Problem in Bessel equation help .

AI Thread Summary
The discussion centers on a problem involving Bessel equations, specifically proving an integral related to Bessel functions. The user expresses difficulty in solving the problem and notes that it is not a precalculus issue, suggesting it belongs in a more advanced mathematics category. There is a request for the user to demonstrate their attempts at solving the problem to receive assistance. Ultimately, the user asks to delete their topic, indicating frustration with the lack of progress. The conversation highlights the importance of showing effort in problem-solving before seeking help.
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problem in Bessel equation help ...

Homework Statement



using the formula d\dx (x^n Jn(x))=x^n Jn-1(x)
& 2n\x Jn(x)=Jn+1(x)+Jn-1(x)

Homework Equations



prove that integral from 0 to 1 (x(1-x^2)Jdot(x) dx = 4 J1(1) - 2 Jdot (1)

The Attempt at a Solution


it's difficult one i can not answer it .
 
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First off, this is NOT a precalculus problem. Please use the Calculus & Above section for problems like this.

Second, what yave you tried? Before we can help you, you need to show a serious effort at solving it yourself.
 


sorry
please delete my topic and thank u anyway
 

Thread 'Family of lines that are at a distance of 5 from the origin'

I picked up this problem from the Schaum's series book titled "College Mathematics" by Ayres/Schmidt. It is a solved problem in the book. But what surprised me was that the solution to this problem was given in one line without any explanation. I could, therefore, not understand how the given one-line solution was reached. The one-line solution in the book says: The equation is ##x \cos{\omega} +y \sin{\omega} - 5 = 0##, ##\omega## being the parameter. From my side, the only thing I could...
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