Given that Fourier coefficients a 0 , a n , and b n of the waveform in Fig. 17.47. Plot the amplitude and phase spectra. Figure 17.47

Question

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Answer 1

Textbook Question

Chapter 17, Problem 3P

Given that Fourier coefficients a₀, a_n, and b_n of the waveform in Fig. 17.47. Plot the amplitude and phase spectra.

Figure 17.47

Chapter 17, Problem 3P, Given that Fourier coefficients a0, an, and bn of the waveform in Fig. 17.47. Plot the amplitude and

Expert Solution & Answer

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

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Answer 2

Textbook Question

Chapter 17, Problem 3P

Given that Fourier coefficients a₀, a_n, and b_n of the waveform in Fig. 17.47. Plot the amplitude and phase spectra.

Figure 17.47

Chapter 17, Problem 3P, Given that Fourier coefficients a0, an, and bn of the waveform in Fig. 17.47. Plot the amplitude and

Expert Solution & Answer

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

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Answer 3

Textbook Question

Chapter 17, Problem 3P

Given that Fourier coefficients a₀, a_n, and b_n of the waveform in Fig. 17.47. Plot the amplitude and phase spectra.

Figure 17.47

Chapter 17, Problem 3P, Given that Fourier coefficients a0, an, and bn of the waveform in Fig. 17.47. Plot the amplitude and

Expert Solution & Answer

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

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Answer 4

Textbook Question

Chapter 17, Problem 3P

Given that Fourier coefficients a₀, a_n, and b_n of the waveform in Fig. 17.47. Plot the amplitude and phase spectra.

Figure 17.47

Chapter 17, Problem 3P, Given that Fourier coefficients a0, an, and bn of the waveform in Fig. 17.47. Plot the amplitude and

Expert Solution & Answer

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

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Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

Answer 8

Expert Solution & Answer

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

Find the Fourier coefficients a0, an and bn of the waveform shown in Figure 17.47 and plot the amplitude and phase spectra.

Answer 12

Answer to Problem 3P

The Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)).

Answer 13

Explanation of Solution

Given data:

Refer to Figure 17.47 in the textbook.

Formula used:

Write the expression to calculate the fundamental angular frequency.

ω0=2πT (1)

Here,

T is the period of the function.

Write the expression to calculate the dc component of the function g(t).

a0=1T∫0Tg(t) dt (2)

Write the expression to calculate Fourier coefficients an and bn.

an=2T∫0Tg(t)cosnω0t dt (3)

bn=2T∫0Tg(t)sinnω0t dt (4)

Here,

n is an integer, and

ω0 is the angular frequency.

Calculation:

The given waveform is drawn as Figure 1.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 1

Refer to the Figure 1. The Fourier series function of the waveform is defined as,

f(t)={60, 0<t<1120, 1<t<20, 2<t<4

The time period of the function in Figure 1 is,

T=4

Substitute 4 for T in equation (1) to find ω0.

ω0=2π4=π2

Substitute 4 for T in equation (2) to find a0.

a0=14∫04g(t) dt=14(∫01g(t) dt+∫12g(t) dt+∫24g(t) dt)=14(∫0160 dt+∫12120 dt+∫240 dt)=14(∫0160 dt+∫12120 dt+0)

Simplify the above equation to find a0.

a0=14(60[t]01+120[t]12)=14(60[1−0]+120[2−1])=14(60(1)+120(1))=45

Substitute 4 for T and π2 for ω0 in equation (3) to find an.

an=24∫04g(t)cosn(π2)t dt=12(∫01g(t)cos(nπ2)t dt+∫12g(t)cos(nπ2)t dt+∫24g(t)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+∫24(0)cos(nπ2)t dt)=12(∫0160cos(nπ2)t dt+∫12120cos(nπ2)t dt+0)

Simplify the above equation to find an.

an=12(60[sin(nπ2)t(nπ2)]01+120[sin(nπ2)t(nπ2)]12)=12(60(2nπ)[sin(nπ2)(1)−sin(nπ2)(0)]+120(2nπ)[sin(nπ2)(2)−sin(nπ2)(1)])=12(120nπ[sin(nπ2)−sin0°]+240nπ[sinnπ−sin(nπ2)])=12(120nπ)([sin(nπ2)−0]+2[0−sin(nπ2)]) {∵sinnπ=0 sin0°=0}

Simplify the above equation to find an.

an=60nπ(sin(nπ2)−2sin(nπ2))=60nπ(−sin(nπ2))=−60nπsin(nπ2)={60nπ(−1)n+12, n=odd0, n=even

From above equation, it is clear that a2, a4, a6 and a8 is equal to zero.

For odd n,

an=60nπ(−1)n+12 (5)

Substitute 1 for n in equation (5) to find a1.

a1=60(1)π(−1)1+12=60π(−1)1=−19.08

Substitute 3 for n in equation (5) to find a3.

a3=60(3)π(−1)3+12=20π(−1)2=6.36

Substitute 5 for n in equation (5) to find a5.

a5=60(5)π(−1)5+12=12π(−1)3=−3.84

Substitute 7 for n in equation (5) to find a7.

a7=60(7)π(−1)7+12=607π(−1)4=2.76

Substitute 4 for T and π2 for ω0 in equation (4) to find bn.

bn=24∫04g(t)sinn(π2)t dt=12(∫01g(t)sin(nπ2)t dt+∫12g(t)sin(nπ2)t dt+∫24g(t)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+∫24(0)sin(nπ2)t dt)=12(∫0160sin(nπ2)t dt+∫12120sin(nπ2)t dt+0)

Simplify the above equation to find bn.

bn=12(60[−cos(nπ2)t(nπ2)]01+120[−cos(nπ2)t(nπ2)]12)=12(−60(2nπ)[cos(nπ2)(1)−cos(nπ2)(0)]−120(2nπ)[cos(nπ2)(2)−cos(nπ2)(1)])=12(−120nπ[cos(nπ2)−cos0°]−240nπ[cosnπ−cos(nπ2)])=12(−120nπ)([cos(nπ2)−1]+2[cosnπ−cos(nπ2)]) {∵cos0°=1}

Simplify the above equation to find bn.

bn=−60nπ(cos(nπ2)−1+2cosnπ−2cos(nπ2))=−60nπ(−1+2cosnπ−cos(nπ2))

bn=60nπ(1−2cosnπ+cos(nπ2)) (6)

Substitute 1 for n in equation (6) to find b1.

b1=60(1)π(1−2cos(1)π+cos((1)π2))=60π(1−2cosπ+cos(π2))=57.29

Substitute 2 for n in equation (6) to find b2.

b2=60(2)π(1−2cos(2)π+cos((2)π2))=30π(1−2cos2π+cosπ)=−19.099

Substitute 3 for n in equation (6) to find b3.

b3=60(3)π(1−2cos(3)π+cos((3)π2))=20π(1−2cos3π+cos(3π2))=19.099

Substitute 4 for n in equation (6) to find b4.

b4=60(4)π(1−2cos(4)π+cos((4)π2))=604π(1−2cos4π+cos2π)=0

Substitute 5 for n in equation (6) to find b5.

b5=60(5)π(1−2cos(5)π+cos((5)π2))=12π(1−2cos5π+cos(5π2))=11.459

Substitute 6 for n in equation (6) to find b6.

b6=60(6)π(1−2cos(6)π+cos((6)π2))=10π(1−2cos6π+cos3π)=−6.366

Substitute 7 for n in equation (6) to find b7.

b7=60(7)π(1−2cos(7)π+cos((7)π2))=607π(1−2cos7π+cos(7π2))=8.185

Substitute 8 for n in equation (6) to find b8.

b8=60(8)π(1−2cos(8)π+cos((8)π2))=608π(1−2cos8π+cos4π)=0

Write the expression to calculate the amplitude spectra of the signal.

An=an2+bn2 (7)

Substitute 1 for n in equation (7) to find A1.

A1=a12+b12

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find A1.

A1=(−19.08)2+(57.29)2=60.38

Substitute 2 for n in equation (7) to find A2.

A2=a22+b22

Substitute 0 for a2 and −19.099 for b2 in above equation to find A2.

A2=(0)2+(−19.099)2=(19.099)2=19.099

Substitute 3 for n in equation (7) to find A3.

A3=a32+b32

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find A3.

A3=(6.36)2+(19.099)2=20.13

Substitute 4 for n in equation (7) to find A4.

A4=a42+b42

Substitute 0 for a4 and 0 for b4 in above equation to find A4.

A4=(0)2+(0)2=0

Substitute 5 for n in equation (7) to find A5.

A5=a52+b52

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find A5.

A5=(−3.84)2+(11.459)2=12.08

Substitute 6 for n in equation (7) to find A6.

A6=a62+b62

Substitute 0 for a6 and −6.366 for b6 in above equation to find A6.

A6=(0)2+(−6.366)2=6.366

Substitute 7 for n in equation (7) to find A7.

A7=a72+b72

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find A7.

A7=(2.76)2+(8.185)2=8.63

Substitute 8 for n in equation (7) to find A8.

A8=a82+b82

Substitute 0 for a8 and 0 for b8 in above equation to find A8.

A8=(0)2+(0)2=0

From above calculations, the amplitude spectrum of the waveform in Figure 1 is drawn as Figure 2.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 2

Write the expression to calculate the phase spectra of the signal.

ϕn=−tan−1(bnan) (8)

Substitute 1 for n in equation (8) to find ϕ1.

ϕ1=−tan−1(b1a1)

Substitute −19.08 for a1 and 57.29 for b1 in above equation to find ϕ1.

ϕ1=−tan−1(57.29−19.08)=1.25°

Substitute 2 for n in equation (8) to find ϕ2.

ϕ2=−tan−1(b2a2)

Substitute 0 for a2 and −19.099 for b2 in above equation to find ϕ2.

ϕ2=−tan−1(−19.0990)=−tan−1(∞)=−90°

Substitute 3 for n in equation (8) to find ϕ3.

ϕ3=−tan−1(b3a3)

Substitute 6.36 for a3 and 19.099 for b3 in above equation to find ϕ3.

ϕ3=−tan−1(19.0996.36)=−1.25°

Substitute 4 for n in equation (8) to find ϕ4.

ϕ4=−tan−1(b4a4)

Substitute 0 for a4 and 0 for b4 in above equation to find ϕ4.

ϕ4=−tan−1(00)=−tan−1(∞)=−90°

Substitute 5 for n in equation (8) to find ϕ5.

ϕ5=−tan−1(b5a5)

Substitute −3.84 for a5 and 11.459 for b5 in above equation to find ϕ5.

ϕ5=−tan−1(11.459−3.84)=1.25°

Substitute 6 for n in equation (8) to find ϕ6.

ϕ6=−tan−1(b6a6)

Substitute 0 for a6 and −6.366 for b6 in above equation to find ϕ6.

ϕ6=−tan−1(−6.3660)=−tan−1(∞)=−90°

Substitute 7 for n in equation (8) to find ϕ7.

ϕ7=−tan−1(b7a7)

Substitute 2.76 for a7 and 8.185 for b7 in above equation to find ϕ7.

ϕ7=−tan−1(8.1852.76)=−1.25°

Substitute 8 for n in equation (8) to find ϕ8.

ϕ8=−tan−1(b8a8)

Substitute 0 for a8 and 0 for b8 in above equation to find ϕ8.

ϕ8=−tan−1(00)=−tan−1(∞)=−90°

From above calculations, the phase spectrum of the waveform in Figure 1 is drawn as Figure 3.

FUND.OF ELECTRIC CIRCUITS(LL)-W/CONNECT, Chapter 17, Problem 3P , additional homework tip 3

Conclusion:

Thus, the Fourier coefficients a0 is 45, an is 60nπ(−1)n+12 for odd n and bn is 60nπ(1−2cosnπ+cos(nπ2)) and the amplitude and phase spectra is plotted.

Answer 14

Ch. 17.2 - Find the Fourier series of the square wave in Fig....Ch. 17.2 - Determine the Fourier series of the sawtooth...Ch. 17.3 - Prob. 3PP Ch. 17.3 - Find the Fourier series expansion of the function...Ch. 17.3 - Prob. 5PP Ch. 17.4 - Prob. 6PP Ch. 17.4 - If the input voltage in the circuit of Fig. 17.24...Ch. 17.5 - The voltage and current at the terminals of a...Ch. 17.5 - Find the rms value of the periodic current i(t) =...Ch. 17.6 - Obtain the complex Fourier series of the function...

Given that Fourier coefficients a 0 , a n , and b n of the waveform in Fig. 17.47. Plot the amplitude and phase spectra. Figure 17.47

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