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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Difficult Laplace inverse transform

Let $$F(s)=-\frac{1}{s}+\arctan(s+2),\ \ \mathrm{with\ } \ \Re (s)>0$$ I want to compute the inverse Laplace transform. attempt: I need to find $f$ such that $L(f)(s)=F(s)$, i.e., $$\int_0^\infty e^{-ts}f(t)\ dt = -\frac{1}{s}+\arctan(s+2) $$ but…
apa
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What is the inverse Laplace transform of $\text{erfi}(\sqrt{s}\cdot x)$?

The inverse of function $\text{erf}(\sqrt{s}\cdot x)$ is relatively easy to obtain: $$\mathcal{L}_s^{-1}\left[\text{erf}\left(\sqrt{s}\cdot x\right)\right](t)=\delta (t)-\frac{|x| \cdot \theta \left(t-x^2\right)}{\pi t \sqrt{t-x^2}}$$ But the…
gpmath
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How to obtain inverse Laplace transformation of the following function?

I would like to obtain inverse Laplace transform of a function that includes $(\sqrt{s})$ given inverse Laplace transform of $g(s)$ is obtainable. $$\mathscr{L}^{-1}\{\frac{g(\sqrt{s})}{s}\}$$
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Can you find the Inverse Laplace for this Voltage- Angular Displacement function (seen in the picture down Below)?

Can you find the Inverse Laplace for this function (seen in the picture down Below) Additionally show how to do this on Matlab. I used Matlab and got the answer below, which I think is wrong, but I think the solution has a dirac delta function…
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How to find the inverse Laplace transform of this expression?

While solving an ODE using the Laplace transform, I ran into the following problem: $$f(t) = \mathcal L^{-1}\Bigg( {se^{cs} \over (e^s+e^{-s})(k-s)^2(k+s)^2}\Bigg) \tag 1$$ where $c$ and $k$ are constants. I can't seem to solve this because of the…
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Combined Use of S-Shifting and T-Shifting in Laplace Inverse Transform

Please see here to see question & my solution Here are question & solutions I tried. How should one approach problems where both s-shifting and t-shifting are required? Is there a specific method or sequence that is recommended? I have attempted to…
Handon
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Inverse Laplace Transform of $\dfrac{1}{s^a+b}$

I could not find on tables, but trying some values I think that is something with $ ERFC$ functions. I am seeking for a general formula to the inverse Laplace transform of $\dfrac{1}{s^a+b},$ where $a$ and $b$ are positive. Someone know this…
Quiet_waters
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Inverse Laplace of $p_1\cdot p_2/[(x+p_1)(x+p_2)]$

I can't find the inverse Laplace of : $$\frac{p_1p_2}{(x+p_1)(x+p_2)}$$ I remove first $p_1,p_2$ and try to $$\mathscr{L}^{-1}\frac{1}{(x+p_1)(x+p_2)}$$ $$\frac{1}{(x+p_1)(x+p_2)}= \frac{A}{(x+p_1)} + \frac{B}{(x+p_2)}$$ $$1 = A(x+p_2) +…
Dovendyr
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Inverse Laplace transform of $e^{-\sqrt{s+{1\over s}}}$

I am struggling on solving a PDE group by Laplace transform method. I could not find similar inverse equations to the question I listed. I would appreciate if you could give me some suggestions.
Han
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physical significance of dirac in inverse laplace

i was working through this old electronics SE question. Initial conditions have the capacitor voltage and inductor current both zero. Using Laplace we can find the voltage across the inductor, ${30s/(s+5)}$, which i then take the inverse Laplace…
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Inverse Laplace transorm of $\sqrt s/(s^2+1)$

Can anyone calculate inverse Laplace of $$F(s) = \frac{\sqrt{s}}{{s^2+1}} $$ ?
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How to obtain inverse Laplace transformation for the following function

During solving convection-diffusion equation using Laplace transformation, I obtained the following as a part of the solution in Laplace time-domain. I wonder if it can be transformed into the real-time domain. $$\mathcal{L}^{-1}\left\{\frac1{s}\…
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How can I obtain inverse Laplace transformation of the following complementary error function

I have obtained this expression in a solution (in Laplace time domain). I wonder if it can be inverse transformed to real-time domain without using numerical methods. $$ erfc(a+b\sqrt{ z})\exp(c\sqrt{ z})$$
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Compute inverse Laplace transform

Compute the inverse Laplace transform of $$\frac{3s +1}{{s^{3}}+{4s^{2}}+{(k-3)}}$$ Already tried with partial fraction expansion, without success.
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Problem with simple inverse Laplace transform

I have the function: $$F(s) = \frac{s^4+3s^3+2s^2+4s+4}{(s+3)(s^2+1)}$$ and I have to make inverse Laplace. I tried to collect $s^3$ from the first and second element of the numerator in order to obtain: $$\frac{2s^2+4s+4}{(s+3)(s^2+1)} +…
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