Difference between revisions of "Fresnel S"

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(Properties)
(Properties)
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[[Fresnel S is odd]] <br />
 
[[Fresnel S is odd]] <br />
 
[[Taylor series for Fresnel S]]<br />
 
[[Taylor series for Fresnel S]]<br />
[[Fresnel S in terms of error function]]<br />
+
[[Fresnel S in terms of erf]]<br />
 
[[Limiting value of Fresnel S]]<br />
 
[[Limiting value of Fresnel S]]<br />
  

Revision as of 17:17, 5 October 2016

The Fresnel $S$ function is defined by $$S(z)=\int_0^z \sin \left(t^2 \right) \mathrm{d}t.$$ (Note in Abramowitz&Stegun it is defined differently.)

Properties

Fresnel S is odd
Taylor series for Fresnel S
Fresnel S in terms of erf
Limiting value of Fresnel S

See Also

Fresnel C

Videos

The Fresnel Integral S(x) - How to integrate sin(x^2)

$\ast$-integral functions
Cosintegralthumb.png
Cosine integral
Coshintegralthumb.png
Cosh integral
Expintegralethumb.png
Exp integral $E_n$
Eithumb.png
Exp integral $\mathrm{Ei}$
Fresnelcthumb.png
Fresnel $C$
Fresnelsthumb.png
Fresnel $S$
Gudermannianthumb.png
Gudermannian
Inversegudermannianthumb.png
Inverse $\mathrm{gd}$
Sinintegralthumb.png
Sine integral
Lithumb.png
Log integral
Sinhintegralthumb.png
Sinh integral
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