Obtain the exponential Fourier series for the signal in Fig. 17.54.

Question

Want to see more full solutions like this?

Answer 1

Textbook Question

Chapter 17, Problem 11P

Obtain the exponential Fourier series for the signal in Fig. 17.54.

Chapter 17, Problem 11P, Obtain the exponential Fourier series for the signal in Fig. 17.54.

Expert Solution & Answer

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))

Substitute 754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2)) for cn and π2 for ω0 in equation (2) to find y(t).

y(t)=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ejn(π2)t=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t

Conclusion:

Thus, the exponential Fourier series y(t) for the signal in Figure 17.54 is ∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Students have asked these similar questions

Determine the Complex Fourier series of the signal below:

g(x) equals {0, -5≤x<0} {3, 0<x<5} Find the expansion of the function above in a fourier series considering the period is ten.

Regarding Signals and Systems, given a signal x(t) = |cos(ωt)| for ω>0. Find the Fourier transform of x(t).

Answer 2

Textbook Question

Chapter 17, Problem 11P

Obtain the exponential Fourier series for the signal in Fig. 17.54.

Chapter 17, Problem 11P, Obtain the exponential Fourier series for the signal in Fig. 17.54.

Expert Solution & Answer

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))

Substitute 754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2)) for cn and π2 for ω0 in equation (2) to find y(t).

y(t)=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ejn(π2)t=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t

Conclusion:

Thus, the exponential Fourier series y(t) for the signal in Figure 17.54 is ∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Textbook Question

Chapter 17, Problem 11P

Obtain the exponential Fourier series for the signal in Fig. 17.54.

Chapter 17, Problem 11P, Obtain the exponential Fourier series for the signal in Fig. 17.54.

Expert Solution & Answer

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))

Substitute 754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2)) for cn and π2 for ω0 in equation (2) to find y(t).

y(t)=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ejn(π2)t=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t

Conclusion:

Thus, the exponential Fourier series y(t) for the signal in Figure 17.54 is ∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Textbook Question

Chapter 17, Problem 11P

Obtain the exponential Fourier series for the signal in Fig. 17.54.

Chapter 17, Problem 11P, Obtain the exponential Fourier series for the signal in Fig. 17.54.

Expert Solution & Answer

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))

Substitute 754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2)) for cn and π2 for ω0 in equation (2) to find y(t).

y(t)=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ejn(π2)t=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t

Conclusion:

Thus, the exponential Fourier series y(t) for the signal in Figure 17.54 is ∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

Expert Solution & Answer

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))

Substitute 754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2)) for cn and π2 for ω0 in equation (2) to find y(t).

y(t)=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ejn(π2)t=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t

Conclusion:

Thus, the exponential Fourier series y(t) for the signal in Figure 17.54 is ∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Answer 8

Expert Solution & Answer

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))

Substitute 754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2)) for cn and π2 for ω0 in equation (2) to find y(t).

y(t)=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ejn(π2)t=∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t

Conclusion:

Thus, the exponential Fourier series y(t) for the signal in Figure 17.54 is ∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

To determine

Find the exponential Fourier series for the signal in Figure 17.54.

Answer 12

Answer to Problem 11P

The exponential Fourier series y(t) for the signal in Figure 17.54 is,

∑n=−∞∞754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))ej(nπ2)t.

Answer 13

Explanation of Solution

Given data:

Refer to Figure 17.54 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 general expression to calculate exponential Fourier series of y(t).

y(t)=∑n=−∞∞cnejnω0t (2)

Here,

cn is the exponential Fourier series coefficients,

n is an integer, and

ω0 is the angular frequency.

Write the expression to calculate exponential Fourier series coefficients.

cn=1T∫0Ty(t)e−jnω0t dt (3)

Calculation:

The given waveform is drawn as Figure 1.

FUNDAMENTALS OF ELEC.CIRC.(LL) >CUSTOM<, Chapter 17, Problem 11P

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

f(t)={37.5(1+t), −1<t<037.5, 0<t<10, 1<t<3

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 and π2 for ω0 in equation (3) to find cn.

cn=14∫04y(t)e−jn(π2)t dt=14∫04y(t)e−j(nπ2)t dt=14(∫−10y(t)e−j(nπ2)t dt+∫01y(t)e−j(nπ2)t dt+∫13y(t)e−j(nπ2)t dt)=14(∫−1037.5(1+t)e−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+∫130e−j(nπ2)t dt)

Simplify the above equation to find cn.

cn=14(∫−1037.5e−j(nπ2)t dt+∫−1037.5te−j(nπ2)t dt+∫0137.5e−j(nπ2)t dt+0)=14(37.5[e−j(nπ2)t−(jnπ2)]−10+37.5∫−10te−j(nπ2)t dt+37.5[e−j(nπ2)t−(jnπ2)]01)=37.54(−2jnπ[e−j(nπ2)(0)−e−j(nπ2)(−1)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)(1)−e−j(nπ2)(0)])=37.54(−2jnπ[e0−ej(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[e−j(nπ2)−e0])

Simplify the above equation to find cn.

cn=37.54(−2jnπ[1−(cos(nπ2)+jsin(nπ2))]+∫−10te−j(nπ2)t dt−2jnπ[(cos(nπ2)−jsin(nπ2))−1]) {∵e0=1 ej(nπ2)=cos(nπ2)+jsin(nπ2) e−j(nπ2)=cos(nπ2)−jsin(nπ2)}=37.54(−2jnπ[1−cos(nπ2)−jsin(nπ2)]+∫−10te−j(nπ2)t dt−2jnπ[cos(nπ2)−jsin(nπ2)−1])=37.54(−2jnπ+2jnπcos(nπ2)+2nπsin(nπ2)+∫−10te−j(nπ2)t dt−2jnπcos(nπ2)+2nπsin(nπ2)+2jnπ)

cn=37.54(4nπsin(nπ2)+∫−10te−j(nπ2)t dt) (4)

Assume the following to reduce the equation (4).

x=∫−10te−j(nπ2)t dt (5)

Substitute the equations (5) in equation (4) to find cn.

cn=37.54(4nπsin(nπ2)+x) (6)

Consider the following integration formula.

∫abudv=[uv]ab−∫abvdu (7)

Compare the equations (5) and (7) to simplify the equation (5).

u=t dv=e−j(nπ2)t dtdu=dt v=e−j(nπ2)t−(jnπ2) v=−2jnπe−j(nπ2)t

Using the equation (7), the equation (5) can be reduced as,

x=∫−10te−j(nπ2)t dt=[t(−2jnπe−j(nπ2)t)]−10−∫−10(−2jnπe−j(nπ2)t)dt=−2jnπ[(0)e−j(nπ2)(0)−(−1)e−j(nπ2)(−1)]+2jnπ∫−10e−j(nπ2)tdt=−2jnπ[0+ej(nπ2)]+2jnπ[e−j(nπ2)t−(jnπ2)]−10

Simplify the above equation to find x.

x=−2jnπej(nπ2)−(2jnπ)2[e−j(nπ2)(0)−e−j(nπ2)(−1)]=−2jnπej(nπ2)−4j2n2π2[e0−ej(nπ2)]=(−2jnπ(cos(nπ2)+jsin(nπ2))−4(−1)n2π2[1−(cos(nπ2)+jsin(nπ2))]) {∵e0=1, j2=−1, ej(nπ2)=cos(nπ2)+jsin(nπ2)}=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2[1−cos(nπ2)−jsin(nπ2)])

Simplify the above equation to find x.

x=(−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))

Substitute (−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2)) for x in equation (6) to find cn.

cn=37.54(4nπsin(nπ2)−2jnπcos(nπ2)−2nπsin(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2nπsin(nπ2)−2jnπcos(nπ2)+4n2π2−4n2π2cos(nπ2)−4n2π2jsin(nπ2))=37.54(2n2π2)(nπsin(nπ2)−(−j)nπcos(nπ2)+2−2cos(nπ2)−2jsin(nπ2))=754n2π2(2−2cos(nπ2)−2jsin(nπ2)+jnπcos(nπ2)+nπsin(nπ2))