So I guess for each number you could have assigned a number of possibilities... For the ones that cannot be the same, grab ONE of them and subtract a possibility count
The issue is when you bring in the ones that CANNOT be the same... I suppose you could say that if they're not the same then there are 10-1 possible values
Right so you CAN calculate how many based on the same restriction, this is what I had before, lets say first == second and third == fourth, 9*1*9*1 = 81 permutations
Exactly... how does this relate? The difference is, I see how you're relating this, but the difference is that there can be a bunch of restrictions here, the first index can not be equal to the 45th index, while the 45th can be equal to the second, while the second cannot be equal to the third and so on
Thanks for popping this open then... anyways, so as I said before, it's 3^4 usually as there are 3 possibilities and 4 slots, if its a 4 digit number it can be anything from 0 to 9, so 10^4
How about this @Code-Guru - normally the number of permutations for this is 4^3, if you are binding the first two together though, this will instead be 3^3. Okay, this is fine, however I need the != exceptions. How do I calculate these?
