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Given N amd M how to check whether floor value of N!/M will be even value or odd value where N can go upto 10^5 and M can go upto 10^18.

Please help to check this condition in efficient way.


My attempt : I first think of breaking N!=(2^a)(some odd value) and similarly for M but as the odd value of N! can be very large so i was thinking of some better solution.

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closed as off-topic by Andrew Medico, herohuyongtao, Ken White, Borgleader, Niklas B. Mar 2 '14 at 3:57

This question appears to be off-topic. The users who voted to close gave this specific reason:

  • "This question appears to be off-topic because it lacks sufficient information to diagnose the problem. Describe your problem in more detail or include a minimal example in the question itself." – Andrew Medico, herohuyongtao, Ken White, Borgleader, Niklas B.
If this question can be reworded to fit the rules in the help center, please edit the question.

Welcome to Stack Overflow! We would love to help you, if you'll tell us what have you tried so far! Please edit your post and provide more details on what you tried and why it isn't what you're looking for. – Paweł Stawarz Mar 2 '14 at 3:39
before even/odd, I think you should check whether the number is integer or rational number – ikh Mar 2 '14 at 3:42
@ikh It is assumed both are Integers – user132263 Mar 2 '14 at 3:43
N! will always be even, unless N is 1. Because factorial is defined: Where M is less than or N, the – J. A. Streich Mar 2 '14 at 3:58
@J.A.Streich: Yes, if M <= N or M >= N!, the problem is trivial. This leaves N! > M > N, which is the underlying problem. – Niklas B. Mar 2 '14 at 4:51

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