Find the Inverse Fourier transform of F ( ω ) = 100 j ω ( j ω + 10 ) .

Question

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Answer 1

Question

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

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Answer 2

Question

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

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Answer 3

Question

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

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Answer 4

Question

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

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Answer 5

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Answer 6

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

Answer 7

Chapter 18, Problem 27P

(a)

To determine

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

Answer 8

(a)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given data:

F(ω)=100jω(jω+10) (1)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (1) as follows.

F(s)=100s(s+10)

Take partial fraction for the equation.

F(s)=As+B(s+10) (2)

Where

A=(s)F(s)|s=0

Substitute 100s(s+10) for F(s) as follows.

A=(s)[100s(s+10)]s=0=[100(s+10)]s=0=[10010]=10

Similarly,

B=(s+10)F(s)|s=−10

Substitute 100s(s+10) for F(s) as follows.

B=(s+10)[100s(s+10)]s=−10=[100s]s=−10=[100−10]=−10

Substitute 10 for A and −10 for B in equation (2) as follows.

F(s)=10s+−10(s+10)

Substitute jω for s as follows.

F(ω)=10jω−10(jω+10)

Apply inverse Fourier transform on both sides of equation.

F−1[F(ω)]=F−1[10jω−10(jω+10)]f(t)=F−1[10jω]−F−1[10(jω+10)]f(t)=5F−1[2jω]−10F−1[1jω+10]f(t)=5sgn(t)−10e−10tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[2jω]=sgn(t)}

Conclusion:

Thus, the Inverse Fourier transform of F(ω)=100jω(jω+10) is 5sgn(t)−10e−10tu(t)_.

Answer 13

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

Answer 14

(b)

To determine

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

Answer 15

(b)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given data:

G(ω)=10jω(−jω+2)(jω+3) (3)

Calculation:

Consider s=jω to reduce complex algebra.

Substitute s for jω in equation (3) as follows.

G(s)=10s(2−s)(3+s)

Take partial fraction for the equation.

G(s)=A(2−s)+B(3+s) (4)

Where

A=(2−s)G(s)|s=2

Substitute 10s(2−s)(3+s) for G(s) as follows.

A=(2−s)[10s(2−s)(3+s)]s=2=[10s(3+s)]s=2=205=4

Similarly,

B=(3+s)G(s)|s=−3

Substitute 10s(2−s)(3+s) for G(s) as follows.

B=(3+s)[10s(2−s)(3+s)]s=−3=[10s2−s]s=−3=−305=−6

Substitute 4 for A and −6 for B in equation (4) as follows.

G(s)=4(2−s)+−6(3+s)

Substitute jω for s as follows.

G(ω)=4(2−jω)−6(3+jω)

Apply inverse Fourier transform on both sides of equation.

F−1[G(ω)]=F−1[4(2−jω)−6(3+jω)]g(t)=F−1[4(2−jω)]−F−1[6(3+jω)]g(t)=4F−1[12−jω]−6F−1[13+jω]f(t)=4e2tu(−t)−6e−3tu(t) {∵F−1[1a+jω]=e−atu(t)∵F−1[1a−jω]=eatu(−t)}

Conclusion:

Thus, the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3) is 4e2tu(−t)−6e−3tu(t)_.

Answer 20

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Answer 21

(c)

To determine

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

Answer 22

(c)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Answer 23

(c)

Expert Solution

Answer 24

(c)

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Given data:

H(ω)=60−ω2+j40ω+1300 (5)

Calculation:

Modify equation (5) as follows.

H(ω)=60(jω)2+j40ω+1300=60(jω+20)2+900=2(60(jω+20)2+302)

Apply inverse transform on both sides of the equation.

F−1[H(ω)]=2F−1[30(jω+20)2+302]=2e−20tsin(30t)u(t) {∵F−1[ωo(a+jω)2+ωo2]=e−atsinωotu(t)}

Conclusion:

Thus, the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300 is 2e−20tsin(30t)u(t)_

Answer 27

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Answer 28

(d)

To determine

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

Answer 29

(d)

Expert Solution

Answer to Problem 27P

The Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Answer 30

(d)

Expert Solution

Answer 31

(d)

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

Given data:

Y(ω)=δ(ω)(jω+1)(jω+2).

Formula used:

Consider the general form of inverse Fourier transform of F(ω) is represented as f(t).

f(t)=12π∫−∞∞F(ω)ejωt dω (6)

Calculation:

Modify equation (6) as follows.

F−1[Y(ω)]=12π∫−∞∞Y(ω)ejωt dω

Substitute δ(ω)(jω+1)(jω+2) for Y(ω) as follows.

F−1[Y(ω)]=12π∫−∞∞δ(ω)(jω+1)(jω+2) ejωt dωy(t)=12π(12)y(t)=14π

Conclusion:

Thus, the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2) is 14π_.

Answer 34

Ch. 18.2 - Prob. 1PP Ch. 18.2 - Prob. 2PP Ch. 18.2 - Prob. 3PP Ch. 18.3 - Prob. 5PP Ch. 18.3 - Prob. 6PP Ch. 18.4 - Prob. 7PP Ch. 18.4 - Prob. 8PP Ch. 18.5 - (a) Calculate the total energy absorbed by a 1-...Ch. 18.5 - Prob. 10PP Ch. 18.8 - If a 2-MHz carrier is modulated by a 4-kHz...

Find the Inverse Fourier transform of F ( ω ) = 100 j ω ( j ω + 10 ) .

Concept explainers

Find the Inverse Fourier transform of F(ω)=100jω(jω+10).

Answer to Problem 27P

Explanation of Solution

Find the Inverse Fourier transform of G(ω)=10jω(−jω+2)(jω+3).

Answer to Problem 27P

Explanation of Solution

Find the Inverse Fourier transform of H(ω)=60−ω2+j40ω+1300.

Answer to Problem 27P

Explanation of Solution

Find the Inverse Fourier transform of Y(ω)=δ(ω)(jω+1)(jω+2).

Answer to Problem 27P

Explanation of Solution

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