I'm trying to calculate Euler's number to a high degree of accuracy using BigDecimals but after a while, the numbers get so small that the JVM throws a divide-by-0 error. Any ideas on how to overcome? I find that the try-catch block is always called after exactly 34 iterations of the division, but I don't know why. The formula for Euler's number is an infinite series, so 34 iterations gets it close to the actual value of *e*, but not as accurate as I'd like it. It's not actually dividing by 0, but it's probably too small for the JVM to tell the difference.

```
BigDecimal ee = BigDecimal.ZERO;
for (int k = 0; k < 50; k++) {
int fact = factorial(k);
try {
BigDecimal trial = BigDecimal.ONE.divide(BigDecimal.valueOf(fact), 100, RoundingMode.CEILING);
} catch (Exception e) {
System.out.println("---- Div-by-0 error; Iterated " + k + " times ----");
break;
}
ee = ee.add(BigDecimal.ONE.divide(BigDecimal.valueOf(fact), 100, RoundingMode.CEILING));
}
System.out.println("\n---- Final: \t\te = " + power(ee, x));
}
```

`fact`

is going to overflow, and creating a`BigDecimal`

after that still won't have the correct value. – azurefrog Oct 16 '19 at 19:40