Category:Laplace Transform of Sine
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This category contains pages concerning Laplace Transform of Sine:
Let $\sin$ denote the real sine function.
Let $\laptrans f$ denote the Laplace transform of a real function $f$.
Then:
- $\laptrans {\sin at} = \dfrac a {s^2 + a^2}$
where $a \in \R_{>0}$ is constant, and $\map \Re s > 0$.
Pages in category "Laplace Transform of Sine"
The following 9 pages are in this category, out of 9 total.
L
- Laplace Transform of Sine
- Laplace Transform of Sine of t over t
- Laplace Transform of Sine of t over t/Corollary
- Laplace Transform of Sine/Also presented as
- Laplace Transform of Sine/Proof 1
- Laplace Transform of Sine/Proof 2
- Laplace Transform of Sine/Proof 3
- Laplace Transform of Sine/Proof 4
- Laplace Transform of Sine/Proof 5