4 September 2008
- == Energy and Power == === Power ===897 B (142 words) - 09:00, 4 September 2008
- == Power ==888 B (154 words) - 09:48, 4 September 2008
- == Power ==572 B (80 words) - 12:47, 4 September 2008
- == Average Signal Power== The average signal power over an interval <math>[t_1,t_2]\!</math> is defined as <math>P_{avg}=\frac1 KB (172 words) - 12:29, 4 September 2008
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76 B (11 words) - 12:40, 4 September 2008
- == Signal Energy and Power Calculations == The average power of a signal between specific time limits is defined as:655 B (97 words) - 14:50, 4 September 2008
- == Power == Power of the equation <math>e^{-2t}u(t)</math> is 0 because the energy of the sig329 B (60 words) - 13:39, 4 September 2008
- == Power ==668 B (104 words) - 14:05, 4 September 2008
- == Power of a Signal == :<math>Average Power = \frac{1}{t2 - t1}\int_{t1}^{t2}x(t)^2 </math>536 B (79 words) - 14:09, 4 September 2008
- ==Signal Energy and Power== Define a signal (either CT or DT) and compute its energy and its power. Post your answer on Rhea. Give your page a descriptive title.2 KB (248 words) - 12:04, 5 September 2008
- == Power ==775 B (125 words) - 15:11, 4 September 2008
- ==Average Power Calculation for function <math>y = \sqrt(x)</math> with timespan from 0 to575 B (83 words) - 15:22, 4 September 2008
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4 KB (734 words) - 14:54, 25 February 2015
- ==Power== ...ulate the average power of the same function from 0 to 8<math>\pi</math>. Power is very easy to calculate once you have the Energy.819 B (140 words) - 16:25, 4 September 2008
- '''''I chose to compute the energy and power for the signal f(t) = 3x.''''' ==Power==574 B (97 words) - 04:11, 5 September 2008
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647 B (89 words) - 20:00, 4 September 2008
- == Signal power == The power can be found using this function:726 B (122 words) - 19:45, 4 September 2008
- Computation of Signal Energy and power. <math>\,\! x(t)=2t^2+1</math>, find the Energy and Power from <math>\,\!t_1=1</math> to <math>\,\!t_2=4</math>778 B (99 words) - 12:21, 5 September 2008
- == Average Power ==1 KB (189 words) - 20:40, 4 September 2008
- ==Power==1 KB (204 words) - 21:14, 4 September 2008
- Average power in time interval from [<math>t_{1},t_{2} </math>]:788 B (127 words) - 11:34, 5 September 2008
- Compute the energy and the power of the function A time shift should not effect the energy or power of periodic function over one period (0 to 2<math>\pi</math> in this case).1 KB (169 words) - 17:20, 5 November 2010
- ==Power of a CT signal== ==Power of a DT signal==324 B (62 words) - 06:39, 5 September 2008
- == Power == The power of this signal is 0 because the energy of the signal is not <math>\infty</m267 B (48 words) - 06:53, 5 September 2008
- == Signal Power == Average signal power between <math>[t_1,t_2]\!</math> is <math>P_{avg}=\frac{1}{t_2-t_1}\int_{t_700 B (110 words) - 07:53, 5 September 2008
- ==Power== Power of cos(2t)608 B (100 words) - 09:53, 5 September 2008
- =Signal Power= The average power over an interval of time <math>[t_1,t_2]\!</math> is <math>P_{avg}=\frac{1}722 B (108 words) - 09:47, 5 September 2008
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682 B (110 words) - 12:42, 5 September 2008
- == Average Power == <math>Avg. Power = {1\over(t2-t1)}\int_{t_1}^{t_2}\!|x(t)|^2 dt</math>747 B (114 words) - 13:19, 5 September 2008
- It is important to remember that the terms "power" and "energy" are related to physical energy. In many systmes we will be interested in examining power and energy in signals over an infinte time interval.508 B (89 words) - 13:16, 5 September 2008
- == Average Power in time interval [t1, t2] == The average power for a signal is given by:1,005 B (178 words) - 13:45, 5 September 2008
- == Power ==603 B (94 words) - 13:51, 5 September 2008
- ==Average Power of a Signal== Here we compute the average power of the same signal above over two cycles:841 B (130 words) - 14:58, 5 September 2008
- == Calculating the Power of a Function == After you have the energy of a function, calculating the power isn't very difficult. Use the following equation.803 B (134 words) - 15:07, 5 September 2008
- Power of 2cos(t)405 B (54 words) - 16:12, 5 September 2008
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740 B (105 words) - 17:58, 5 September 2008
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232 B (39 words) - 18:00, 5 September 2008
- on the other hand, power of a signal can be calculated by: Let's now calculate the energy and power of the following signal: <math>y(t) = x^{2}</math> for <math>t_1 = 0</math574 B (92 words) - 17:37, 5 September 2008
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103 B (18 words) - 14:29, 15 October 2008
Page text matches
- ##[[Signal Energy and Power_(ECE301Summer2008asan)|Signal Energy and Power]]7 KB (921 words) - 05:08, 21 October 2011
- Capital Letters whose denominator is the highest power of its kind can be found directly as follows:4 KB (616 words) - 16:26, 23 April 2013
- ...efan-Boltzmann law which gives the exact form of this dependency (a fourth-power law) was discovered fifty years later.3 KB (390 words) - 11:10, 11 December 2008
- **[[2012 Spring ECE 433 Saeedifard|ECE433: "Power Electronics", Prof. Saeedifard]]13 KB (1,570 words) - 12:53, 7 August 2018
- *[[Session 1_ECE301Fall2008mboutin|Session 1: 9/2/2008]]: Phasors, Energy, Power, and Geometric Series '''Updated'''5 KB (720 words) - 05:10, 16 September 2013
- Maximum Power Transfer Theorem ...ximum value at a load impedance which is dependent on the impedance of the power source.726 B (126 words) - 10:57, 25 January 2009
- <li><strong>Signal Power</strong>2 KB (406 words) - 10:08, 12 November 2010
- <li><strong>Signal Power</strong>3 KB (508 words) - 05:43, 16 September 2013
- ...scriptstyle p^n-1</math>, every element is a <math>\scriptstyle p</math>th power (that is, every element can be written in the form <math>\scriptstyle a^p</ ...element of <math>\scriptstyle G</math> is a <math>\scriptstyle p</math>th power of some <math>\scriptstyle a</math>.2 KB (358 words) - 10:04, 5 February 2009
- ...scriptstyle p^n-1</math>, every element is a <math>\scriptstyle p</math>th power (that is, every element can be written in the form <math>\scriptstyle a^p</ ...element of <math>\scriptstyle G</math> is a <math>\scriptstyle p</math>th power of some <math>\scriptstyle a</math>.1 KB (243 words) - 19:37, 4 February 2009
- ...Power of a Signal over an infinite interval_ECE301Fall2008mboutin]] {{:CT Power of a Signal_ECE301Fall2008mboutin}}8 KB (989 words) - 06:20, 5 February 2009
- *Display of RF signals normally invisible beneath higher power signals967 B (123 words) - 11:47, 5 February 2009
- ...are nine. It would seem that the number of such gaps is equal to the prime power of the previous unit group. Then, the order of the group <math>\scriptstyle ...le U(3^2)\ =\ \{1,2,4,5,7,8\}</math>, and noted that when you multiply the power of <math>\scriptstyle p</math> (in this case <math>\scriptstyle3^n</math>)9 KB (1,564 words) - 16:29, 22 October 2010
- ...it has been moved. Mimi, in a sense, is actually giving us quite a bit of power. Hhuang - I don't call everyone that doesn't do things the way I like "a do12 KB (2,099 words) - 06:41, 21 March 2009
- ...e <math>\scriptstyle\sqrt[4]{2}</math> implies the presence of its greater power <math>\scriptstyle\sqrt{2}</math>.5 KB (611 words) - 21:17, 21 April 2009
- ...are two different methods here.... should it be times 365 or raised to the power of 365. And how do you know??? THANKS ...sible due to axioms of probability. So I would recommend u raise it to the power.969 B (182 words) - 05:59, 17 September 2008
- ...uldn't use natural log as the antiderivative because the denominator has a power greater than one. To solve the last integral, substitute u for x+1 and the1 KB (224 words) - 07:12, 14 October 2008
- ...th #7 on page 569. How do you deal with the fact that sin is to the fourth power? I tried doing integration by parts and that doesn't seem to work. Then I t if you are dealing with sine to an odd power, and3 KB (587 words) - 04:11, 21 October 2008
- ...bstitute x^2+1 for u and say x^2 = u-1. then, distribute and just use the power rule. There is no need for trig substitution for this. - G Briz That works wonder if the first part of the integral is x to the third power, but in this case, you end up with an uneliminatable x in the derivative of858 B (146 words) - 10:37, 1 November 2008
- ...maginary power causes a real base to act like trig functions, an imaginary power should, possibly, cause an imaginary base to act like an exponential functi4 KB (634 words) - 04:44, 23 September 2011
- ..., but when you have a geometric sequence that doesn't start at n = 1, or a power that isn't (n-1), you can fake it by rewriting the sum as you desire and th704 B (136 words) - 13:34, 30 October 2008
- == Absolute/Conditional Convergence for Power Series == ...tribute, I would appreciate it. It looks like conditional convergence for power series roughly refers to those endpoints that the ratio test fails to deter1 KB (214 words) - 15:57, 8 November 2008
- ...I'm still lost. I need to know WHY you are choosing to raise 1000 to the power of <math>\frac{1}{6}</math>. How do you know to take 1000 to the power of <math>\frac{1}{6}</math> and not <math>\frac{1}{5}?</math>8 KB (1,270 words) - 17:23, 14 September 2008
- ...for some polynomial F. F can be any polynomial, even N to the 10 millionth power. NP is the set of problems you can solve in non-deterministic polynomial ti5 KB (886 words) - 05:38, 21 March 2013
- It is impossible to separate any power higher than the second into two like powers,717 B (130 words) - 23:00, 3 December 2008
- - A new power supply for my desktop301 B (58 words) - 20:40, 13 December 2008
- ==Energy and Power == * [[HW1.5 Adrian Delancy - Energy and Power Calculations for Signals_ECE301Fall2008mboutin]]24 KB (3,272 words) - 05:58, 1 September 2010
- Compute the power and energy of the signal We will find the average power in one cycle of the cosine waveform.1,007 B (151 words) - 12:45, 24 February 2015
- ==Power==1 KB (185 words) - 09:12, 2 September 2008
- We will compute the Power and Energy of a 440HZ sin wave, also known as an "A". == Average Power ==917 B (143 words) - 08:29, 4 September 2008
- == Power ==122 B (19 words) - 10:11, 2 September 2008
- == Average Power ==1 KB (193 words) - 12:29, 2 September 2008
- ==Power== According to formula of Power of a singal,we can get:945 B (160 words) - 15:01, 3 September 2008
- == Power ==475 B (84 words) - 18:38, 2 September 2008
- == Signal Power == <math>\, Power = \frac{1}{2\pi - 0}\int_0^{2\pi}{|cos(x)|^2dx}</math>650 B (86 words) - 05:49, 3 September 2008
- == Average Power ==644 B (94 words) - 05:39, 3 September 2008
- == Power ==952 B (149 words) - 17:51, 5 November 2008
- The function that we are using in this example to compute the signal power and energy is: == Power Calculation ==1 KB (170 words) - 17:37, 3 September 2008
- Given the Signal <math>x(t)=3sin(2*pi*3t)</math>, Find the energy and power of the signal from 0 to 5 seconds. == Power ==1 KB (206 words) - 07:36, 4 September 2008
- This page calculates the energy and power of the <math>2\sin(t)\cos(t)</math> signal. == Power ==1 KB (240 words) - 07:03, 4 September 2008
- This page calculates the Energy and Power of the signal <math>2\sin(t)\cos(t)</math> ==Power==1 KB (221 words) - 07:17, 4 September 2008
- Let us find the energy and average power of a signal <math>x(t) = 5e^{5t}</math> for the time interval [0,5] ==Average Power==739 B (117 words) - 09:12, 4 September 2008
- == Energy and Power == === Power ===897 B (142 words) - 09:00, 4 September 2008
- == Power ==888 B (154 words) - 09:47, 4 September 2008
- == Power ==888 B (154 words) - 09:48, 4 September 2008
- == Power ==572 B (80 words) - 12:47, 4 September 2008
- == Average Signal Power== The average signal power over an interval <math>[t_1,t_2]\!</math> is defined as <math>P_{avg}=\frac1 KB (172 words) - 12:29, 4 September 2008
- any power, exponential or logarithmic function, without a periodic portion, are non-p1 KB (210 words) - 06:25, 14 April 2010
- == Signal Energy and Power Calculations == The average power of a signal between specific time limits is defined as:655 B (97 words) - 14:50, 4 September 2008
- == Power Equation ==569 B (88 words) - 12:55, 4 September 2008
