Difference between revisions 11845560 and 13160644 on trwiki

[[Matematik]]'te, '''Struve fonksiyonları''' <math>\mathbf{H}_\alpha(x)</math>,non-homojen ''y''(''x'') 'ın çözümü  '''Struve fonksiyonları''' 'dır      
[[Bessel diferansiyel denklemi]]:
: <math>x^2 \frac{d^2 y}{dx^2} + x \frac{dy}{dx} + (x^2 - \alpha^2)y = \frac{4{(x/2)}^{\alpha+1}}{\sqrt{\pi}\Gamma(\alpha+\frac{1}{2})}</math>

(contracted; show full)

==Dış bağlantılar==
*[http://functions.wolfram.com/Bessel-TypeFunctions/StruveH/introductions/Struves/ Struve functions] at [http://functions.wolfram.com the Wolfram functions site].

{{DEFAULTSORT:Struve Function}}
[[Category:Özel fonksiyonlar]]
[[Category:Struve ailesi]]
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[[en:Struve function]]
[[ro:Funcție Struve]]
[[ru:Функция Струве]]
[[sr:Струвеове функције]]

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