Question:
Let \( X(\omega) \) be the Fourier transform of the signal \( x(t) = e^{-4t \cos(t), -\inftyLt;tLt;\infty \). The value of the derivative of \( X(\omega) \) at \( \omega = 0 \) is \_\_\_\_\_ (rounded off to 1 decimal place).}
Let \( X(\omega) \) be the Fourier transform of the signal \( x(t) = e^{-4t \cos(t), -\inftyLt;tLt;\infty \). The value of the derivative of \( X(\omega) \) at \( \omega = 0 \) is \_\_\_\_\_ (rounded off to 1 decimal place).}
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The derivative of the Fourier transform at zero frequency can often simplify due to symmetry properties of the signal.
Updated On: Jan 23, 2025
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Solution and Explanation
Given:
\[
x(t) = e^{-4t} \cos(t)
\]
Step 1: Fourier transform:
\[
X(\omega) = \int_{-\infty}^{\infty} x(t) e^{-j\omega t} \, dt
\]
Step 2: Derivative of \( X(\omega) \):
\[
\frac{dX(\omega)}{d\omega} = \int_{-\infty}^{\infty} (-jt)x(t)e^{-j\omega t} \, dt
\]
At \( \omega = 0 \):
\[
\frac{dX(0)}{d\omega} = \int_{-\infty}^{\infty} (-jt)x(t) \, dt
\]
Step 3: Simplification:
Given that \( x(t) \) is an even signal, the integral evaluates to \( 0 \).
Final Answer: \( 0.0 \)
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