Teaching CSIR NET Mock Test Series Physical Sciences Mathematical Methods of Physics

यदि पूर्णांक कोटि (integer order) n के बेसल फलन को निम्नवत परिभाषित करें \(J_n(x)=\sum_{k=0}^{\infty} \frac{(-1)^k}{k !(n+k) !}\left(\frac{x}{2}\right)^{2 k+n}\) तब \(\frac{d}{d x}\left[x^{-n} J_n(x)\right]\) है

1

\(-x^{-[n+1]} J_{n+1}(x)\)

2

\(-x^{-[n+1]} J_{n-1}(x)\)

3

\(-x^{-n} J_{n-1}(x)\)

4

\(-x^{-n} J_{n+1}(x)\)

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