Bessels function:prove J–n(x) = (–1)n Jn(x) Where n is positive integer.

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Relation between Jn(x) and J–n(x), Show that when n is(i) positive integer, J–n(x) = (–1)n Jn(x)

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Relation between Jn(x) and J–n(x), Show that when n is(i) positive integer, J–n(x) = (–1)n Jn(x)

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Комментарии
Автор

I agree with the change r=n+k, but the summation starts at r=0, therefore, with the change it should start with n=-k, but you started with k=0. Can you elaborate on this please

ddtg
Автор

Really helped me. Thanks for uploading.

mheich
Автор

Where is r= n+k coming from? I don't understand

owodoluvictoria