signals and systems (power and energy signals)
Q) Prove that the power of an energy signal is zero over infinite time.
Also, prove that the energy of a power signal is infinite over infinite time.
signals and systems (power and energy signals) Q) Prove that the power of an energy signal...
3. (45 pts) On signal energy and power. From the following signals, identify energy signals and power signals. For energy signals, calculate their energy. For power signals, calculate their average signal power. (g) x(t)= rect(t)) (h) x(t) =Loo rect(A) (i) 2(t)=e(-1-j80%(t) (k) x(t) = e-M/2 (l) x[n] = e-jm/2
1.35 Determine if each of the following signals is a power signal, an energy signal, or neither (а) х1() — [1 —е 2] u(0) (b) x2(t) 2 sin(4t ) cos(4t) (с) хз(t) — 2 sin(3t) cos(4t) 1.39 Compute the average power of the following signals (a) x eat for real-valued a (3 j4)e7 (b) х2(г) _ * (с) с х3(t) — eјЗejSi
Classify the following signals whether are energy signals, power signals or neither by computing their energy and power: 2. a. (10 points) x1(t)=2cos(2n10t)+3cos(2n20t) 1 < t otherwise (10 points) the periodic signal x3 (t) as shown by the figure below: t + 2 3 b, (10 points) X2(t) = c. x3 (t) 2 -2-1 0 2 3 t(s)
2. Categorise each of the following signals as either an energy or power signal, and find the energy or power of the signal. (12 marks a) *(t) = 5 cos 2nft. - <t <co b) x[n] = 2e/3n c) *(t) = cos(t) + 5cos 2t ,- <t< W d) *(t) = {Acos 2nft - To/2st ST,/2, where To = 1/5 otherwise
Signals and systems Q1 A signal
signal & system cours Signals and Systeme Q2 b) Given two signals x1(n)=[-1 2 0 -2 l) and x3[n] = [5 -4 0 4 -51 (5 Marks) Prove that sum of two signals is an odd signal. Prove that the product of two signals is an even signal. 1) 1 Signals and Systems Q5 b) How can you derive the Discrete-Time Fourier transform from the z-transform? (5 marks)
2. Determine the suitable measures for the following signals (ie energy or power signal) 28) 2e-12 -1 0 g(r)
Find the energy of each of the following signals. If the energy is infinite, then also find the average power. a) X1(t) = 21(t + 100) b) x2) u(t) c) x3(t) = cos(2t) + 2 cos(4t) (Hint: Recall the trig identity: cos(a) cos(b) = 1+t [cos(a + b) + cos(a - b)).) 2 x4(t) = cos(2π) when cos(2πt)2 0; x4(t) = 0 when cos(2π) < 0. (That is: x,(t) is the response of a -wave rectifier to input signal cos(2Tt).)...
Classify each signal as a power signal, an energy signal, or neither. For a power signal, find the normalized power; for an energy signal, find the normalized energy (b) tu(t)
SIGNALS AND SYSTEMS: Part (b) and (c) 1.25 Full-wave rectified signal-Consider the full-wave rectified signal ,(t) = I sin(rt)! finite-power P.. Find it (b) It is always useful to get a quick estimate of the power of a periodic signal by finding a bound for the signal squared. Find a bound for ly(t)2 and show that P,1 (c) Use symbolic MATLAB to check if the full-wave rectified signal has finite power and if that value coincides with the Py you...