Find the inverse Fourier transform of F 1 ( ω ) .

Question

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Answer 1

Question

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

(b)

To determine

Find the inverse Fourier transform of F2(ω).

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

(c)

To determine

Find the inverse Fourier transform of F3(ω).

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

(d)

To determine

Find the inverse Fourier transform of F4(ω).

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

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Answer 2

Question

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

(b)

To determine

Find the inverse Fourier transform of F2(ω).

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

(c)

To determine

Find the inverse Fourier transform of F3(ω).

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

(d)

To determine

Find the inverse Fourier transform of F4(ω).

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

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Answer 3

Question

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

(b)

To determine

Find the inverse Fourier transform of F2(ω).

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

(c)

To determine

Find the inverse Fourier transform of F3(ω).

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

(d)

To determine

Find the inverse Fourier transform of F4(ω).

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

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Answer 4

Question

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

(b)

To determine

Find the inverse Fourier transform of F2(ω).

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

(c)

To determine

Find the inverse Fourier transform of F3(ω).

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

(d)

To determine

Find the inverse Fourier transform of F4(ω).

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

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Answer 5

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

(b)

To determine

Find the inverse Fourier transform of F2(ω).

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

(c)

To determine

Find the inverse Fourier transform of F3(ω).

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

(d)

To determine

Find the inverse Fourier transform of F4(ω).

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

Answer 6

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

Answer 7

Chapter 18, Problem 32P

(a)

To determine

Find the inverse Fourier transform of F1(ω).

Answer 8

(a)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given data:

F1(ω)=ejω−jω+1 (1)

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

Calculation:

Modify equation (1) as follows.

F1(ω)=e−jωjω+1

Since F−1[e−jωjω+1]=e−(t−1)u(t−1).

From Reversal property,

f(−t)=F(−ω)

Therefore,

F1(ω)=ejω−jω+1

Apply inverse Fourier transform to equation (1) as follows.

F−1[F1(ω)]=F−1[ejω−jω+1]=e−(−t−1)u(−t−1)=e(t+1)u(−t−1)

Conclusion:

Thus, the inverse Fourier transform of F1(ω) is e(t+1)u(−t−1)_.

Answer 13

(b)

To determine

Find the inverse Fourier transform of F2(ω).

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Answer 14

(b)

To determine

Find the inverse Fourier transform of F2(ω).

Answer 15

(b)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given data:

F2(ω)=2e|ω| (2)

Calculation:

Since F−1[2t2+1]=2πe−|ω|.

From Reversal property,

f(−t)=F(−ω)

Therefore,

F2(ω)=2e−|ω|

Apply inverse Fourier transform to equation (2) as follows.

F−1[F2(ω)]=F−1[2e−|ω|]=2π(t2+1)

Conclusion:

Thus, the inverse Fourier transform of F2(ω) is 2π(t2+1)_.

Answer 20

(c)

To determine

Find the inverse Fourier transform of F3(ω).

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Answer 21

(c)

To determine

Find the inverse Fourier transform of F3(ω).

Answer 22

(c)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Answer 23

(c)

Expert Solution

Answer 24

(c)

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Given data:

F3(ω)=1(1+ω2)2 (3)

Calculation:

Modify equation (3) as follows.

F3(ω)=1(1+jω)2(1−jω)2

Substitute s for jω to reduce complex algebra.

F3(s)=1(1+s)2(1−s)2

Take partial fraction for the equation.

1(1+s)2(1−s)2=A(1+s)+B(1+s)2+C(1−s)+D(1−s)2 (4)

Find the partial fraction coefficients.

A=dds[(1+s)21(1+s)2(1−s)2]|s=−1=dds[1(1−s)2]|s=−1=2(1−s)3|s=−1=28

A=14

B=(1+s)21(1+s)2(1−s)2|s=−1=1(1−s)2|s=−1=14

C=dds[(1−s)21(1+s)2(1−s)2]|s=1=dds[1(1+s)2]|s=1=−2(1+s)3|s=1=−14

D=(1−s)21(1+s)2(1−s)2|s=1=1(1+s)2|s=1=14

Substitute 14 for A, 14 for B, −14 for C and 14 for D in equation (4).

1(1+s)2(1−s)2=14(1+s)+14(1+s)2−14(1−s)+14(1−s)2=14[1(1+s)+1(1+s)2−1(1−s)+1(1−s)2]

Substitute jω for s as follows.

1(1+jω)2(1−jω)2=14[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]

Apply inverse transform on both sides of equation.

F−1[1(1+jω)2(1−jω)2]=14F−1[1(1+jω)+1(1+jω)2−1(1−jω)+1(1−jω)2]f3(t)=14(e−t+te−t−et+tet)u(t)f3(t)=14(t+1)e−tu(t)+14(t−1)etu(t)

Conclusion:

Thus, the inverse Fourier transform of F3(ω) is 14(t+1)e−tu(t)+14(t−1)etu(t)_.

Answer 27

(d)

To determine

Find the inverse Fourier transform of F4(ω).

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

Answer 28

(d)

To determine

Find the inverse Fourier transform of F4(ω).

Answer 29

(d)

Expert Solution

Answer to Problem 32P

The inverse Fourier transform of F4(ω) is 12π_.

Answer 30

(d)

Expert Solution

Answer 31

(d)

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

Given data:

F4(ω)=δ(ω)1+j2ω (5)

Calculation:

Apply inverse Fourier transform to equation (5) as follows.

F−1[F4(ω)]=12π∫−∞∞δ(ω)1+j2ωejωtdt=12π(1)=12π

Conclusion:

Thus, the inverse Fourier transform of F4(ω) is 12π_.

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 1 ( ω ) .

Concept explainers

Find the inverse Fourier transform of F1(ω).

Answer to Problem 32P

Explanation of Solution

Find the inverse Fourier transform of F2(ω).

Answer to Problem 32P

Explanation of Solution

Find the inverse Fourier transform of F3(ω).

Answer to Problem 32P

Explanation of Solution

Find the inverse Fourier transform of F4(ω).

Answer to Problem 32P

Explanation of Solution

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