``````How many ways are there to choose from the set {1, 2, . . . , 100} three distinct
numbers so that their sum is even?
``````

first of all sum of three numbers is even if only if

``````1.all number is even
2.two of them is odd and one is even
``````

i know that

``````(n)   =  n!/(k!*(n-k)!
(k)
``````

and can anybody help me to solve this problem

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## closed as off topic by Nick Presta, Alan, Neil Butterworth, Jim Lewis, Michael PetrottaJun 13 '10 at 16:40

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What have you tried so far? How is this related to programming specifically? This also sounds like a classic example of discrete mathematics homework... – Nick Presta Jun 13 '10 at 7:34
This looks like homework again... – Ronald Wildenberg Jun 13 '10 at 7:35
You have two problems to solve here: How many 3-even numbers combinations are in 1-100, and how many 2-odd,1even combinations in 1-100. Sum the answers of each, and you will have your final answer. – Alan Jun 13 '10 at 7:40
Yet again, this is not a maths Q&A site. – anon Jun 13 '10 at 7:40
Take a look at: mathoverflow.net – Ohad Schneider Jun 13 '10 at 8:16

``````(50 choose 3) + (50 choose 2) * (50 choose 1)