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relative of cosine integral
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(Example)
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For determining of the value of the improper integral $$I(a) \;:=\; \int_0^\infty\frac{\cos{ax^2}-\cos{ax}}{x}\,dx \qquad (a > 0),$$ related to the cosine integral, we think it as a function of the parametre $a$ which we denote by $t$ . Then we can take the Laplace transform (see the integration with respect to a parametre in the table of Laplace transforms): $$\mathcal{L}\{I(t)\} \;=\; \mathcal{L}\{\int_0^\infty(\cos{tx^2}-\cos{tx})\frac{dx}{x}\} \;=\; \int_0^\infty\left(\frac{s}{s^2\!+\!x^4}-\frac{s}{s^2\!+\!x^2}\right)\frac{dx}{x}$$ Splitting the fractional expressions to partial fractions and integrating give
As seen in the table of Laplace transforms, the gotten expression is the Laplace transform of $\displaystyle\frac{\gamma+\ln{t}}{2} \,=\, I(t)$ (N.B. $\displaystyle\mathcal{L}\{1\} = \frac{1}{s}$ ), and thus we have the result $$I(a) \;=\; \frac{\gamma+\ln{a}}{2}.$$
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"relative of cosine integral" is owned by pahio.
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Cross-references: expression, fractional expressions, table of Laplace transforms, Laplace transform, parametre, function, cosine integral, improper integral
There are 2 references to this entry.
This is version 5 of relative of cosine integral, born on 2009-01-17, modified 2009-01-18.
Object id is 11516, canonical name is RelativeOfCosineIntegral.
Accessed 633 times total.
Classification:
| AMS MSC: | 44A10 (Integral transforms, operational calculus :: Laplace transform) |
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Pending Errata and Addenda
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![$\displaystyle \;=\; \frac{1}{s}\!\operatornamewithlimits{\Big/}_{\!\!\!x=0}^{\,\quad\infty}\left[\frac{1}{2}\ln(s^2\!+\!x^2)-\frac{1}{4}\ln(s^2\!+\!x^4)\right]$](http://images.planetmath.org:8080/cache/objects/11516/js/img3.png "$\displaystyle \;=\; \frac{1}{s}\!\operatornamewithlimits{\Big/}_{\!\!\!x=0}^{\,\quad\infty}\left[\frac{1}{2}\ln(s^2\!+\!x^2)-\frac{1}{4}\ln(s^2\!+\!x^4)\right]$")
