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Well really a vague statement (to me)

What is the basic expression to calculate:

  • "The number of combinations of n things taken k at a time as an integer"

Edit: A little more clarification: "For example, the combinations of four items a,b,c,d taken three at a time are abc, abd, acd, and bcd. In other words, there are a total of four different combinations of four things "taken three at a time"."

I'm taking a non introductory C class while attempt to complete my math requirements to transfer for a CS degree. I am getting very high scores on all of my work thus far, but when higher level math comes up I really get stuck. But I digress..

The range of numbers would be 1-10 for n and k's range would be 1-4.

Below is the only reference I have received and it is way over my head.


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If that page, which is a clear and precise answer to your question, is over your head, then I'm not sure what we can do to help you. It just sounds like you need to learn a lot more math than you have. We can't teach you math here. –  David Schwartz Feb 9 '13 at 1:23
Take a look at Wikipedia.org: Binomial coefficient –  ccKep Feb 9 '13 at 1:29
You can also check out Combination. You can also ask math questions at our sister site Mathematics. –  Code-Apprentice Feb 9 '13 at 1:36
do it on paper in long hand, keep messing with it until it becomes clear and the solution hits you or you decide CS may be the wrong path (whichever comes first) –  technosaurus Feb 9 '13 at 1:45
If you want to make progress, you need to look at what exactly on that page is way over your head and start addressing that problem. Obviously, it's the page you need help with first, then you can procede to the C code. So: Where on the page are you stuck? –  phant0m Feb 9 '13 at 11:06

2 Answers 2

The basic expression is n!/(k!(n-k)!). An efficient way to calculate this is to use a 2D DP table of pascal's triangle.

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could this be written as `n(factorial)/(k(factorial(n-k)factorial) –  user1787331 Feb 9 '13 at 1:39
The exclamation mark indicates the factorial operation. e.g. n! = n*(n-1)*(n-2)*...*1. –  William Rookwood Feb 9 '13 at 1:44

The key expression on the page is:

  • nCk = n! ÷ ((n − k)! k!)

This is the simple expression for the 'number of combinations of n things taken k at a time'. The term nCk is the way mathematicians write 'the number of combinations of n things taken k at a time'. The expression on the right is a succinct, accurate and simple method of calculating the correct value. It presupposes that you know that n! is factorial n, and that 'factorial n' means each number between 1 and n multiplied together.

Be aware that n! gets very big very quickly, so the naïve algorithms will work up to about n = 12 but go much beyond that and you have to be very careful indeed.

  • 0! = 1
  • 1! = 1
  • 2! = 2
  • 3! = 6
  • 4! = 24
  • 5! = 120
  • 6! = 720
  • 7! = 5040
  • 8! = 40320
  • 9! = 362880
  • 10! = 3628800
  • 11! = 39916800
  • 12! = 479001600
  • 13! = 6227020800

Note that 13! is too big to fit into a 32-bit unsigned integer, and 21! is too big to fit into a 64-bit unsigned integer, and 35! is too big to fit into a 128-bit unsigned integer (if you can find a computer with such a type).

If you still can't cope, then you are going to face problems in your transfer; this is not very complicated mathematics.

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could this be written as n(factorial) + ((n-k)factorial k factorial) –  user1787331 Feb 9 '13 at 1:43
this is what I need to write "each number between 1 and n multiplied together" –  user1787331 Feb 9 '13 at 1:45
More likely you'd write it as factorial(n) / (factorial(n-k) * factorial(k)) in C. –  Jonathan Leffler Feb 9 '13 at 1:52
More likely you'd write it as factorial(n) / (factorial(n-k) * factorial(k)) in C. You could write the function unsigned factorial(unsigned n) { ... } which does the calculation, or simply create an array with the values and return the correct element of the array (since the range of valid values is so small). –  Jonathan Leffler Feb 9 '13 at 2:00
Thank you! This is what I needed to know. –  user1787331 Feb 9 '13 at 3:06

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