I've was studying hash based sort and i found that using prime numbers in a hash function is considered a good idea because : multiplying each character of the key by a prime number and adding the results up would produce a unique value (because primes are unique) and a prime number like 31 would produce better distribution of keys..

i would like to understand why the use of even numbers for multiplying each character is a bad idea in the context of this explanation below ( found in another forum, it sounds like a good explanation but i'm failing to grasp it). If the reasoning below is not valid if would appreciate a simpler explanation..

```
key(s)=s[0]*31(len–1)+s[1]*31(len–2)+ ... +s[len–1]
```

sample code:

```
public int hashCode( )
{
int h = hash;
if (h == 0)
{
for (int i = 0; i < chars.length; i++)
{
h = MULT*h + chars[i];
}
hash = h;
}
return h;
}
```

Suppose MULT were 26, and consider hashing a hundred-character string. How much influence does the string's first character have on the final value of

`h'? The first character's value will have been multiplied by MULT 99 times, so if the arithmetic were done in infinite precision the value would consist of some jumble of bits followed by 99 low-order zero bits -- each time you multiply by MULT you introduce another low-order zero, right? The computer's finite arithmetic just chops away all the excess high-order bits, so the first character's actual contribution to`

h' is ... precisely zero! The`h' value depends only on the rightmost 32 string characters (assuming a 32-bit int), and even then things are not wonderful: the first of those final 32 bytes influences only the leftmost bit of`

h' and has no effect on the remaining 31. Clearly, an even-valued MULT is a poor idea.

`unsigned int`

, integer overflow in C is undefined behaviour (anything could happen). – vonbrand Jan 21 '13 at 13:18