Chapter 7, Problem 1. In the circuit shown in Fig. 7.81 v(t ) = 56e −200t V, t > 0 i(t ) = 8e −200t mA, t>0 (a) Find the values of R and C. (b) Calculate the time constant τ . (c) Determine the time required for the voltage to decay half its initial value at t = 0. Figure 7.81 For Prob. 7.1 Chapter 7, Solution 1. τ=RC = 1/200 (a) For the resistor, V=iR= 56e−200 t = 8Re −200t x10 −3 C= ⎯⎯ → R= 56 = 7 kΩ 8 1 1 = = 0.7143 µ F 200R 200 X7 X103 (b) (c) τ =1/200= 5 ms If value of the voltage at = 0 is 56 . 1 x56 = 56e−200t 2 200to = ln2 ⎯⎯ → ⎯⎯ → to = e200 t = 2 1 ln2 = 3.466 ms 200 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 2. Find the time constant for the RC circuit in Fig. 7.82. Figure 7.82 For Prob. 7.2. Chapter 7, Solution 2. τ = R th C where R th is the Thevenin equivalent at the capacitor terminals. R th = 120 || 80 + 12 = 60 Ω τ = 60 × 0.5 × 10 -3 = 30 ms Chapter 7, Problem 3. Determine the time constant for the circuit in Fig. 7.83. Figure 7.83 For Prob. 7.3. Chapter 7, Solution 3. R = 10 +20//(20+30) =10 + 40x50/(40 + 50)=32.22 kΩ τ = RC = 32.22 X103 X100 X10 −12 = 3.222 µ S PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 4. The switch in Fig. 7.84 moves instantaneously from A to B at t = 0. Find v for t > 0. Figure 7.84 For Prob. 7.4. Chapter 7, Solution 4. For t<0, v(0-)=40 V. For t >0. we have a source-free RC circuit. τ = RC = 2 x103 x10 x10−6 = 0.02 v(t) = v(0)e− t / τ = 40e−50t V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 5. For the circuit shown in Fig. 7.85, find i(t), t > 0. Figure 7.85 For Prob. 7.5. Chapter 7, Solution 5. Let v be the voltage across the capacitor. For t <0, 4 v(0 − ) = (24) = 16 V 2+4 For t >0, we have a source-free RC circuit as shown below. i 5Ω + v – 4Ω 1/3 F 1 3 = 16e− t / 3 τ = RC = (4 + 5) = 3 s v(t) = v(0)e− t / τ dv 1 1 i(t) = −C = − (− )16e− t / 3 = 1.778e− t / 3 A dt 3 3 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 6. The switch in Fig. 7.86 has been closed for a long time, and it opens at t = 0. Find v(t) for t ≥ 0. Figure 7.86 For Prob. 7.6. Chapter 7, Solution 6. v o = v ( 0) = 2 (24) = 4 V 10 + 2 v( t ) = voe − t / τ , τ = RC = 40 x10−6 x 2 x103 = 2 25 v( t ) = 4e −12.5t V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 7. Assuming that the switch in Fig. 7.87 has been in position A for a long time and is moved to position B at t =0, find v 0 (t) for t ≥ 0. Figure 7.87 For Prob. 7.7. Chapter 7, Solution 7. When the switch is at position A, the circuit reaches steady state. By voltage division, 40 (12V ) = 8V vo(0) = 40 + 20 When the switch is at position B, the circuit reaches steady state. By voltage division, 30 (12V ) = 7.2V vo(∞) = 30 + 20 20 x30 RTh = 20k // 30k = = 12kΩ 50 τ = RThC = 12 x103 x2 x10 −3 = 24 s vo(t) = vo(∞) + [vo(0) − vo(∞)]e−t /τ = 7.2 + (8 − 7.2)e− t / 24 = 7.2 + 0.8e− t / 24 V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 8. For the circuit in Fig. 7.88, if v = 10e −4t V and i = 0.2e − 4t A, t > 0 (a) Find R and C. (b) Determine the time constant. (c) Calculate the initial energy in the capacitor. (d) -Obtain the time it takes to dissipate 50 percent of the initial energy. Figure 7.88 For Prob. 7.8. Chapter 7, Solution 8. (a) τ = RC = 1 4 dv dt -4t - 0.2 e = C (10)(-4) e-4t -i = C ⎯ ⎯→ C = 5 mF 1 = 50 Ω 4C 1 τ = RC = = 0.25 s 4 1 1 w C (0) = CV02 = (5 × 10 -3 )(100) = 250 mJ 2 2 1 1 1 w R = × CV02 = CV02 (1 − e -2t 0 τ ) 2 2 2 1 0.5 = 1 − e -8t 0 ⎯ ⎯→ e -8t 0 = 2 8t 0 or e =2 1 t 0 = ln (2) = 86.6 ms 8 R= (b) (c) (d) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 9. The switch in Fig. 7.89 opens at t = 0. Find v 0 for t > 0 Figure 7.89 For Prob. 7.9. Chapter 7, Solution 9. For t < 0, the switch is closed so that 4 (6) = 4 V vo(0) = 2+4 For t >0, we have a source-free RC circuit. τ = RC = 3 x10−3 x4 x103 = 12 s vo(t) = vo(0)e− t /τ = 4e− t /12 V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 10. For the circuit in Fig. 7.90, find v 0 (t) for t > 0. Determine the time necessary for the capacitor voltage to decay to one-third of its value at t = 0. Figure 7.90 For Prob. 7.10. Chapter 7, Solution 10. 3 (36V ) = 9 V 3+9 For t>0, we have a source-free RC circuit τ = RC = 3 x103 x20 x10−6 = 0.06 s For t<0, v(0 − ) = vo(t) = 9e–16.667t V Let the time be to. 3 = 9e–16.667to or e16.667to = 9/3 = 3 to = ln(3)/16.667 = 65.92 ms. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 11. For the circuit in Fig. 7.91, find i 0 for t > 0. Figure 7.91 For Prob. 7.11. Chapter 7, Solution 11. For t<0, we have the circuit shown below. 3Ω 24 V 4H 4Ω + 8Ω 4H io 4Ω 8A 3Ω 8Ω 3//4= 4x3/7=1.7143 1.7143 (8) = 1.4118 A io(0 − ) = 1.7143 + 8 For t >0, we have a source-free RL circuit. L 4 τ= = = 1/ 3 R 4+8 io(t) = io(0)e−t / τ = 1.4118e−3t A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 12. The switch in the circuit of Fig. 7.92 has been closed for a long time. At t = 0 the switch is opened. Calculate i(t) for t > 0. Figure 7.92 For Prob. 7.12. Chapter 7, Solution 12. When t < 0, the switch is closed and the inductor acts like a short circuit to dc. The 4 Ω resistor is short-circuited so that the resulting circuit is as shown in Fig. (a). 3Ω 12 V i(0-) + − 4Ω (a) (b) 12 =4A 3 Since the current through an inductor cannot change abruptly, i(0) = i(0 − ) = i(0 + ) = 4 A i (0 − ) = When t > 0, the voltage source is cut off and we have the RL circuit in Fig. (b). L 2 τ = = = 0.5 R 4 Hence, i( t ) = i(0) e - t τ = 4 e -2t A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 13. In the circuit of Fig. 7.93, 3 v(t) = 20e −10 t V, t>0 3 i(t) = 4e −10 t mA, t>0 (a) Find R, L, and τ . (b) Calculate the energy dissipated in the resistance for 0 < t < 0.5 ms. Figure 7.93 For Prob. 7.13. Chapter 7, Solution 13. (a) τ = 1 = 1ms 103 v = iR ⎯⎯ → 20e−1000t = Rx4e−1000 t x10 −3 From this, R = 20/4 kΩ= 5 kΩ 5 x1000 L ⎯⎯ → = 5H But τ = = 1 3 L= 10 R 1000 (b) The energy dissipated in the resistor is t t 0 0 w = ∫ pdt = ∫ 80 x10 −3 e−2 x10 dt = − 3 −3 3 80 x10 e−2 x10 t 3 2 x10 0.5 x10 −3 0 = 40(1− e−1)µ J = 25.28 µ J PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 14. Calculate the time constant of the circuit in Fig. 7.94. Figure 7.94 For Prob. 7.14. Chapter 7, Solution 14. RTh = (40 + 20)//(10 + 30) = 60 x40 = 24kΩ 100 5 x10 −3 τ = L/R = = 0.2083 µ s 24 x103 Chapter 7, Problem 15. Find the time constant for each of the circuits in Fig. 7.95. Figure 7.95 For Prob. 7.15. Chapter 7, Solution 15 (a) RTh = 12 + 10 // 40 = 20Ω, (b) RTh = 40 // 160 + 8 = 40Ω, L = 5 / 20 = 0.25s RTh L τ= = (20 x10 −3 ) / 40 = 0.5 ms RTh τ= PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 16. Determine the time constant for each of the circuits in Fig. 7.96. Figure 7.96 For Prob. 7.16. Chapter 7, Solution 16. τ= (a) L eq R eq L eq = L and R eq = R 2 + τ= (b) R 1R 3 R 2 (R 1 + R 3 ) + R 1 R 3 = R1 + R 3 R1 + R 3 L( R 1 + R 3 ) R 2 (R 1 + R 3 ) + R 1 R 3 R 3 (R 1 + R 2 ) + R 1 R 2 L1 L 2 R 1R 2 = and R eq = R 3 + L1 + L 2 R1 + R 2 R1 + R 2 L1L 2 (R 1 + R 2 ) τ= (L 1 + L 2 ) ( R 3 ( R 1 + R 2 ) + R 1 R 2 ) where L eq = PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 17. Consider the circuit of Fig. 7.97. Find v 0 (t) if i(0) = 2 A and v(t) = 0. Figure 7.97 For Prob. 7.17. Chapter 7, Solution 17. i( t ) = i(0) e - t τ , τ= 14 1 L = = R eq 4 16 i( t ) = 2 e -16t v o ( t ) = 3i + L di = 6 e-16t + (1 4)(-16) 2 e-16t dt v o ( t ) = - 2 e -16t u ( t )V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 18. For the circuit in Fig. 7.98, determine v 0 (t) when i(0) = 1 A and v(t) = 0. Figure 7.98 For Prob. 7.18. Chapter 7, Solution 18. If v( t ) = 0 , the circuit can be redrawn as shown below. 6 L 2 5 1 , τ= = × = 5 R 5 6 3 -t τ -3t i( t ) = i(0) e = e di - 2 (-3) e -3t = 1.2 e -3t V v o ( t ) = -L = dt 5 R eq = 2 || 3 = PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 19. In the circuit of Fig. 7.99, find i(t) for t > 0 if i(0) = 2 A. Figure 7.99 For Prob. 7.19. Chapter 7, Solution 19. i 1V − + 10 Ω i1 i1 i2 i/2 i2 40 Ω To find R th we replace the inductor by a 1-V voltage source as shown above. 10 i1 − 1 + 40 i 2 = 0 But i = i2 + i 2 and i = i1 i.e. i1 = 2 i 2 = i 1 ⎯→ i = 10 i − 1 + 20 i = 0 ⎯ 30 1 R th = = 30 Ω i L 6 τ= = = 0.2 s R th 30 i( t ) = 2 e -5t u ( t ) A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 20. For the circuit in Fig. 7.100, v = 120e −50t V and i = 30e −50t A, t > 0 (a) Find L and R. (b) Determine the time constant. (c) Calculate the initial energy in the inductor. (d) What fraction of the initial energy is dissipated in 10 ms? Figure 7.100 For Prob. 7.20. Chapter 7, Solution 20. (a) L 1 = R 50 di -v= L dt τ= ⎯ ⎯→ R = 50L - 120 e - 50t = L(30)(-50) e - 50t ⎯ ⎯→ L = 80 mH R = 50L = 4 Ω L 1 τ= = = 20 ms (b) R 50 1 1 w = L i 2 (0) = (0.08)(30) 2 = 36J (c) 2 2 The value of the energy remaining at 10 ms is given by: w10 = 0.04(30e–0.5)2 = 0.04(18.196)2 = 13.24J. So, the fraction of the energy dissipated in the first 10 ms is given by: (36–13.24)/36 = 0.6322 or 63.2%. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 21. In the circuit of Fig. 7.101, find the value of R stored in the inductor will be 1 J. for which the steady-state energy Figure 7.101 For Prob. 7.21. Chapter 7, Solution 21. The circuit can be replaced by its Thevenin equivalent shown below. Rth Vth + − 2H 80 (60) = 40 V 80 + 40 80 R th = 40 || 80 + R = +R 3 Vth 40 I = i(0) = i(∞) = = R th 80 3 + R Vth = 2 ⎞ ⎟ =1 3⎠ 40 40 =1 ⎯ ⎯→ R = R + 80 3 3 R = 13.333 Ω 1 1 ⎛ 40 w = L I 2 = (2)⎜ 2 2 ⎝ R + 80 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 22. Find i(t) and v(t) for t > 0 in the circuit of Fig. 7.102 if i(0) = 10 A. Figure 7.102 For Prob. 7.22. Chapter 7, Solution 22. i( t ) = i(0) e - t τ , τ= L R eq R eq = 5 || 20 + 1 = 5 Ω , τ= 2 5 i( t ) = 10 e -2.5t A Using current division, the current through the 20 ohm resistor is 5 -i io = (-i) = = -2 e -2.5t 5 + 20 5 v( t ) = 20 i o = - 40 e -2.5t V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 23. Consider the circuit in Fig. 7.103. Given that v 0 (0) = 2 V, find v 0 and v x for t > 0. Figure 7.103 For Prob. 7.23. Chapter 7, Solution 23. Since the 2 Ω resistor, 1/3 H inductor, and the (3+1) Ω resistor are in parallel, they always have the same voltage. 2 2 + = 1.5 ⎯ ⎯→ i(0) = -1.5 2 3 +1 The Thevenin resistance R th at the inductor’s terminals is 13 1 4 L R th = 2 || (3 + 1) = , τ= = = 3 R th 4 3 4 -i = i( t ) = i(0) e - t τ = -1.5 e -4t , t > 0 di v L = v o = L = -1.5(-4)(1/3) e -4t dt -4t v o = 2 e V, t > 0 vx = 1 v = 0.5 e -4t V , t > 0 3 +1 L PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 24. Express the following signals in terms of singularity functions. ⎧ 0, (a) v(t) = ⎨ ⎩− 5, ⎧ 0, ⎪− 10, ⎪ (b) i(t) = ⎨ ⎪ 10, ⎪⎩ 0, ⎧t −1 ⎪ 1, ⎪ (c) x(t) = ⎨ ⎪4 − t ⎪⎩ 0, ⎧ 2, ⎪ (d) y(t) = ⎨− 5, ⎪ 0, ⎩ t<0 t>0 t <1 1< t < 3 3<t <5 t <5 1< t < 2 2<t <3 3<t < 4 Otherwise t<0 0 < t <1 t <1 Chapter 7, Solution 24. (a) v( t ) = - 5 u(t) (b) i( t ) = -10 [ u ( t ) − u ( t − 3)] + 10[ u ( t − 3) − u ( t − 5)] = - 10 u(t ) + 20 u(t − 3) − 10 u(t − 5) (c) x ( t ) = ( t − 1) [ u ( t − 1) − u ( t − 2)] + [ u ( t − 2) − u ( t − 3)] + (4 − t ) [ u ( t − 3) − u ( t − 4)] = ( t − 1) u ( t − 1) − ( t − 2) u ( t − 2) − ( t − 3) u ( t − 3) + ( t − 4) u ( t − 4) = r(t − 1) − r(t − 2) − r(t − 3) + r(t − 4) (d) y( t ) = 2 u (-t ) − 5 [ u ( t ) − u ( t − 1)] = 2 u(-t ) − 5 u(t ) + 5 u(t − 1) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 25. Sketch each of the following waveforms. (a) i(t) = u(t -2) + u(t + 2) (b) v(t) = r(t) – r(t - 3) + 4u(t - 5) – 8u(t - 8) Chapter 7, Solution 25. The waveforms are sketched below. (a) i(t) 2 1 -2 -1 0 1 2 3 4 t (b) v(t) 7 3 –1 0 1 2 3 4 5 6 7 8 t PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 26. Express the signals in Fig. 7.104 in terms of singularity functions. Figure 7.104 For Prob. 7.26. Chapter 7, Solution 26. (a) (b) (c) (d) v1 ( t ) = u ( t + 1) − u ( t ) + [ u ( t − 1) − u ( t )] v1 ( t ) = u(t + 1) − 2 u(t ) + u(t − 1) v 2 ( t ) = ( 4 − t ) [ u ( t − 2) − u ( t − 4) ] v 2 ( t ) = -( t − 4) u ( t − 2) + ( t − 4) u ( t − 4) v 2 ( t ) = 2 u(t − 2) − r(t − 2) + r(t − 4) v 3 ( t ) = 2 [ u(t − 2) − u(t − 4)] + 4 [ u(t − 4) − u(t − 6)] v 3 ( t ) = 2 u(t − 2) + 2 u(t − 4) − 4 u(t − 6) v 4 ( t ) = -t [ u ( t − 1) − u ( t − 2)] = -t u(t − 1) + t u ( t − 2) v 4 ( t ) = (-t + 1 − 1) u ( t − 1) + ( t − 2 + 2) u ( t − 2) v 4 ( t ) = - r(t − 1) − u(t − 1) + r(t − 2) + 2 u(t − 2) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 27. Express v(t) in Fig. 7.105 in terms of step functions. Figure 7.105 For Prob. 7.27. Chapter 7, Solution 27. v(t)= 5u(t+1)+10u(t)–25u(t–1)+15u(t-2)V Chapter 7, Problem 28. Sketch the waveform represented by i(t) = r(t) – r(t -1) – u(t - 2) – r(t - 2) + r(t -3) + u(t - 4) Chapter 7, Solution 28. i(t) is sketched below. i(t) 1 0 1 2 3 4 t -1 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 29. Sketch the following functions: (a) x(t) = 10e − t u(t-1) (b) y(t) = 10e − ( t −1) u(t) (c) z(t) = cos 4t δ (t - 1) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 29 x(t) (a) 3.679 0 (b) 1 t y(t) 27.18 t 0 (c) z (t ) = cos 4tδ (t − 1) = cos 4δ (t − 1) = −0.6536δ (t − 1) , which is sketched below. z(t) 0 1 t -0.653 δ (t ) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 30. Evaluate the following integrals involving the impulse functions: (a) (b) ∫ ∞ ∫ ∞ 4t 2δ (t − 1)dt −∞ −∞ 4t 2 cos 2π t δ (t − 0.5)dt Chapter 7, Solution 30. ∞ (a) ∫− ∞ 4t (b) ∫-∞ 4t ∞ 2 2 δ( t − 1) dt = 4t 2 t =1 = 4 cos(2πt ) δ( t − 0.5) dt = 4t 2 cos(2πt ) t =0.5 = cos π = - 1 Chapter 7, Problem 31. Evaluate the following integrals: (a) ∫ ∞ (b) ∫ ∞ 2 e −4 r δ (t − 2)dt −∞ −∞ [5δ (t ) + e −t δ (t ) + cos 2π t δ (t )] dt Chapter 7, Solution 31. (a) (b) = e = 112 × 10 ∫ [ e δ(t − 2)] dt = e ∫ [ 5 δ(t ) + e δ(t ) + cos 2πt δ(t )] dt = ( 5 + e + cos(2πt )) ∞ -∞ ∞ -∞ - 4t 2 - 4t 2 -t t=2 -9 -16 -t t =0 = 5 +1+1 = 7 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 32. Evaluate the following integrals: t (a) ∫ u (λ ) dλ l 4 (b) ∫ r (t − 1)dt 0 5 (c) ∫ (t − 6) 2 δ (t − 2)dt 1 Chapter 7, Solution 32. (a) (b) t t t 1 4 1 1 ∫ u (λ )dλ = ∫ 1dλ = λ 4 0 1 ∫ r (t − 1)dt = ∫ 0dt + ∫ (t − 1)dt = 0 5 (c ) 1 = t −1 ∫ (t − 6) 2 δ (t − 2)dt = (t − 6) 2 t2 − t 14 = 4.5 2 t =2 = 16 1 Chapter 7, Problem 33. The voltage across a 10-mH inductor is 20 δ (t -2) mV. Find the inductor current, assuming that the inductor is initially uncharged. Chapter 7, Solution 33. i( t ) = 1 t ∫ v(t ) dt + i(0) L 0 i( t ) = 10 -3 10 × 10 -3 ∫ 20 δ(t − 2) dt + 0 t 0 i ( t ) = 2 u( t − 2 ) A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 34. Evaluate the following derivatives: d [u(t - 1) u(t + 1)] dt d [r(t - 6) u(t - 2)] (b) dt d [sin 4tu(t - 31)] (c) dt (a) Chapter 7, Solution 34. d [u ( t − 1) u ( t + 1)] = δ( t − 1)u ( t + 1) + dt (a) u ( t − 1)δ( t + 1) = δ( t − 1) • 1 + 0 • δ( t + 1) = δ( t − 1) d [r ( t − 6) u ( t − 2)] = u ( t − 6)u ( t − 2) + dt r ( t − 6)δ( t − 2) = u ( t − 6) • 1 + 0 • δ( t − 2) = u ( t − 6) (b) d [sin 4t u (t − 3)] = 4 cos 4t u ( t − 3) + sin 4tδ( t − 3) dt = 4 cos 4t u ( t − 3) + sin 4x3δ( t − 3) = 4 cos 4t u ( t − 3) − 0.5366δ( t − 3) (c) Chapter 7, Problem 35. Find the solution to the following differential equations: dv + 2v = 0, dt di + 3i = 0, (b) 2 dt (a) v(0) = -1 V i(0) = 2 Chapter 7, Solution 35. (a) v = Ae−2t , v(0) = A = −1 v = −e−2t u(t)V i = Ae3 t / 2 , i(0) = A = 2 (b) i(t) = 2e1.5t u(t)A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 36. Solve for v in the following differential equations, subject to the stated initial condition. v(0) = 0 (a) dv / dt + v = u(t), (b) 2 dv / dt – v =3u(t), v(0) = -6 Chapter 7, Solution 36. (a) v( t ) = A + B e-t , t > 0 A = 1, v(0) = 0 = 1 + B v( t ) = 1 − e -t V , t > 0 (b) v( t ) = A + B e t 2 , t > 0 v(0) = -6 = -3 + B A = -3 , v( t ) = - 3 ( 1 + e t 2 ) V , t > 0 or B = -1 or B = -3 Chapter 7, Problem 37. A circuit is described by 4 dv + v = 10 dt (a) What is the time constant of the circuit? (b) What is v( ∞ ) the final value of v? (c) If v(0) = 2 find v(t) for t ≥ 0. Chapter 7, Solution 37. Let v = vh + vp, vp =10. • 1 vh + 4 v h =0 ⎯ ⎯→ v h = Ae −t / 4 v = 10 + Ae −0.25t (a) τ = 4 s v(0) = 2 = 10 + A v = 10 − 8e −0.25t ⎯ ⎯→ A = −8 (b) v(∞) = 10 V (c ) v = 10 − 8e −0.25t u(t)V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 38. A circuit is described by di + 3i = 2u(t) dt Find i(t) for t > 0 given that i(0) = 0. Chapter 7, Solution 38 Let i = ip +ih • i h + 3ih = 0 Let i p = ku (t ), • ip = 0, 3ku (t ) = 2u (t ) ip = ih = Ae −3t u (t ) ⎯ ⎯→ ⎯ ⎯→ k= 2 3 2 u (t ) 3 2 i = ( Ae −3t + )u (t ) 3 If i(0) =0, then A + 2/3 = 0, i.e. A=-2/3. Thus i= 2 (1 − e −3t )u (t ) 3 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 39. Calculate the capacitor voltage for t < 0 and t > 0 for each of the circuits in Fig. 7.106. Figure 7.106 For Prob. 7.39. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 39. Before t = 0, (a) v( t ) = 1 (20) = 4 V 4 +1 After t = 0, v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ τ = RC = (4)(2) = 8 , v(0) = 4 , v(∞) = 20 v( t ) = 20 + (4 − 20) e -t 8 v( t ) = 20 − 16 e - t 8 V Before t = 0, v = v1 + v 2 , where v1 is due to the 12-V source and v 2 is due to the 2-A source. v1 = 12 V To get v 2 , transform the current source as shown in Fig. (a). v 2 = -8 V Thus, v = 12 − 8 = 4 V (b) After t = 0, the circuit becomes that shown in Fig. (b). 2F + v2 2F 4Ω − + − 8V 12 V + − 3Ω 3Ω (a) (b) v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v(∞) = 12 , v(0) = 4 , τ = RC = (2)(3) = 6 -t 6 v( t ) = 12 + (4 − 12) e v( t ) = 12 − 8 e -t 6 V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 40. Find the capacitor voltage for t < 0 and t > 0 for each of the circuits in Fig. 7.107. Figure 7.107 For Prob. 7.40. Chapter 7, Solution 40. Before t = 0, v = 12 V . (a) After t = 0, v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v(∞) = 4 , v(0) = 12 , τ = RC = (2)(3) = 6 v( t ) = 4 + (12 − 4) e - t 6 v( t ) = 4 + 8 e - t 6 V (b) Before t = 0, v = 12 V . After t = 0, v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ After transforming the current source, the circuit is shown below. t=0 2Ω 12 V v(0) = 12 , v = 12 V + − v(∞) = 12 , 4Ω 5F τ = RC = (2)(5) = 10 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 41. For the circuit in Fig. 7.108, find v(t) for t > 0. Figure 7.108 For Prob. 7.41. Chapter 7, Solution 41. v(0) = 0 , v(∞ ) = R eq C = (6 || 30)(1) = 30 (12) = 10 36 (6)(30) =5 36 v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v( t ) = 10 + (0 − 10) e - t 5 v( t ) = 10 (1 − e -0.2t ) u ( t )V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 42. (a) If the switch in Fig. 7.109 has been open for a long time and is closed at t = 0, find v o (t). (b) Suppose that the switch has been closed for a long time and is opened at t = 0. Find v o (t). Figure 7.109 For Prob. 7.42. Chapter 7, Solution 42. (a) v o ( t ) = v o (∞) + [ v o (0) − v o (∞)] e -t τ 4 v o (0) = 0 , v o (∞) = (12) = 8 4+2 4 τ = R eq C eq , R eq = 2 || 4 = 3 4 τ = (3) = 4 3 v o (t ) = 8 − 8 e -t 4 v o ( t ) = 8 ( 1 − e -0.25t ) V (b) For this case, v o (∞) = 0 so that v o ( t ) = v o (0) e - t τ 4 v o (0) = (12) = 8 , 4+2 v o ( t ) = 8 e -t 12 V τ = RC = (4)(3) = 12 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 43. Consider the circuit in Fig. 7.110. Find i(t) for t < 0 and t > 0. Figure 7.110 For Prob. 7.43. Chapter 7, Solution 43. Before t = 0, the circuit has reached steady state so that the capacitor acts like an open circuit. The circuit is equivalent to that shown in Fig. (a) after transforming the voltage source. 0.5i vo i 40 Ω 2A 0.5i 80 Ω (a) 0.5i = 2 − Hence, vo , 40 vo 1 vo = 2− 2 80 40 i= i= vo 80 ⎯ ⎯→ v o = 320 = 64 5 vo = 0.8 A 80 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. After t = 0, the circuit is as shown in Fig. (b). 0.5i vC i 3 mF 80 Ω 0.5i (b) v C ( t ) = v C (0) e - t τ , τ = R th C To find R th , we replace the capacitor with a 1-V voltage source as shown in Fig. (c). 0.5i vC i 1V + − 0.5i 80 Ω (c) vC 1 0.5 = , i o = 0.5 i = 80 80 80 1 80 R th = = = 160 Ω , τ = R th C = 480 i o 0.5 v C (0) = 64 V i= v C ( t ) = 64 e - t 480 dv C ⎛ 1 ⎞ ⎟ 64 e - t 480 0.5 i = -i C = -C = -3 ⎜ ⎝ 480 ⎠ dt i( t ) = 0.8 e - t 480 u ( t )A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 44. The switch in Fig. 7.111 has been in position a for a long time. At t = 0 it moves to position b. Calculate i(t) for all t > 0. Figure 7.111 For Prob. 7.44. Chapter 7, Solution 44. R eq = 6 || 3 = 2 Ω , τ = RC = 4 v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ Using voltage division, 3 v(0) = (30) = 10 V , 3+ 6 v(∞) = 3 (12) = 4 V 3+ 6 Thus, v( t ) = 4 + (10 − 4) e - t 4 = 4 + 6 e - t 4 ⎛ - 1⎞ dv i( t ) = C = (2)(6) ⎜ ⎟ e - t 4 = - 3 e -0.25t A ⎝4⎠ dt PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 45. Find v o in the circuit of Fig. 7.112 when v s = 6u(t). Assume that v o (0) = 1 V. Figure 7.112 For Prob. 7.45. Chapter 7, Solution 45. To find RTh, consider the circuit shown below. 20 kΩ 10 kΩ 40 kΩ RTh = 10 + 20 // 40 = 10 + τ = RThC = RTh 20 x40 70 kΩ = 60 3 70 x103 x3 x10 −6 = 0.07 3 To find vo(∞), consider the circuit below. 20 kΩ 10 kΩ + 6V + _ 40 kΩ vo – vo(∞) = 40 (6V) = 4V 40 + 20 vo(t) = vo(∞) + [vo(0) − vo(∞)]e−t / τ = 4 + (1− 4)e− t / 0.07 = 4 − 3e−14.286t V u(t) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 46. For the circuit in Fig. 7.113, i s (t) = 5u(t) Find v(t). Figure 7.113 For Prob. 7.46. Chapter 7, Solution 46. τ = RTh C = (2 + 6) x0.25 = 2s, v(0) = 0, v(∞) = 6i s = 6 x5 = 30 v(t ) = v(∞) + [v(0) − v(∞)]e − t / τ = 30(1 − e − t / 2 ) V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 47. Determine v(t) for t > 0 in the circuit of Fig. 7.114 if v(0) = 0. Figure 7.114 For Prob. 7.47. Chapter 7, Solution 47. For t < 0, u ( t ) = 0 , u ( t − 1) = 0 , v(0) = 0 For 0 < t < 1, τ = RC = (2 + 8)(0.1) = 1 v(0) = 0 , v(∞) = (8)(3) = 24 v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v( t ) = 24( 1 − e - t ) For t > 1, v(1) = 24( 1 − e -1 ) = 15.17 - 6 + v(∞) - 24 = 0 ⎯ ⎯→ v(∞) = 30 v( t ) = 30 + (15.17 − 30) e -(t-1) v( t ) = 30 − 14.83 e -(t-1) Thus, ( ) ⎧ 24 1 − e - t V , 0<t<1 v( t ) = ⎨ -(t -1) V, t >1 ⎩ 30 − 14.83 e PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 48. Find v(t) and i(t) in the circuit of Fig. 7.115. Figure 7.115 For Prob. 7.48. Chapter 7, Solution 48. For t < 0, u (-t) = 1 , For t > 0, u (-t) = 0 , R th = 20 + 10 = 30 , v(0) = 10 V v(∞) = 0 τ = R th C = (30)(0.1) = 3 v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v( t ) = 10 e -t 3 V ⎛ - 1⎞ dv = (0.1) ⎜ ⎟10 e - t 3 ⎝3⎠ dt -1 i( t ) = e - t 3 A 3 i( t ) = C PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 49. If the waveform in Fig. 7.116(a) is applied to the circuit of Fig. 7.116(b), find v(t). Assume v(0) = 0. Figure 7.116 For Prob. 7.49 and Review Question 7.10. Chapter 7, Solution 49. For 0 < t < 1, v(0) = 0 , R eq = 4 + 6 = 10 , v(∞) = (2)(4) = 8 τ = R eq C = (10)(0.5) = 5 v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v( t ) = 8 ( 1 − e - t 5 ) V For t > 1, v(1) = 8 ( 1 − e -0.2 ) = 1.45 , v( t ) = v(∞) + [ v(1) − v(∞)] e -( t −1) τ v( t ) = 1.45 e -( t −1) 5 V Thus, ( v(∞) = 0 ) ⎧ 8 1 − e -t 5 V , 0 < t < 1 v( t ) = ⎨ - ( t −1 ) 5 V, t >1 ⎩ 1.45 e PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 50. * In the circuit of Fig. 7.117, find i x for t > 0. Let R 1 = R 2 = 1k Ω , R 3 = 2k Ω , and C = 0.25 mF. Figure 7.117 For Prob. 7.50. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 50. For the capacitor voltage, v( t ) = v(∞) + [ v(0) − v(∞)] e- t τ v(0) = 0 For t > 0, we transform the current source to a voltage source as shown in Fig. (a). 1 kΩ 1 kΩ + 30 V + − 2 kΩ v − (a) 2 (30) = 15 V 2 +1+1 R th = (1 + 1) || 2 = 1 kΩ 1 1 τ = R th C = 10 3 × × 10 -3 = 4 4 v( t ) = 15 ( 1 − e -4t ) , t > 0 v(∞) = We now obtain i x from v(t). Consider Fig. (b). iT 1 kΩ v ix 30 mA 1 kΩ 1/4 mF 2 kΩ (b) But i x = 30 mA − i T v dv +C iT = R3 dt i T ( t ) = 7.5 ( 1 − e -4t ) mA + i T ( t ) = 7.5 ( 1 + e -4t ) mA 1 × 10 -3 (-15)(-4) e -4t A 4 Thus, i x ( t ) = 30 − 7.5 − 7.5 e -4t mA i x ( t ) = 7.5 ( 3 − e -4t ) mA , t > 0 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 51. Rather than applying the short-cut technique used in Section 7.6, use KVL to obtain Eq. (7.60). Chapter 7, Solution 51. Consider the circuit below. t=0 R + VS + − i L v − After the switch is closed, applying KVL gives di VS = Ri + L dt ⎛ VS ⎞ di ⎟ L = -R ⎜ i − or ⎝ dt R⎠ di -R = dt i − VS R L Integrating both sides, ⎛ V ⎞ i( t ) - R ln ⎜ i − S ⎟ I 0 = t ⎝ R⎠ L ⎛ i − VS R ⎞ - t ⎟= ln ⎜ ⎝ I0 − VS R ⎠ τ i − VS R = e- t τ or I0 − VS R i( t ) = VS ⎛ VS ⎞ -t τ ⎟e + ⎜ I0 − R ⎝ R⎠ which is the same as Eq. (7.60). PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 52. For the circuit in Fig. 7.118, find i(t) for t > 0. Figure 7.118 For Prob. 7.52. Chapter 7, Solution 52. 20 = 2 A, i(∞) = 2 A 10 i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i(0) = i( t ) = 2 A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 53. Determine the inductor current i(t) for both t < 0 and t > 0 for each of the circuits in Fig. 7.119. Figure 7.119 For Prob. 7.53. Chapter 7, Solution 53. (a) 25 =5A 3+ 2 After t = 0, i( t ) = i(0) e- t τ L 4 τ = = = 2, i(0) = 5 R 2 Before t = 0, i= i( t ) = 5 e - t 2 u ( t ) A (b) Before t = 0, the inductor acts as a short circuit so that the 2 Ω and 4 Ω resistors are short-circuited. i( t ) = 6 A After t = 0, we have an RL circuit. L 3 τ= = i( t ) = i(0) e- t τ , R 2 i( t ) = 6 e - 2 t 3 u ( t ) A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 54. Obtain the inductor current for both t < 0 and t > 0 in each of the circuits in Fig. 7.120. Figure 7.120 For Prob. 7.54. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 54. (a) Before t = 0, i is obtained by current division or 4 i( t ) = (2) = 1 A 4+4 After t = 0, i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ L , R eq = 4 + 4 || 12 = 7 Ω τ= R eq τ= 3.5 1 = 7 2 i(0) = 1 , i(∞) = 4 || 12 3 6 (2) = (2) = 4 + 4 || 12 4+3 7 6 ⎛ 6⎞ + ⎜ 1 − ⎟ e -2 t 7 ⎝ 7⎠ 1 i( t ) = ( 6 − e - 2t ) A 7 10 Before t = 0, i( t ) = =2A 2+3 After t = 0, R eq = 3 + 6 || 2 = 4.5 i( t ) = (b) L 2 4 = = R eq 4.5 9 i(0) = 2 To find i(∞) , consider the circuit below, at t = when the inductor becomes a short circuit, v τ= i 10 V 2Ω + − 24 V + − 6Ω 2H 3Ω 10 − v 24 − v v + = ⎯ ⎯→ v = 9 2 6 3 v i(∞) = = 3 A 3 i( t ) = 3 + (2 − 3) e -9 t 4 i( t ) = 3 − e - 9 t 4 A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 55. Find v(t) for t < 0 and t > 0 in the circuit of Fig. 7.121. Figure 7.121 For Prob. 7.55. Chapter 7, Solution 55. For t < 0, consider the circuit shown in Fig. (a). 0.5 H io 3Ω 24 V io + − 0.5 H + + 4io v i 2Ω − (a) 8Ω 20 V + v + − 2Ω − (b) 3i o + 24 − 4i o = 0 ⎯ ⎯→ i o = 24 v v( t ) = 4i o = 96 V i = = 48 A 2 For t > 0, consider the circuit in Fig. (b). i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i(0) = 48 , i (∞ ) = 0 L 0.5 1 = = R th = 2 Ω , τ = R th 2 4 i( t ) = (48) e -4t v( t ) = 2 i( t ) = 96 e -4t u ( t )V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 56. For the network shown in Fig. 7.122, find v(t) for t > 0. Figure 7.122 For Prob. 7.56. Chapter 7, Solution 56. R eq = 6 + 20 || 5 = 10 Ω , τ= L = 0.05 R i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i(0) is found by applying nodal analysis to the following circuit. 5Ω vx 2A 12 Ω 20 Ω i 6Ω + 0.5 H + − 20 V v − 2+ 20 − v x v x v x v x = + + 5 12 20 6 vx i ( 0) = =2A 6 ⎯ ⎯→ v x = 12 Since 20 || 5 = 4 , 4 i(∞) = (4) = 1.6 4+6 i( t ) = 1.6 + (2 − 1.6) e- t 0.05 = 1.6 + 0.4 e-20t di 1 v( t ) = L = (0.4) (-20) e -20t dt 2 v( t ) = - 4 e -20t V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 57. * Find i 1 (t) and i 2 (t) for t > 0 in the circuit of Fig. 7.123. Figure 7.123 For Prob. 7.57. * An asterisk indicates a challenging problem. Chapter 7, Solution 57. At t = 0 − , the circuit has reached steady state so that the inductors act like short circuits. 6Ω 30 V i + − i1 i2 5Ω 20 Ω 20 30 30 = = 3, i1 = (3) = 2.4 , 25 6 + 5 || 20 10 i 1 ( 0 ) = 2 .4 A , i 2 ( 0 ) = 0 .6 A i= i 2 = 0 .6 For t > 0, the switch is closed so that the energies in L1 and L 2 flow through the closed switch and become dissipated in the 5 Ω and 20 Ω resistors. L 2.5 1 i1 ( t ) = i1 (0) e - t τ1 , τ1 = 1 = = R1 5 2 i1 ( t ) = 2.4 e -2t u ( t )A i 2 ( t ) = i 2 (0) e- t τ 2 , τ2 = L2 4 1 = = R 2 20 5 i 2 ( t ) = 0.6 e -5t u ( t )A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 58. Rework Prob. 7.17 if i(0) = 10 A and v(t) = 20u (t) V. Chapter 7, Solution 58. For t < 0, v o (t) = 0 For t > 0, i(0) = 10 , R th = 1 + 3 = 4 Ω , 20 =5 1+ 3 L 14 1 τ= = = R th 4 16 i(∞) = i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i( t ) = 5 ( 1 + e-16t ) A di 1 v o ( t ) = 3 i + L = 15 ( 1 + e-16t ) + (-16)(5) e-16t dt 4 -16t v o ( t ) = 15 − 5 e V Chapter 7, Problem 59. Determine the step response v 0 (t) to v s in the circuit of Fig. 7.124. Figure 7.124 For Prob. 7.59. Chapter 7, Solution 59. Let I be the current through the inductor. i(0) = 0 For t < 0, vs = 0 , For t > 0, R eq = 4 + 6 || 3 = 6 , τ= L 1 .5 = = 0.25 R eq 6 2 (3) = 1 2+ 4 i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i( t ) = 1 − e-4t di v o ( t ) = L = (1.5)(-4)(-e- 4t ) dt i(∞) = v o ( t ) = 6 e -4t u ( t ) V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 60. Find v(t) for t > 0 in the circuit of Fig. 7.125 if the initial current in the inductor is zero. Figure 7.125 For Prob. 7.60. Chapter 7, Solution 60. Let I be the inductor current. For t < 0, u(t) = 0 ⎯ ⎯→ i(0) = 0 For t > 0, R eq = 5 || 20 = 4 Ω , τ= L 8 = =2 R eq 4 i(∞) = 4 i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i( t ) = 4 ( 1 − e - t 2 ) ⎛ - 1⎞ di = (8)(-4)⎜ ⎟ e- t 2 ⎝2⎠ dt -0.5t V v( t ) = 16 e v( t ) = L PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 61. In the circuit of Fig. 7.126, i s changes from 5 A to 10 A at t = 0 that is, i s = 5u (-t) + 10u(t) Find v and i. Figure 7.126 For Prob. 7.61. Chapter 7, Solution 61. The current source is transformed as shown below. 4Ω 20u(-t) + 40u(t) + − 0.5 H L 12 1 = = , i(0) = 5 , R 4 8 i( t ) = i(∞) + [ i(0) − i(∞)] e - t τ τ= i(∞) = 10 i( t ) = 10 − 5 e -8t u ( t )A v( t ) = L di ⎛ 1 ⎞ = ⎜ ⎟(-5)(-8) e -8t dt ⎝ 2 ⎠ v( t ) = 20 e -8t u ( t ) V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 62. For the circuit in Fig. 7.127, calculate i(t) if i(0) = 0. Figure 7.127 For Prob. 7.62. Chapter 7, Solution 62. L 2 = =1 R eq 3 || 6 For 0 < t < 1, u ( t − 1) = 0 so that 1 i(0) = 0 , i(∞) = 6 1 i( t ) = ( 1 − e - t ) 6 τ= 1 ( 1 − e -1 ) = 0.1054 6 1 1 1 i(∞) = + = 3 6 2 i( t ) = 0.5 + (0.1054 − 0.5) e-(t -1) i( t ) = 0.5 − 0.3946 e-(t -1) For t > 1, Thus, i(1) = ⎧⎪ 1 ( 1 − e -t ) A 0<t<1 i( t ) = ⎨ 6 ⎪⎩ 0.5 − 0.3946 e -(t -1) A t>1 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 63. Obtain v(t) and i(t) in the circuit of Fig. 7.128. Figure 7.128 For Prob. 7.63. Chapter 7, Solution 63. 10 =2 5 For t < 0, u (- t ) = 1 , i(0) = For t > 0, u (-t) = 0 , i(∞) = 0 L 0.5 1 τ= = = R th 4 8 R th = 5 || 20 = 4 Ω , i( t ) = i(∞) + [ i(0) − i(∞)] e - t τ i( t ) = 2 e -8t u ( t )A v( t ) = L di ⎛ 1 ⎞ = ⎜ ⎟(-8)(2) e-8t dt ⎝ 2 ⎠ v( t ) = - 8 e -8t u ( t ) V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 64. Find v 0 (t) for t > 0 in the circuit of Fig. 7.129. Figure 7.129 For Prob. 7.64. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 64. Let i be the inductor current. For t < 0, the inductor acts like a short circuit and the 3 Ω resistor is shortcircuited so that the equivalent circuit is shown in Fig. (a). 6Ω 10 Ω + − 6Ω i 3Ω + − 10 Ω (a) i = i(0) = For t > 0, io v i 3Ω 2Ω (b) 10 = 1.667 A 6 R th = 2 + 3 || 6 = 4 Ω , τ= L 4 = =1 R th 4 To find i(∞) , consider the circuit in Fig. (b). 10 − v v v 10 = + ⎯ ⎯→ v = 6 3 2 6 v 5 i = i(∞) = = 2 6 i( t ) = i(∞) + [ i(0) − i(∞)] e - t τ 5 ⎛ 10 5 ⎞ 5 i( t ) = + ⎜ − ⎟ e - t = 1 + e - t A 6 ⎝ 6 6⎠ 6 ( ) v o is the voltage across the 4 H inductor and the 2 Ω resistor v o (t) = 2 i + L ⎛5⎞ di 10 10 - t 10 10 = + e + (4)⎜ ⎟(-1) e - t = − e - t ⎝6⎠ dt 6 6 6 6 ( ) v o ( t ) = 1.6667 1 − e - t V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 65. If the input pulse in Fig. 7.130(a) is applied to the circuit in Fig. 7.130(b), determine the response i(t). Figure 7.130 For Prob. 7.65. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 65. Since v s = 10 [ u ( t ) − u ( t − 1)] , this is the same as saying that a 10 V source is turned on at t = 0 and a -10 V source is turned on later at t = 1. This is shown in the figure below. vs 10 1 t -10 For 0 < t < 1, i(0) = 0 , R th = 5 || 20 = 4 , 10 =2 5 L 2 1 τ= = = R th 4 2 i(∞) = i( t ) = i(∞) + [ i(0) − i(∞)] e- t τ i( t ) = 2 ( 1 − e -2t ) A i(1) = 2 ( 1 − e-2 ) = 1.729 For t > 1, i(∞) = 0 since vs = 0 i( t ) = i(1) e- ( t −1) τ i( t ) = 1.729 e-2( t −1) A Thus, ⎧ 2 ( 1 − e - 2t ) A 0 < t < 1 i( t ) = ⎨ t>1 ⎩ 1.729 e - 2( t −1) A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 66. For the op amp circuit of Fig. 7.131, find v 0 . Assume that v s changes abruptly from 0 to 1 V at t = 0. Figure 7.131 For Prob. 7.66. Chapter 7, Solution 66. For t<0-, vs =0 so that vo(0)=0 Let v be the capacitor voltage For t>0, vs =1. At steady state, the capacitor acts like an open circuit so that we have an inverting amplifier vo(∞) = –(50k/20k)(1V) = –2.5 V τ = RC = 50x103x0.5x10–6 = 25 ms vo(t) = vo(∞) + (vo(0) – vo(∞))e–t/0.025 = 2.5(e–40t – 1) V. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 67. If v(0) = 5 V, find v 0 (t) for t > 0 in the op amp circuit of Fig. 7.132. Let R = 10k Ω and C = 1 µ F. Figure 7.132 For Prob. 7.67. Chapter 7, Solution 67. The op amp is a voltage follower so that v o = v as shown below. R v1 R − + vo + R vo vo C − At node 1, v o − v1 v1 − 0 v1 − v o 2 = + ⎯ ⎯→ v1 = v o R R R 3 At the noninverting terminal, dv v − v1 =0 C o + o R dt dv 2 1 − RC o = v o − v1 = v o − v o = v o dt 3 3 dv o v =− o dt 3RC v o ( t ) = VT e - t 3RC VT = vo (0) = 5 V , τ = 3RC = (3)(10 × 103 )(1 × 10- 6 ) = 3 100 v o ( t ) = 5 e -100t 3 u ( t )V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 68. Obtain v 0 for t > 0 in the circuit of Fig. 7.133. Figure 7.133 For Prob. 7.68. Chapter 7, Solution 68. This is a very interesting problem and has both an important ideal solution as well as an important practical solution. Let us look at the ideal solution first. Just before the switch closes, the value of the voltage across the capacitor is zero which means that the voltage at both terminals input of the op amp are each zero. As soon as the switch closes, the output tries to go to a voltage such that the input to the op amp both go to 4 volts. The ideal op amp puts out whatever current is necessary to reach this condition. An infinite (impulse) current is necessary if the voltage across the capacitor is to go to 8 volts in zero time (8 volts across the capacitor will result in 4 volts appearing at the negative terminal of the op amp). So vo will be equal to 8 volts for all t > 0. What happens in a real circuit? Essentially, the output of the amplifier portion of the op amp goes to whatever its maximum value can be. Then this maximum voltage appears across the output resistance of the op amp and the capacitor that is in series with it. This results in an exponential rise in the capacitor voltage to the steady-state value of 8 volts. vC(t) = Vop amp max(1 – e-t/(RoutC)) volts, for all values of vC less than 8 V, = 8 V when t is large enough so that the 8 V is reached. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 69. For the op amp circuit in Fig. 7.134, find v 0 (t) for t > 0. Figure 7.134 For Prob. 7.69. Chapter 7, Solution 69. Let v x be the capacitor voltage. v x ( 0) = 0 For t < 0, For t > 0, the 20 kΩ and 100 kΩ resistors are in series and together, they are in parallel with the capacitor since no current enters the op amp terminals. As t → ∞ , the capacitor acts like an open circuit so that −4 v o (∞ ) = (20 + 100) = −48 10 R th = 20 + 100 = 120 kΩ , τ = R th C = (120 × 103 )(25 × 10-3 ) = 3000 v o ( t ) = v o (∞) + [ v o (0) − v o (∞)] e - t τ ( ) v o ( t ) = −48 1 − e - t 3000 V = 48(e–t/3000–1)u(t)V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 70. Determine v 0 for t > 0 when v s = 20 mV in the op amp circuit of Fig. 7.135. Figure 7.135 For Prob. 7.70. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 70. Let v = capacitor voltage. For t < 0, the switch is open and v(0) = 0 . For t > 0, the switch is closed and the circuit becomes as shown below. 1 + − 2 vS + + − vo v − C R v1 = v 2 = v s 0 − vs dv =C R dt ⎯→ v o = v s − v where v = v s − v o ⎯ (1) (2) (3) From (1), dv v s = =0 dt RC - t vs -1 v s dt + v(0) = v= ∫ RC RC Since v is constant, RC = (20 × 10 3 )(5 × 10 -6 ) = 0.1 - 20 t v= mV = -200 t mV 0.1 From (3), v o = v s − v = 20 + 200 t v o = 20 ( 1 + 10t ) mV PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 71. For the op amp circuit in Fig. 7.136, suppose v 0 = 0 and v s = 3 V. Find v(t) for t > 0. Figure 7.136 For Prob. 7.71. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 71. We temporarily remove the capacitor and find the Thevenin equivalent at its terminals. To find RTh, we consider the circuit below. Ro 20 kΩ RTh Since we are assuming an ideal op amp, Ro = 0 and RTh=20kΩ . The op amp circuit is a noninverting amplifier. Hence, 10 )vs = 2vs = 6V 10 The Thevenin equivalent is shown below. VTh = (1+ 20 kΩ + 6V + _ v 10 µF – Thus, v(t) = 6(1− e− t /τ ) , t > 0 where τ = RTH C = 20 x10 −3 x10 x10 −6 = 0.2 v(t) = 6(1− e−5t ), t > 0 V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 72. Find i 0 in the op amp circuit in Fig. 7.137. Assume that v(0) = -2 V, R = 10 k Ω , and C = 10 µF . Figure 7.137 For Prob. 7.72. Chapter 7, Solution 72. The op amp acts as an emitter follower so that the Thevenin equivalent circuit is shown below. C + 3u(t) Hence, + − v − io R v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v(0) = -2 V , v(∞) = 3 V , τ = RC = (10 × 10 3 )(10 × 10 -6 ) = 0.1 v( t ) = 3 + (-2 - 3) e -10t = 3 − 5 e -10t dv = (10 × 10 -6 )(-5)(-10) e -10t dt i o = 0.5 e -10t mA , t > 0 io = C PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 73. For the op amp circuit in Fig. 7.138, let R 1 = 10 k Ω , R f = 20 k Ω , C = 20 µ F, and v(0) = 1 V. Find v 0 . Figure 7.138 For Prob. 7.73. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 73. Consider the circuit below. Rf v1 R1 v2 + v1 + − C v v3 − − + + vo − At node 2, v1 − v 2 dv =C R1 dt At node 3, dv v 3 − v o C = dt Rf But v 3 = 0 and v = v 2 − v 3 = v 2 . Hence, (1) becomes v1 − v dv =C R1 dt dv v1 − v = R 1C dt v1 dv v or + = dt R 1C R 1C which is similar to Eq. (7.42). Hence, ⎧ vT t<0 v( t ) = ⎨ -t τ t>0 ⎩ v1 + ( v T − v1 ) e where v T = v(0) = 1 and v1 = 4 τ = R 1C = (10 × 10 3 )(20 × 10 -6 ) = 0.2 ⎧ 1 t<0 v( t ) = ⎨ ⎩ 4 − 3 e -5t t > 0 From (2), dv v o = -R f C = (20 × 10 3 )(20 × 10 -6 )(15 e -5t ) dt v o = -6 e -5t , t > 0 (1) (2) v o = - 6 e -5t u(t ) V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 74. Determine v 0 (t) for t > 0 in the circuit of Fig. 7.139. Let i s = 10u(t) µ A and assume that the capacitor is initially uncharged. Figure 7.139 For Prob. 7.74. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 74. Let v = capacitor voltage. For t < 0, v(0) = 0 Rf C is R − + is + vo − i s = 10 µA . Consider the circuit below. For t > 0, dv v + dt R v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ is = C (1) (2) It is evident from the circuit that τ = RC = (2 × 10 −6 )(50 × 10 3 ) = 0.1 At steady state, the capacitor acts like an open circuit so that i s passes through R. Hence, v(∞) = i s R = (10 × 10 −6 )(50 × 10 3 ) = 0.5 V Then, v( t ) = 0.5 ( 1 − e -10t ) V (3) But is = 0 − vo Rf ⎯ ⎯→ v o = -i s R f (4) Combining (1), (3), and (4), we obtain - Rf dv vo = v − RfC R dt -1 dv v o = v − (10 × 10 3 )(2 × 10 -6 ) 5 dt -10t -2 v o = -0.1 + 0.1e − (2 × 10 )(0.5)( - 10 e -10t ) v o = 0.2 e -10t − 0.1 v o = 0.1 ( 2 e -10t − 1) V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 75. In the circuit of Fig. 7.140, find v 0 and i 0 , given that v s = 4u(t) V and v(0) = 1 V. Figure 7.140 For Prob. 7.75. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 75. Let v1 = voltage at the noninverting terminal. Let v 2 = voltage at the inverting terminal. For t > 0, v1 = v 2 = v s = 4 0 − vs = i o , R 1 = 20 kΩ R1 vo = -ioR v dv R 2 = 10 kΩ , C = 2 µF Also, i o = +C , R2 dt - vs v dv i.e. = +C R1 R2 dt This is a step response. v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ , where τ = R 2 C = (10 × 10 3 )(2 × 10 -6 ) = (1) (2) v(0) = 1 1 50 At steady state, the capacitor acts like an open circuit so that i o passes through R 2 . Hence, as t → ∞ - vs v(∞) = io = R1 R2 - R2 - 10 i.e. v(∞) = vs = (4) = -2 R1 20 v( t ) = -2 + (1 + 2) e -50t v( t ) = -2 + 3 e -50t But v = vs − vo or v o = v s − v = 4 + 2 − 3 e -50 t v o = 6 − 3 e -50 t u ( t )V - vs -4 = = -0.2 mA R 1 20k v dv io = +C = - 0.2 mA R2 dt io = or PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 76. Repeat Prob. 7.49 using PSpice. Chapter 7, Solution 76. The schematic is shown below. For the pulse, we use IPWL and enter the corresponding values as attributes as shown. By selecting Analysis/Setup/Transient, we let Print Step = 25 ms and Final Step = 2 s since the width of the input pulse is 1 s. After saving and simulating the circuit, we select Trace/Add and display –V(C1:2). The plot of V(t) is shown below. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 77. The switch in Fig. 7.141 opens at t = 0. Use PSpice to determine v(t) for t > 0. Figure 7.141 For Prob. 7.77. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 77. The schematic is shown below. We click Marker and insert Mark Voltage Differential at the terminals of the capacitor to display V after simulation. The plot of V is shown below. Note from the plot that V(0) = 12 V and V(∞) = -24 V which are correct. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 78. The switch in Fig. 7.142 moves from position a to b at t = 0. Use PSpice to find i(t) for t > 0. Figure 7.142 For Prob. 7.78. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Solution 78. (a) When the switch is in position (a), the schematic is shown below. We insert IPROBE to display i. After simulation, we obtain, i(0) = 7.714 A from the display of IPROBE. (b) When the switch is in position (b), the schematic is as shown below. For inductor I1, we let IC = 7.714. By clicking Analysis/Setup/Transient, we let Print Step = 25 ms and Final Step = 2 s. After Simulation, we click Trace/Add in the probe menu and display I(L1) as shown below. Note that i(∞) = 12A, which is correct. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 79. In the circuit of Fig. 7.143, the switch has been in position a for a long time but moves instantaneously to position b at t = 0 Determine i 0 (t). Figure 7.143 For Prob. 7.79. Chapter 7, Solution 79. When the switch is in position 1, io(0) = 12/3 = 4A. When the switch is in position 2, 4 L i o (∞ ) = − = −0.5 A, R Th = (3 + 5) // 4 = 8 / 3, τ= = 3 / 80 5+3 R Th i o ( t ) = i o (∞) + [i o (0) − i o (∞)]e − t / τ = − 0.5 + 4.5e −80 t / 3 u(t)A PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 80. In the circuit of Fig. 7.144, assume that the switch has been in position a for a long time, find: (a) i 1 (0), i 2 (0), and v 0 (0) (b) i L (t) (c) i 1 ( ∞ ), i 2 ( ∞ ), and v 0 ( ∞ ). Figure 7.144 For Prob. 7.80. Chapter 7, Solution 80. (a) When the switch is in position A, the 5-ohm and 6-ohm resistors are shortcircuited so that i1 (0) = i2 (0) = vo (0) = 0 but the current through the 4-H inductor is iL(0) =30/10 = 3A. (b) When the switch is in position B, R Th = 3 // 6 = 2Ω, τ= L = 4 / 2 = 2 sec R Th i L ( t ) = i L (∞) + [i L (0) − i L (∞)]e − t / τ = 0 + 3e − t / 2 = 3e − t / 2 A (c) i1 (∞) = 30 = 2 A, 10 + 5 vo (t ) = L 3 i 2 (∞ ) = − i L (∞ ) = 0 A 9 di L dt ⎯ ⎯→ v o (∞ ) = 0 V PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 81. Repeat Prob. 7.65 using PSpice. Chapter 7, Solution 81. The schematic is shown below. We use VPWL for the pulse and specify the attributes as shown. In the Analysis/Setup/Transient menu, we select Print Step = 25 ms and final Step = 3 S. By inserting a current marker at one terminal of LI, we automatically obtain the plot of i after simulation as shown below. 2.0A 1.5A 1.0A 0.5A 0A 0s 0.5s -I(L1) 1.0s 1.5s 2.0s 2.5s 3.0s Time PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 82. In designing a signal-switching circuit, it was found that a 100- µ F capacitor was needed for a time constant of 3 ms. What value resistor is necessary for the circuit? Chapter 7, Solution 82. 3 × 10 -3 τ = 30 Ω τ = RC ⎯ ⎯→ R = = C 100 × 10 -6 Chapter 7, Problem 83. An RC circuit consists of a series connection of a 120-V source, a switch, a 34-M Ω resistor, and a 15- µ F capacitor. The circuit is used in estimating the speed of a horse running a 4-km racetrack. The switch closes when the horse begins and opens when the horse crosses the finish line. Assuming that the capacitor charges to 85.6 V, calculate the speed of the horse. Chapter 7, Solution 83. v(∞) = 120, τ = RC = 34 x10 6 x15 x10 −6 = 510s v(0) = 0, v(t ) = v(∞) + [v(0) − v(∞)]e − t / τ Solving for t gives ⎯ ⎯→ 85.6 = 120(1 − e − t / 510 ) t = 510 ln 3.488 = 637.16 s speed = 4000m/637.16s = 6.278m/s Chapter 7, Problem 84. The resistance of a 160-mH coil is 8 Ω . Find the time required for the current to build up to 60 percent of its final value when voltage is applied to the coil. Chapter 7, Solution 84. Let Io be the final value of the current. Then i (t ) = I o (1 − e − t / τ ), 0.6 I o = I o (1 − e −50t ) τ = R / L = 0.16 / 8 = 1 / 50 ⎯ ⎯→ t= 1 1 ln = 18.33 ms. 50 0.4 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 85. A simple relaxation oscillator circuit is shown in Fig. 7.145. The neon lamp fires when its voltage reaches 75 V and turns off when its voltage drops to 30 V. Its resistance is 120 Ω when on and infinitely high when off. (a) For how long is the lamp on each time the capacitor discharges? (b) What is the time interval between light flashes? Figure 7.145 For Prob. 7.85. Chapter 7, Solution 85. (a) The light is on from 75 volts until 30 volts. During that time we essentially have a 120-ohm resistor in parallel with a 6-µF capacitor. v(0) = 75, v(∞) = 0, τ = 120x6x10-6 = 0.72 ms v(t1) = 75 e − t1 / τ = 30 which leads to t1 = –0.72ln(0.4) ms = 659.7 µs of lamp on time. (b) τ = RC = (4 × 106 )(6 × 10-6 ) = 24 s Since v( t ) = v(∞) + [ v(0) − v(∞)] e - t τ v( t 1 ) − v(∞) = [ v(0) − v(∞)] e - t1 τ v( t 2 ) − v(∞) = [ v(0) − v(∞)] e- t 2 τ (1) (2) Dividing (1) by (2), v( t1 ) − v(∞) = e( t 2 − t1 ) τ v( t 2 ) − v(∞) ⎛ v( t ) − v(∞) ⎞ ⎟ t 0 = t 2 − t1 = τ ln ⎜ 1 ⎝ v( t 2 ) − v(∞) ⎠ ⎛ 75 − 120 ⎞ ⎟ = 24 ln (2) = 16.636 s t 0 = 24 ln ⎜ ⎝ 30 − 120 ⎠ PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 86. Figure 7.146 shows a circuit for setting the length of time voltage is applied to the electrodes of a welding machine. The time is taken as how long it takes the capacitor to charge from 0 to 8 V. What is the time range covered by the variable resistor? Figure 7.146 For Prob. 7.86. Chapter 7, Solution 86. v( t ) = v(∞) + [ v(0) − v(∞)] e- t τ v(∞) = 12 , v(0) = 0 -t τ v( t ) = 12 ( 1 − e ) v( t 0 ) = 8 = 12 ( 1 − e- t 0 τ ) 8 1 = 1 − e- t 0 τ ⎯ ⎯→ e- t 0 τ = 12 3 t 0 = τ ln (3) For R = 100 kΩ , τ = RC = (100 × 103 )(2 × 10-6 ) = 0.2 s t 0 = 0.2 ln (3) = 0.2197 s For R = 1 MΩ , τ = RC = (1 × 106 )(2 × 10-6 ) = 2 s t 0 = 2 ln (3) = 2.197 s Thus, 0.2197 s < t 0 < 2.197 s PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 87. A 120-V dc generator energizes a motor whose coil has an inductance of 50 H and a resistance of 100 Ω . A field discharge resistor of 400 Ω is connected in parallel with the motor to avoid damage to the motor, as shown in Fig. 7.147. The system is at steady state. Find the current through the discharge resistor 100 ms after the breaker is tripped. Figure 7.147 For Prob. 7.87. Chapter 7, Solution 87. Let i be the inductor current. For t < 0, i (0 − ) = 120 = 1.2 A 100 For t > 0, we have an RL circuit L 50 τ= = = 0.1 , i(∞) = 0 R 100 + 400 i( t ) = i(∞) + [ i(0) − i(∞)] e - t τ i( t ) = 1.2 e -10t At t = 100 ms = 0.1 s, i(0.1) = 1.2 e -1 = 441mA which is the same as the current through the resistor. PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 88. The circuit in Fig. 7.148(a) can be designed as an approximate differentiator or an integrator, depending on whether the output is taken across the resistor or the capacitor, and also on the time constant τ = RC of the circuit and the width T of the input pulse in Fig. 7.148(b). The circuit is a differentiator if τ << T, say τ < 0.1T, or an integrator if τ >> T, say τ > 10T. (a) What is the minimum pulse width that will allow a differentiator output to appear across the capacitor? (b) If the output is to be an integrated form of the input, what is the maximum value the pulse width can assume? Figure 7.148 For Prob. 7.88. Chapter 7, Solution 88. (a) τ = RC = (300 × 10 3 )(200 × 10 -12 ) = 60 µs As a differentiator, T > 10 τ = 600 µs = 0.6 ms Tmin = 0.6 ms i.e. (b) τ = RC = 60 µs As an integrator, T < 0.1τ = 6 µs i.e. Tmax = 6 µs PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 89. An RL circuit may be used as a differentiator if the output is taken across the inductor and τ << T (say τ < 0.1T), where T is the width of the input pulse. If R is fixed at 200 k Ω determine the maximum value of L required to differentiate a pulse with T = 10 µ s. Chapter 7, Solution 89. Since τ < 0.1 T = 1 µs L < 1 µs R L < R × 10 -6 = (200 × 10 3 )(1 × 10 -6 ) L < 200 mH PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 90. An attenuator probe employed with oscilloscopes was designed to reduce the magnitude of the input voltage v i by a factor of 10. As shown in Fig. 7.149, the oscilloscope has internal resistance R s and capacitance C s while the probe has an internal resistance R p If R p is fixed at 6 M Ω find R s and C s for the circuit to have a time constant of 15 µ s. Figure 7.149 For Prob. 7.90. Chapter 7, Solution 90. We determine the Thevenin equivalent circuit for the capacitor C s . Rs v th = v, R th = R s || R p Rs + Rp i Rth Vth + − Cs The Thevenin equivalent is an RC circuit. Since Rs 1 1 v th = v i ⎯ ⎯→ = 10 10 R s + R p Rs = 1 6 2 R p = = MΩ 9 9 3 Also, τ = R th C s = 15 µs 6 (2 3) where R th = R p || R s = = 0.6 MΩ 6+2 3 15 × 10 -6 τ Cs = = 25 pF = R th 0.6 × 10 6 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 91. The circuit in Fig. 7.150 is used by a biology student to study “frog kick.” She noticed that the frog kicked a little when the switch was closed but kicked violently for 5 s when the switch was opened. Model the frog as a resistor and calculate its resistance. Assume that it takes 10 mA for the frog to kick violently. Figure 7.150 For Prob. 7.91. Chapter 7, Solution 91. 12 = 240 mA , i(∞) = 0 50 i( t ) = i(∞) + [ i(0) − i(∞)] e - t τ i( t ) = 240 e - t τ i o (0) = L 2 = R R i( t 0 ) = 10 = 240 e - t 0 τ= τ e t 0 τ = 24 ⎯ ⎯→ t 0 = τ ln (24) t0 5 2 τ= = = 1.573 = ln (24) ln (24) R 2 = 1.271 Ω R= 1.573 PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission. Chapter 7, Problem 92. To move a spot of a cathode-ray tube across the screen requires a linear increase in the voltage across the deflection plates, as shown in Fig. 7.151. Given that the capacitance of the plates is 4 nF, sketch the current flowing through the plates. Figure 7.151 For Prob. 7.92. Chapter 7, Solution 92. ⎧ 10 ⎪ 10 -3 dv = 4 × 10 -9 ⋅ ⎨ 2 ×- 10 i=C dt ⎪ ⎩ 5 × 10 -6 0 < t < tR tR < t < tD ⎧ 20 µA 0 < t < 2 ms i( t ) = ⎨ ⎩- 8 mA 2 ms < t < 2 ms + 5 µs which is sketched below. 5 µs 20 µA t 2 ms -8 mA (not to scale) PROPRIETARY MATERIAL. © 2007 The McGraw-Hill Companies, Inc. All rights reserved. No part of this Manual may be displayed, reproduced or distributed in any form or by any means, without the prior written permission of the publisher, or used beyond the limited distribution to teachers and educators permitted by McGraw-Hill for their individual course preparation. If you are a student using this Manual, you are using it without permission.