I am trying to get Mathematica to approximate an integral that is a function of various parameters. I don't need it to be extremely precise -- the answer will be a fraction, and 5 digits would be nice, but I'd settle for as few as 2.

The problem is that there is a symbolic integral buried in the main integral, and I can't use NIntegrate on it since its symbolic.

```
F[x_, c_] := (1 - (1 - x)^c)^c;
a[n_, c_, x_] := F[a[n - 1, c, x], c];
a[0, c_, x_] = x;
MyIntegral[n_,c_] :=
NIntegrate[Integrate[(D[a[n,c,y],y]*y)/(1-a[n,c,x]),{y,x,1}],{x,0,1}]
```

Mathematica starts hanging when `n`

is greater than 2 and `c`

is greater than 3 or so (generally as both `n`

and `c`

get a little higher).

Are there any tricks for rewriting this expression so that it can be evaluated more easily? I've played with different `WorkingPrecision`

and `AccuracyGoal`

and `PrecisionGoal`

options on the outer `NIntegrate`

, but none of that helps the inner integral, which is where the problem is. In fact, for the higher values of `n`

and `c`

, I can't even get Mathematica to expand the inner derivative, i.e.

```
Expand[D[a[4,6,y],y]]
```

hangs.

I am using Mathematica 8 for Students.

If anyone has any tips for how I can get M. to approximate this, I would appreciate it.

`n`

and`c`

supposed to be integers? If so, consider changing the definition of`a`

to`a[n_Integer, c_Integer, x_]`

as it will prevent infinite recursions. – rcollyer Nov 9 '11 at 19:37`NIntegrate`

hanging, I think there are possibly two issues here: 1. the inner integral is taking a long time to evaluate (which you've now said), and 2.`NIntegrate`

may be re-evaluating the inner integral for every value of x. Suspecting that it was issue (2), I was wondering if evaluating the inner part symbolically first would help. But, I guess not. Back to the drawing board. – rcollyer Nov 9 '11 at 19:53`n`

and`c`

. That's a lot of nested`((((()^c)^c)^c...)^c)`

in there... – git rm Nov 9 '11 at 19:59