I tried to integrate the following function:

```
test[a_] :=
Module[{dnda, cg, atg, acg, alphag, betag, sig, b1, b2, dndavsg, a01,
a02, bc5},
alphag = -1.96;
betag = -0.813;
atg = 6.93*^-6;
acg = 0.000348;
cg = 2.95*^-13;
dnda = (cg/a) (a/atg)^alphag;
If[betag >= 0,
dnda = dnda (1 + betag a/atg),
dnda = dnda/(1 - betag a/atg)
];
If[a > atg, dnda = dnda Exp[((atg - a)/acg)^3]];
a01 = 3.5 10^-8;
a02 = 3 10^-7;
sig = 0.4;
b1 = 2.0496 10^-7;
b2 = 9.6005 10^-11;
bc5 = 4.;
dndavsg = (b1/a) Exp[-0.5 (Log[a/a01]/sig)^2] +
(b2/a) Exp[-0.5 (Log[a/a02]/sig)^2];
If[dndavsg >= 0.0001 dnda, dnda = dnda + bc5 dndavsg];
dnda]
```

Curiously, NIntegrate stumples upon the If in the function definition:

```
In[604]:= NIntegrate[test[x]\[Pi] x^2,{x,3.5 10^-8,6. 10^-8}]
Out[604]= 1.95204*10^-23
In[605]:= NIntegrate[Interpolation[Table[{x,test[x]\[Pi] x^2},{x,3 10^-8,10. 10^-8,.01 10^-8}]][x],{x,3.5 10^-8,6. 10^-8}]
Out[605]= 2.18089*10^-21
```

I am curious why this is the case? I am aware that Integrate has issues with If statements, but naively I would assume that NIntegrate boils down to calculating tables of numbers from the function definitions. How does this conflict with the If ?

I am aware that by replacing the last If statement in the definition by e.g. a Piecewise statement helps NIntegrate to get the correct result.

```
dnda = Piecewise[{{dnda + bc5 dndavsg, dndavsg >= 0.0001 dnda}, {dnda,dndavsg < 0.0001 dnda}}]
```

Do you know any other ways short of rewriting the function definition to coerce NIntegrate to swallow the If?