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# Determining All Posibilities for a Random String?

I was hoping someone with better math capabilities would assist me in figuring out the total possibilities for a string given it's length and character set.

i.e. [a-f0-9]{6}

What are the possibilities for this pattern of random characters?

-
Do you want a list? – mcandre Jun 21 '10 at 18:24
That looks like 3 bytes to me. – Peter Jaric Jun 21 '10 at 18:25
@mcandre I don't need a list, but if your able to suggest simple code that could create such a list that would be great. – Andre Jun 21 '10 at 18:29
BTW to help with any of your googling efforts I think this is a Discrete Mathematics topic called permutations: google.com/… – AaronLS Jun 21 '10 at 18:33
@AaronLS: Doesn't look like a permutation problem to me. – James K Polk Jun 22 '10 at 1:45

It is equal to the number of characters in the set raised to 6th power. In Python (3.x) interpreter:

``````>>> len("0123456789abcdef")
16
>>> 16**6
16777216
>>>
``````

EDIT 1: Why 16.7 million? Well, 000000 ... 999999 = 10^6 = 1M, 16/10 = 1.6 and

``````>>> 1.6**6
16.77721600000000
``````

* EDIT 2:* To create a list in Python, do: `print(['{0:06x}'.format(i) for i in range(16**6)])` However, this is too huge. Here is a simpler, shorter example:

``````>>> ['{0:06x}'.format(i) for i in range(100)]
['000000', '000001', '000002', '000003', '000004', '000005', '000006', '000007', '000008', '000009', '00000a', '00000b', '00000c', '00000d', '00000e', '00000f', '000010', '000011', '000012', '000013', '000014', '000015', '000016', '000017', '000018', '000019', '00001a', '00001b', '00001c', '00001d', '00001e', '00001f', '000020', '000021', '000022', '000023', '000024', '000025', '000026', '000027', '000028', '000029', '00002a', '00002b', '00002c', '00002d', '00002e', '00002f', '000030', '000031', '000032', '000033', '000034', '000035', '000036', '000037', '000038', '000039', '00003a', '00003b', '00003c', '00003d', '00003e', '00003f', '000040', '000041', '000042', '000043', '000044', '000045', '000046', '000047', '000048', '000049', '00004a', '00004b', '00004c', '00004d', '00004e', '00004f', '000050', '000051', '000052', '000053', '000054', '000055', '000056', '000057', '000058', '000059', '00005a', '00005b', '00005c', '00005d', '00005e', '00005f', '000060', '000061', '000062', '000063']
>>>
``````

EDIT 3: As a function:

``````def generateAllHex(numDigits):
assert(numDigits > 0)
ceiling = 16**numDigits
for i in range(ceiling):
formatStr = '{0:0' + str(numDigits) + 'x}'
print(formatStr.format(i))
``````

This will take a while to print at numDigits = 6. I recommend dumping this to file instead like so:

``````def generateAllHex(numDigits, fileName):
assert(numDigits > 0)
ceiling = 16**numDigits
with open(fileName, 'w') as fout:
for i in range(ceiling):
formatStr = '{0:0' + str(numDigits) + 'x}'
fout.write(formatStr.format(i))
``````
-
So 16^6? Tried that and to be honest the number seemed a little high. @Hamish Grubijan That's the number I got, but it seemed high. – Andre Jun 21 '10 at 18:27
Well, 6 digits in decimal give you 000000 through 999999 (one million). 6 digits in Hex give you up to ffffff = ~ 16.7 million – Hamish Grubijan Jun 21 '10 at 18:29
@Andre In hexadecimal FFFFFF is 16777215, and since 0000000 is also a possibility then Hamish's answer is correct at 16777216. – AaronLS Jun 21 '10 at 18:30
@Andre: just for perspective, US local phone numbers match `[0-9]{7}` and - ignoring reserved sequences - there are 10^7 of those per area code. Combinatorics mount up quickly. – msw Jun 21 '10 at 18:38

If you are just looking for the number of possibilities, the answer is `(charset.length)^(length)`. If you need to actually generate a list of the possibilities, just loop through each character, recursively generating the remainder of the string.

e.g.

``````void generate(char[] charset, int length)
{
generate("",charset,length);
}

void generate(String prefix, char[] charset, int length)
{
for(int i=0;i<charset.length;i++)
{
if(length==1)
System.out.println(prefix + charset[i]);
else
generate(prefix+i,charset,length-1);
}
}
``````
-

The number of possibilities is the size of your alphabet, to the power of the size of your string (in the general case, of course)

assuming your string size is 4: _ _ _ _ and your alphabet = { 0 , 1 }: there are 2 possibilities to put 0 or 1 in the first place, second place and so on. so it all sums up to: alphabet_size^String_size

-
I think you've got that backwards -- it's the size of the alphabet to the power of the size of the string. – Jacob Mattison Jun 21 '10 at 18:29
yep.. I did.. Edited – Protostome Jun 21 '10 at 18:34

first: 000000 last: ffffff