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I have an integral with the form

Int[k_]:=Integrate[Exp[-x]xSin[x]BesselJ[0,k*x],{x,0,10}]

where BesselJ[0,kr] is the modified Bessel function of the first kind.

Now i can't get the directly answer from Mathematica..

I want to get the curve of Int[k], maybe a approximate is also acceptable..What can I do then?

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    Are you expecting a closed form result? Why do you think the function has an anti-derivative?
    – vsoftco
    Jan 17, 2015 at 16:03
  • A closed result is also acceptable.. Just I have to get the result from the function..Anyway I am not sure whether it has the direct answer or not.
    – Cici
    Jan 18, 2015 at 0:19
  • Using I[k_]=... is problematic because I is a system function for Sqrt[-1]. The convention is to use lower case initial character for user-defined functions to avoid conflict with built-in functions, i.e. int[k_]=... Jan 18, 2015 at 0:32

2 Answers 2

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Since the function doesn't have an antiderivative, your best bet is to numerically integrate. Example:

Int[k_] := NIntegrate[Exp[-x] x Sin[x] BesselJ[0, k x], {x, 0, 10}]
Plot[Int[k], {k, -5, 5}]

enter image description here

PS: I have edited your question, as you had some typos. You cannot use I as the symbol (it messes the complex i), and also when defining a function have to use := instead of =.

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  • YES..Sorry for the careless..AHA~~
    – Cici
    Jan 18, 2015 at 0:33
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Even setting the constants to unity, Mathematica cannot find a formula for the integral. I.e.

a = b = k = d = 1;

Integrate[(a r Exp[-r] - b r Sin[k (r - d)] Exp[-r]) BesselJ[0, k r], r]

The integral is returned unchanged.

Simplifying things a bit shows some progress, returning a formula.

Integrate[Sin[k (r - d)] BesselJ[0, k r], r]

But adding back in one of the exponents throws it again.

Integrate[Sin[k (r - d)] Exp[-r] BesselJ[0, k r], r]
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  • The question has been modified .. could U have a look at again?can I get a curve of I[k]?
    – Cici
    Jan 18, 2015 at 0:20

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