FUND.OF ELECTRIC CIRCUITS (LL)-W/ACCESS
FUND.OF ELECTRIC CIRCUITS (LL)-W/ACCESS
6th Edition
ISBN: 9781260405927
Author: Alexander
Publisher: MCG
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Fourier Transform
In mathematics, the Fourier transformation is a mathematical transformation that rotates responsibilities by using region or time into tasks depending on the local or temporal frequency, such as the rendering of a musical track in step with existing volu…
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Chapter 18, Problem 23P

(a)

To determine

Find the Fourier transform of f(3t).

(a)

Expert Solution
Check Mark

Answer to Problem 23P

The Fourier transform of f(3t) is 30(6jω)(15jω)_

Explanation of Solution

Given data:

F(ω)=10(2+jω)(5+jω)

Formula used:

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

F(f(t))=f(t)ejωtdt (1)

Consider the scaling property of the Fourier transform.

F[f(at)]=1|a|F(ωa)

Calculation:

Find F[f(3t)].

F[f(3t)]=1|3|10(2+jω3)(5+jω3) {F(ω)=10(2+jω)(5+jω)}=1|3|10(2jω3)(5jω3)=1310(6jω3)(15jω3)=1310×3×3(6jω)(15jω)

F[f(3t)]=30(6jω)(15jω)

Conclusion:

Thus, the Fourier transform of f(3t) is 30(6jω)(15jω)_.

(b)

To determine

Find the Fourier transform of f(2t1).

(b)

Expert Solution
Check Mark

Answer to Problem 23P

The Fourier transform of f(2t1) is 20ejω2(4+jω)(10+jω)_

Explanation of Solution

Formula used:

Consider the Time shift property of the Fourier transform.

F[f(ta)]=ejωaF(ω)

Consider the scaling property of the Fourier transform.

F[f(at)]=1|a|F(ωa)

Calculation:

Find F[f(2t1)], using scaling and time shift property

F[f(2t1)]=1|2|ejω210(2+jω2)(5+jω2) {F(ω)=10(2+jω)(5+jω)}=12ejω210(4+jω2)(10+jω2)=12ejω210×2×2(4+jω)(10+jω)=20ejω2(4+jω)(10+jω)

Conclusion:

Thus, the Fourier transform of f(2t1) is 20ejω2(4+jω)(10+jω)_.

(c)

To determine

Find the Fourier transform of f(t)cos2t.

(c)

Expert Solution
Check Mark

Answer to Problem 23P

The Fourier transform of f(t)cos2t is 5[2+j(ω+2)][5+j(ω+2)]+5[2+j(ω2)][5+j(ω2)]_.

Explanation of Solution

Formula used:

Consider the Modulation property of the Fourier transform.

F[cos(ωot)f(t)]=12[F(ω+ωo)+F(ωωo)]

Calculation:

Find F[f(t)cos2t], using modulation property.

F[f(t)cos2t]=12[10[2+j(ω+2)][5+j(ω+2)]+10[2+j(ω2)][5+j(ω2)]]{F(ω)=10(2+jω)(5+jω)}={1210[2+j(ω+2)][5+j(ω+2)]+1210[2+j(ω2)][5+j(ω2)]}=5[2+j(ω+2)][5+j(ω+2)]+5[2+j(ω2)][5+j(ω2)]

Conclusion:

Thus, the Fourier transform of f(t)cos2t is 5[2+j(ω+2)][5+j(ω+2)]+5[2+j(ω2)][5+j(ω2)]_.

(d)

To determine

Find the Fourier transform of ddtf(t).

(d)

Expert Solution
Check Mark

Answer to Problem 23P

The Fourier transform of ddtf(t) is jω(10)(2+jω)(5+jω)_.

Explanation of Solution

Formula used:

Consider the Time differentiation property of the Fourier transform.

F[dfdt]=jωF(ω)

Calculation:

Find F[ddtf(t)], using time differentiation property.

F[ddtf(t)]=jω[10(2+jω)(5+jω)] {F(ω)=10(2+jω)(5+jω)}

Conclusion:

Thus, the Fourier transform of ddtf(t) is jω(10)(2+jω)(5+jω)_.

(e)

To determine

Find the Fourier transform of tf(t)dt.

(e)

Expert Solution
Check Mark

Answer to Problem 23P

The Fourier transform of tf(t)dt is 10jω(2+jω)(5+jω)+πδ(ω)_.

Explanation of Solution

Formula used:

Consider the Time integration property of the Fourier transform.

F[tf(t)dt]=F(ω)jω+πF(0)δ(ω)

Calculation

Find F[tf(t)dt], using time integration property.

F[tf(t)dt]=[10(2+jω)(5+jω)jω+π10(2+0)(5+0)δ(ω)] {F(ω)=10(2+jω)(5+jω)}=10jω(2+jω)(5+jω)+π10(2)(5)δ(ω)=10jω(2+jω)(5+jω)+π(1010)δ(ω)=10jω(2+jω)(5+jω)+πδ(ω)

Conclusion:

Thus, the Fourier transform of tf(t)dt is 10jω(2+jω)(5+jω)+πδ(ω)_.

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Chapter 18 Solutions

FUND.OF ELECTRIC CIRCUITS (LL)-W/ACCESS

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