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I want to calculate the following integral with Mathematica

Integrate[(E^(2 x (-1 - Sqrt[y])) + E^(
     2 x (-1 + Sqrt[y]))) (-((
      3 E^(1/2 (t - x) (-5 - Sqrt[1 + 24 z])))/Sqrt[1 + 24 z]) + (
     3 E^(1/2 (t - x) (-5 + Sqrt[1 + 24 z])))/Sqrt[1 + 24 z]) + (E^(
     2 x (-1 - Sqrt[y])) + E^(
     2 x (-1 + Sqrt[y]))) (-((
      E^(1/2 (t - x) (-5 - Sqrt[1 + 24 z])) (-1 - Sqrt[1 + 24 z]))/(
      2 Sqrt[1 + 24 z])) + (
     E^(1/2 (t - x) (-5 + Sqrt[1 + 24 z])) (-1 + Sqrt[1 + 24 z]))/(
     2 Sqrt[1 + 24 z])), {t, 0, Infinity}, {x, 0, t} , 
 Assumptions -> {Re[Sqrt[1 + 24 z]] < 5 && Re[Sqrt[y]] < 1}]

The result we easily obtain is 5/(6 (-1 + y) (-1 + z)), but it takes so much time in Mathematica. Do you want to help me improve it more quickly?

share|improve this question
    
If this is the only integral you want to calculate, you already did it. Why do you want to improve a calculation that you don't need to do again? – Dr. belisarius May 25 '12 at 11:41
1  
I mean that it is too long to calculate the integral in Mathematica. – minhbsu May 25 '12 at 18:24
up vote 1 down vote accepted

I don't know why your input takes a long time but here is a quick way to solve the integral : leave the integration on t indefinite, then do the limits.

f[y_, z_, t_, x_] = (E^(2 x (-1 - Sqrt[y])) + E^(2 x (-1 + Sqrt[y]))) (-((3 E^(1/2 (t - x) (-5 - Sqrt[1 + 24 z])))/Sqrt[1 + 24 z]) + (3 E^(1/2 (t - x) (-5 + Sqrt[1 + 24 z])))/Sqrt[1 + 24 z]) + (E^(2 x (-1 - Sqrt[y])) + E^(2 x (-1 + Sqrt[y]))) (-((E^(1/2 (t - x) (-5 - Sqrt[1 + 24 z])) (-1 - Sqrt[1 + 24 z]))/(2 Sqrt[1 + 24 z])) + (E^(1/2 (t - x) (-5 + Sqrt[1 + 24 z])) (-1 + Sqrt[1 + 24 z]))/(2 Sqrt[1 + 24 z])); 

int[y_, z_, t_] = Simplify[Integrate[Integrate[f[y, z, t, x], {x, 0, t}], t]];

(* this is fast *)

Limit[int[y, z, t], t -> \[Infinity], Assumptions -> {Re[Sqrt[1 + 24 z]] < 5 && Re[Sqrt[y]] < 1}]

(* 0 *)

Limit[int[y, z, t], t -> 0]

(* -(5/(6 (-1+y) (-1+z))) *)
share|improve this answer
    
it is still slow, but thank you very much. – minhbsu May 26 '12 at 8:07
1  
@minhbsu It takes less than 7 seconds to calculate int[y,z,t] on my machine. What do you mean by "slow" ? – b.gatessucks May 26 '12 at 11:06

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