Google tells me that if you have 6 books to place on a shelf there are 720 ways in which they can be ordered. Say we call them a to f, we could start with say a,b,c,d,e,f. Then we could begin the rearrangement by moving along the line sequentially b,a,c,d,e,f......b,c,a,d,e,f.....b,c,d,a,e,f......b,c,d,e,a,f and finally b,c,d,e,f,a.
We might then move on to moving b along the line - so we go a,c,b,d,e,f....etc. If we had started with b at the beginning of the line in this second (b part) of the above plan, we would have replicated the b,a,c,d,e,f of the first section and our final list (sorry - this is what we are after) would be wrong. Unless the scheme we follow in constructing our list is one that precludes such repetitions our final list will contain many such, and will be way over the 720 we require.
Can anyone help me by providing such a scheme for me to follow that results in a complete list, but makes such repetitions either not occur - or is so idiot proof that they are easy to spot?
Gratitude for any help that can be provided!
