Questions tagged [inverse-laplace]

This tag is for questions regarding to "Inverse Laplace Transform" which is the transformation of a Laplace transform into a function of time.

Definition: If $~\mathcal L\{f(t)\}=F(s)~$, then $~f(t)~$ is the inverse Laplace transform of $~F(s)~$, the inverse being written as:$$f(t)=\mathcal L^{-1}\{F(s)\}$$

Properties :

  • Linearity Property

$~\mathcal{L}^{{\left.-{1}\right.}}{\left\lbrace{a}\ {G}_{{1}}{\left({s}\right)}+{b}\ {G}_{{2}}{\left({s}\right)}\right\rbrace}={a}\ {{g}_{{1}}{\left({t}\right)}}+{b}\ {{g}_{{2}}{\left({t}\right)}}~$

  • Shifting Property

If $~\mathcal{L}^{{\left.-{1}\right.}}{G}{\left({s}\right)}= g{{\left({t}\right)}}~$, then $~\mathcal{L}^{{\left.-{1}\right.}}{G}{\left({s}-{a}\right)}={e}^{{{a}{t}}} g{{\left({t}\right)}}~$

  • If $~\mathcal{L}^{{\left.-{1}\right.}}{G}{\left({s}\right)}= g{{\left({t}\right)}}~$, then $~\mathcal{L}^{{\left.-{1}\right.}}{\left\lbrace\frac{{{G}{\left({s}\right)}}}{{s}}\right\rbrace}={\int_{{0}}^{{t}}} g{{\left({t}\right)}}{\left.{d}{t}\right.}~$

  • If $~\mathcal{L}^{{\left.-{1}\right.}}{G}{\left({s}\right)}= g{{\left({t}\right)}}~$,then $~\mathcal{L}^{{\left.-{1}\right.}}{\left\lbrace{e}^{{-{a}{s}}}{G}{\left({s}\right)}\right\rbrace}={u}{\left({t}-{a}\right)}\cdot g{{\left({t}-{a}\right)}}~$

Note: The inverse can generally be obtained by using standard transforms. Often $~F(s)~$ is the ratio of two polynomials and cannot be readily identified with a standard transform. However, the use of partial fractions can often convert such an expression into simple fraction terms which can then be identified with standard transforms.

References:

369 questions
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Inverse laplace transform of $\frac{\tanh\sqrt{j\omega}}{\sqrt{j\omega}-\tanh\sqrt{j\omega}}$

Good morning, I am struggling in finding the inverse Laplace transform of the following function $\mathcal{L}_s^{-1}\biggl[\frac{\tanh\sqrt{j\omega}}{\sqrt{j\omega}-\tanh \sqrt{j\omega}}\biggl]$ For help I know the antitrasform of…
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inverse laplace transform of $\frac{1}{s+b}e^{-x\sqrt{\frac{s}{k}}}$

I am attempting to find the inverse laplace transform of $\frac{1}{s+b}e^{-x\sqrt{\frac{s}{k}}}$ The solution should be $$\frac{e^{-bt}}{2} ( {e^{x\sqrt{\frac{-b}{k}}}\…
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Inverse bilateral Laplace transform: behaviour at time t=0

For the purpose of my research on stochastic processes on graphs I need to compute the behaviour of a correlation function at time $t=0$, $C(t=0)$. I was able to compute its bilateral Laplace transform, which is (simplifying all the…
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Inverse Laplace transform of a function involving Gaussian

$F(s) = \cfrac{F_0(s+a)}{1-a F_0(s+a)} $ where $F_0(s)$ is Laplacian transform, given by: $F_0(s) = \mathcal{L}[\exp(-t^2 \beta)] $, and $\beta$ and $a$ are real numbers I am interested in inverse Laplace transform ($\mathcal{L}^{-1}[F(s)]$) of…
Ned
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How can I solve this constant value 5 using inverse Laplace?

I'm having a hard time understanding this problem. Please help me to solve this problem Evaluate $\mathcal L^{-1}\left\{5 + \frac s{s^2+9}\right\}$ https://i.ibb.co/TK3jbqK/Screenshot-2022-06-28-014247.png
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Inverse Laplace transform of s/(s + 1)

I'm trying to understand what's the inverse Laplace transform of $\frac{s}{s+1}$. I found this answer, which is quite clear and concludes that it's $δ(t)-e^{-t}$, which sounds right given the reasoning. But I also found this proof, which calculate…
Mauro
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Inverse Laplace Using Heaviside Function

I have a function for which I need to both find the inverse Laplace transformation and sketch a graph. The function is $$ F(s)=\frac{2}{s^3}-\frac{4}{s^2}e^{-s}-\frac{2}{s^3}e^{-2s} $$ I've gotten as far as…
Anmol
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How to calculate inverse Laplace transform of $F(S)=\frac{se^{-3s}}{s^2+22s+125}$

$$F(S)=\frac{se^{-3s}}{s^2+22s+125}$$ My first reflex was to attempt a decomposition into partial fractions, but I am simply left with a fraction that is just as "complicated", instead of the usual decomposition into multiple simpler fractions…
user885431
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Inverse Laplace with formula table

In my book I have to do the inverse Laplace transform of: $$\displaystyle \frac{4 + 15 s}{s(2+5s)} = \frac{15}{5} \frac{\left(s + \frac{4}{15}\right)}{s\left(s + \frac{2}{5}\right)}$$ With a partial fraction division, I can find that one fraction is…
Dovendyr
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Inverse Laplace of $\frac{K}{s(T s+1)}$

$$ y(t)=\mathcal{L}^{-1}\left[\frac{K}{s(T s+1)}\right] $$ I know it should be: $$ K\left(1-e^{-t / T}\right) $$ But I get: $$ y(t)=\mathcal{L}^{-1}\left[\frac{K}{s(T s+1)}\right] = [\text{partial fraction division}] = K \left(…
Dovendyr
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How to obtain inverse Laplace transformation of the following complex function?

I am given with the expression $$F(s)= K_{v}(\sqrt{as})I_{v}(\sqrt{bs})$$ where $I_{v}(\sqrt{as})$ is modified Bessel function of the first kind of order $v$. $K_{v}(\sqrt{as})$ is modified Bessel function of the second kind of order $v$. I want to…
Engineer
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Inverse Laplace of a transfer function for $\frac{K_{s}.P_{0}}{s.(s.T_{1}+1)} + \frac{V_{a}}{s}$

I have the following function in the Laplace domain: $$\frac{K_{s}.P_{0}}{s.(s.T_{1}+1)} + \frac{V_{a}}{s}$$ And I want to do the inverse Laplace transform.So, this is my result: $$L^{-1} (V(s))=K_s.P_0.(1- e^{(-t/T_1)})+ v_a$$ Could anyone check…
nechi
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What is the inverse Laplace transform of $\sin\left[\sqrt{\frac{r-s}{D}}x\right]$, from $s$ to $t$

I was doing a exercise and I couldn't finish it because I needed to do this inverse Laplace transform, and I got no idea how to do it. I tried convolution, I expanded the sin to complex exponential and got nothing in the end. Can anyone help me?
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Laplace inverse of given question

$$\mathcal{L}^{-1}\left(\frac{2 s - 1}{s^{4} + s^{2} + 1}\right)=~~?$$ I have done the $~\dfrac{2s}{s^4+s^2+1}~$. But what to do with the $~\dfrac{1}{s^4+s^2+1}~$ ? I don't get any idea after decomposition.
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How should I do to inverse Laplace transform without table?

Can I use integration method like fourier transform? How should I integral $$ f(p)=\frac a {p^2+a^2}$$ to inverse it to $\sin(at)$ ?