If a number is divisible by all numbers from 1 to 20 then it is divisible by the LCM of 1 to 20 so divisibility test is if(!(n%232792560)).

Further if m = pq | n then p|n, q|n so to explicitly test you only need to check for divisibility by primes. i.e if the number is not even then there is no need to check for divisibility by 4, 6, 8, 10, 12, 14, 16, 18 or 20. This reduces the test to the number being congruent to the 8th primorial = 9699690

OK, perhaps on second reading not as explicit as I should like: the expanded test looks like (by de Morgan's theorem)

```
if(!(n%19 || n%17 || n%16 || n%13 || n%11 || n%9 || n%7 || n%5))
// number is divisible by 1..20
```

`logical operators`

en.wikipedia.org/wiki/Operators_in_C_and_C%2B%2B – Jack Jul 11 '12 at 20:20