單位沖激偶信號 \(\delta^\prime(t)\) 的基本性質
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\(\delta^\prime(t)\)的面積為零:\(\displaystyle\int_{-\infty}^{\infty} \delta^\prime(t)dt = 0\)
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篩選特性:\(x(t)\delta^\prime(t-t_0) = x(t_0)\delta^\prime(t-t_0) - x^\prime(t_0)\delta(t-t_0)\)
推導過程:
\[\begin{aligned} \left(x(t)\delta(t-t_0)\right)^\prime &= x(t_0)\delta'(t-t_0)\\ &= x'(t) \delta(t-t_0) + x(t)\delta'(t-t_0)\\ &= x'(t_0)\delta(t-t_0) + x(t)\delta'(t-t_0)\\ x(t)\delta'(t-t_0) &= x(t_0) \delta'(t-t_0) - x'(t_0)\delta(t-t_0) \end{aligned} \] -
取樣特性:\(\displaystyle\int_{-\infty}^{+\infty}x(t)\delta^\prime(t-t_0) dt = -x^\prime(t_0)\)
注意積分區間是否包含沖激點。
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微分器:\(x(t) * \delta^\prime(t) = x^\prime(t)\),\(x(t)*\delta^\prime(t-t_0) = x^\prime(t-t_0)\)
推導過程:
\[\begin{aligned} x(t) * \delta'(t-t_0) &= \int_{-\infty}^{+\infty} x(k) \delta'\left( (t - k) -t_0 \right) dk\\ &= \int_{-\infty}^{+\infty} - x(k) \delta'\left(k-(t-t_0)\right) dk\\ &= -\int_{-\infty}^{+\infty} x(t-t_0)\delta'(k-(t-t_0)) - x'(t-t_0)\delta(k-(t-t_0)) dk\\ &= x'(t-t_0) \end{aligned} \]注意:卷積運算 \(f(t)*g(t) = \int_{-\infty}^{\infty}f(k) g(t-k)\),若 \(g(t)=h(t-t_0)\),則\(g(t-k)=h(t-k-t_0)\),所以 \(f(t)*h(t-t_0) = \int_{-\infty}^{\infty}f(k) h((t-k)-t_0)\)。
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展縮特性:\(\delta^\prime(at+b)=\frac{1}{a|a|}\delta^\prime(t+\frac{b}{a})\)
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這是一個奇函數