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# Amount of permutations problem [closed]

with given 1..n sequence how many is there permutations of this sequence, but in any permutation generated can't be : f(i)=i

for example we have

``````( 1 2 3 )
( 1 2 3 )
``````

So we can do

``````( 1 2 3 )
( 2 3 1 )
``````

and also

``````( 1 2 3 )
( 3 1 2 )
``````

so we can generate only 2 permutations using these rules. Also how to deal with such problems ?

-

## closed as off topic by Mitch Wheat, ypercubeᵀᴹ, Jeff Atwood♦May 3 '11 at 9:13

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This is a problem that belongs better to math.stackexchange.com – ypercubeᵀᴹ May 2 '11 at 23:52
we can't because f(2)=2 – Spinach May 2 '11 at 23:52
oh thanks ypercube, didn't know there's such site. Should i delete my question here ? – Spinach May 2 '11 at 23:53
Search for `permutations with 0 fixed points`. See this answer to the generalized problem: math.stackexchange.com/questions/17320/… – ypercubeᵀᴹ May 2 '11 at 23:56
also, a permutation with no fixed points is called a derangement: en.wikipedia.org/wiki/Derangement – Patrick McDonald May 3 '11 at 0:04