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Dec
24 |
awarded | Notable Question |
May
16 |
answered | Factorial running time |
May
16 |
comment |
Factorial running time
Exactly, I thought as much, which means I don't know how to solve T(n) = n*T(n-1) + n!... For that I need to know the order of magnitude of the sum of factorials. |
May
16 |
comment |
Factorial running time
Yes, I know, I wrote it there for completion's sake, it's not the issue. I just don't know how to solve the rest of it... |
May
16 |
awarded | Commentator |
May
16 |
comment |
Factorial running time
If you break down the recursive term, and ignoring the O(n^2) since it's much smaller, you get T(n) = n*(n-1)*(n-2)*...1 + n! + (n-1)! + (n-2)! + ... + 1 = 2n! + (n-1)! + (n-2)! + ... + 1. This is a sum I simply do not know how to calculate... |
May
16 |
comment |
Factorial running time
It's meant to scale badly, the assignment was to build functions that calculate determinants, and they are meant to run quite slowly. I'm just having a hard time calculating just how slowly. I apologize for the sloppy notation, I'm still new at this. |
May
16 |
comment |
Factorial running time
In class, we use Big-O notation to indicate "Something that runs on the same order of magnitude as..." It is meant as a tight asymptotic bound. |
May
16 |
comment |
Factorial running time
O(n^2) is meant here simply as Big-O notation, it can be replaced with simply "n^2" if it makes the calculation easier. The T(n-1) term is multiplied by n, though. If the equation were T(n) = n*T(n-1), the answer would surly be T(n) = n!. So how can it possibly be O(n^2) if I add more terms to the right side? |
May
16 |
comment |
Factorial running time
The function I wrote is intended to receive a list and output a list containing all of its permutations. It's used for calculating the determinant of a matrix. Basically, the function runs over every member of the list (n in total) and for each it creates a sub-list not containing that member (O(n)), calculates all the permutations of the sub-list (T(n-1)) and then goes over every such permutation, appending to each the number that was taken off ((n-1)!). All in all I get the recursive equation I wrote earlier. Determinant calculations usually take O(n!), I also saw it mentioned on Wikipedia. |
May
16 |
asked | Factorial running time |
Jan
10 |
awarded | Popular Question |
Aug
24 |
awarded | Student |
Oct
28 |
awarded | Scholar |
Oct
28 |
accepted | File manipulation won't work in Java Web Start |
Oct
28 |
accepted | NullPointerException when launching web start app |
Oct
27 |
comment |
NullPointerException when launching web start app
I looked at Mi Mee's link and in it it says to add the codebase and href to the jnlp tag. That solved the problem. I thought these attributes were no longer needed... weird. Thanks for the help everyone. |
Oct
27 |
awarded | Editor |
Oct
27 |
revised |
NullPointerException when launching web start app
added 1004 characters in body |
Oct
27 |
comment |
NullPointerException when launching web start app
If it didn't have the right format, why would it have worked on my local jar file? |