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The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) is
- a)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)
- b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)
- c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)
- d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)
Correct answer is option 'A'. Can you explain this answer?
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The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4s...
x(t) = 3cos(10t) + 4sin(10t)
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The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4s...
The Fourier transform of a continuous-time signal x(t) is defined as X(ω) = ∫[x(t)e^(-jωt)dt], where X(ω) is the Fourier transform of x(t) and ω is the angular frequency.
Given x(t) = 3cos(10t) + 4sin(10t), we can express it in terms of complex exponentials using Euler's formula: x(t) = 3/2(e^(j10t) + e^(-j10t)) + 2j/2(e^(j10t) - e^(-j10t)).
To find the Fourier transform, we substitute this expression into the Fourier transform equation:
X(ω) = ∫[(3/2(e^(j10t) + e^(-j10t)) + 2j/2(e^(j10t) - e^(-j10t))) * e^(-jωt)dt]
Next, we distribute the term e^(-jωt) into each term inside the integral:
X(ω) = ∫[(3/2(e^(j(10-ω)t) + e^(-j(10+ω)t)) + 2j/2(e^(j(10-ω)t) - e^(-j(10+ω)t)))dt]
Now, we can simplify each term inside the integral:
X(ω) = (3/2)∫[e^(j(10-ω)t) + e^(-j(10+ω)t)dt] + (2j/2)∫[e^(j(10-ω)t) - e^(-j(10+ω)t)dt]
The integral of e^(j(10-ω)t) is given by (1/(j(10-ω)) * e^(j(10-ω)t), and the integral of e^(-j(10+ω)t) is given by (1/(j(10+ω)) * e^(-j(10+ω)t).
Substituting these results back into the equation, we get:
X(ω) = (3/2)((1/(j(10-ω)) * e^(j(10-ω)t) + (1/(j(10+ω)) * e^(-j(10+ω)t)) + (2j/2)((1/(j(10-ω)) * e^(j(10-ω)t) - (1/(j(10+ω)) * e^(-j(10+ω)t))
Simplifying further, we get:
X(ω) = (3/2)((1/(j(10-ω)) - (1/(j(10+ω))) * e^(j(10-ω)t) + (2j/2)((1/(j(10-ω)) + (1/(j(10+ω))) * e^(-j(10+ω)t)
Now, we can see that the term (1/(j(10-ω)) - (1/(j(10+ω))) is equal to 5πe^(-j0.927δ(ω - 10)). Similarly, the term (1/(j(10-ω)) + (1/(j(10+ω))) is equal to 5πe^(j
Given x(t) = 3cos(10t) + 4sin(10t), we can express it in terms of complex exponentials using Euler's formula: x(t) = 3/2(e^(j10t) + e^(-j10t)) + 2j/2(e^(j10t) - e^(-j10t)).
To find the Fourier transform, we substitute this expression into the Fourier transform equation:
X(ω) = ∫[(3/2(e^(j10t) + e^(-j10t)) + 2j/2(e^(j10t) - e^(-j10t))) * e^(-jωt)dt]
Next, we distribute the term e^(-jωt) into each term inside the integral:
X(ω) = ∫[(3/2(e^(j(10-ω)t) + e^(-j(10+ω)t)) + 2j/2(e^(j(10-ω)t) - e^(-j(10+ω)t)))dt]
Now, we can simplify each term inside the integral:
X(ω) = (3/2)∫[e^(j(10-ω)t) + e^(-j(10+ω)t)dt] + (2j/2)∫[e^(j(10-ω)t) - e^(-j(10+ω)t)dt]
The integral of e^(j(10-ω)t) is given by (1/(j(10-ω)) * e^(j(10-ω)t), and the integral of e^(-j(10+ω)t) is given by (1/(j(10+ω)) * e^(-j(10+ω)t).
Substituting these results back into the equation, we get:
X(ω) = (3/2)((1/(j(10-ω)) * e^(j(10-ω)t) + (1/(j(10+ω)) * e^(-j(10+ω)t)) + (2j/2)((1/(j(10-ω)) * e^(j(10-ω)t) - (1/(j(10+ω)) * e^(-j(10+ω)t))
Simplifying further, we get:
X(ω) = (3/2)((1/(j(10-ω)) - (1/(j(10+ω))) * e^(j(10-ω)t) + (2j/2)((1/(j(10-ω)) + (1/(j(10+ω))) * e^(-j(10+ω)t)
Now, we can see that the term (1/(j(10-ω)) - (1/(j(10+ω))) is equal to 5πe^(-j0.927δ(ω - 10)). Similarly, the term (1/(j(10-ω)) + (1/(j(10+ω))) is equal to 5πe^(j
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The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer?
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The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer? for GATE 2024 is part of GATE preparation. The Question and answers have been prepared according to the GATE exam syllabus. Information about The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer? covers all topics & solutions for GATE 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer?.
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The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer?, a detailed solution for The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer? has been provided alongside types of The Fourier transform of continuous time signal X(t) = 3cos(10t) + 4sin(10t) isa)5πe−j0.927δ(ω − 10) + 5πej0.927δ(ω + 10)b)5πe−j0.927δ(ω + 10) + 5πej0.927δ(ω − 10)c)5πe−j0.927δ(ω + 10) + 5ej0.927δ(ω + 10)d)5πe−j0.927δ(ω −10) + 5πej0.927δ(ω - 10)Correct answer is option 'A'. Can you explain this answer? theory, EduRev gives you an
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