Binomial coefficient: Difference between revisions

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(New page: The '''binomial coefficient''' is part of the Combinatoric. The ''binomial coeffizient'' represent the the choose of ''k'' elements out of ''n'' elements. The ''binomial coeffizient'' ...)
 
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The '''binomial coefficient''' is part of the [[Combinatoric]]. The ''binomial coeffizient'' represent the the choose of ''k'' elements out of ''n'' elements. The ''binomial coeffizient'' is written as <math>{n \choose k}</math>
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The '''binomial coefficient''' is a part of [[combinatorics]]. The binomial coefficient represent the number of possible choices of ''k'' elements out of ''n'' labelled elements (with the order of the ''k'' elements being irrelevant): that is, the number of [[subset]]s of size ''k'' in a set of size ''n''.  The binomial coefficients are written as <math>\tbinom{n}{k}</math>; they are named for their role in the expansion of the [[Binomial theorem|binomial]] expression (''x''+''y'')<sup>''n''</sup>.


== Definition ==
== Definition ==
*<math>{n \choose k} = \frac{n\cdot n-1\cdot n-2 \cdots n-k+1}{1\cdot 2\cdot 3\cdots k}</math>
:<math>{n \choose k} = \frac{n\cdot (n-1)\cdot (n-2) \cdots (n-k+1)}{1\cdot 2\cdot 3\cdots k} = \frac{n!}{k!\cdot (n-k)!}\quad\mathrm{for}\ n \ge k \ge 0</math>
:Example: <math>{8 \choose 3} = \frac{8\cdot 7\cdot 6}{1\cdot 2\cdot 3} = 56</math>
 
*<math>{n \choose k} = \frac{n!}{k!\cdot (n-k!}</math> for <math>n \ge k \ge 0</math>
=== Example ===
*<math>{n \choose k} = {n \choose n-k}</math>
:<math>{8 \choose 3} = \frac{8\cdot 7\cdot 6}{1\cdot 2\cdot 3} = 56</math>
*<math>{n \choose n} = {n \choose 0} = 1</math> for <math>n \ge 0</math>
 
*<math>{n \choose 1} = n</math> for <math>n \ge 1</math>
== Formulae involving binomial coefficients ==
*<math>{n \choose k} = {n-1 \choose k} + {n-1 \choose k-1}</math>
Specifying a [[subset]] of size ''k'' is equivalent to specifying its [[complement]], a subset of size ''n''-''k'' and vice versa.  Hence
*<math>{n \choose k} = 0</math> if <math>k > n\ </math> or <math>k\ < 0</math>
:<math>{n \choose k} = {n \choose n-k}</math>
:Examples:
 
**<math>k > n\ </math>:<math>{n \choose k} = \frac{n\cdot n-1\cdot n-2 \cdots n-n \cdots n-k+1}{1\cdot 2\cdot 3\cdots k}</math> = <math>{n \choose k} = \frac{0}{1\cdot 2\cdot 3\cdots k} = 0</math>
There is just one way to choose ''n'' elements out of ''n'' ("all of them") and correspondingly just one way to choose zero element ("none of them").
**<math>k\ < 0</math>: <math>{n \choose n-k} = {n \choose k}</math>
:<math>{n \choose n} = {n \choose 0} = 1\quad\mathrm{for}\ n \ge 0</math>
::<math>n-k > n => {n \choose n-k} = 0</math>
 
The number of [[singleton]]s (single-element sets) is ''n''.
:<math>{n \choose 1} = n\quad\mathrm{for}\ n \ge 1</math>
 
The subset of size ''k'' out of ''n'' things may be split into those which do not contain the element ''n'', which correspond to subset of ''n''-1 of size ''k'', and those which do contain the element ''n''.  The latter are uniquely specified by the remaining ''k''-1 element which are drawn from the other ''n''-1.
:<math>{n \choose k} = {n-1 \choose k} + {n-1 \choose k-1}</math>
 
There are no subsets of negative size or of size greater than ''n''.
:<math>{n \choose k} = 0\quad\mathrm{if}\ k > n\ \mathrm{or}\ k\ < 0</math>
 
=== Examples ===
:<math>k > n\ \mathrm{:}\ {n \choose k} = \frac{n\cdot (n-1)\cdot (n-2) \cdots (n-n) \cdots (n-k+1)}{1\cdot 2\cdot 3\cdots k}</math> = <math>{n \choose k} = \frac{0}{1\cdot 2\cdot 3\cdots k} = 0</math>
 
:<math>k\ < 0\ \mathrm{:}\ {n \choose n-k} = {n \choose k}</math>
 
:<math>n-k > n \Rightarrow {n \choose n-k} = 0</math>


== Usage ==
== Usage ==
The ''binomial coeffizient'' is used in the Lottery. For example the german ''Lotto'' have a System, where you can choose 6 numbers from the numbers 1 to 49. The ''binomial coeffizient'' <math>{49 \choose 6} is 13.983.816, so the probability to choose the correct six numbers is 1 to 13.983.816 <math>{49 \choose 6} = 13.983.816
The binomial coefficient can be used to describe the mathematics of lottery games. For example the German ''Lotto'' has a system, where you can choose 6 numbers from the numbers 1 to 49. The binomial coefficient <math>\tbinom{49}{6}</math> is 13,983,816, so the probability to choose the correct six numbers is <math>\frac{1}{13,983,816}=\frac{1}{{49\choose 6}}</math>.


== ''binomial coefficients'' and ''prime numbers'' ==
== Binomial coefficients and prime numbers ==
Iff ''p'' is a [[prime number]] than p divides <math>{p \choose k}</math> for every <math>1<k<p\ </math>. The converse is true.
If ''p'' is a [[prime number]] then ''p'' divides <math>\tbinom{p}{k}</math> for every <math>1<k<p\ </math>. The converse is also true.[[Category:Suggestion Bot Tag]]

Latest revision as of 16:00, 18 July 2024

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The binomial coefficient is a part of combinatorics. The binomial coefficient represent the number of possible choices of k elements out of n labelled elements (with the order of the k elements being irrelevant): that is, the number of subsets of size k in a set of size n. The binomial coefficients are written as ; they are named for their role in the expansion of the binomial expression (x+y)n.

Definition

Example

Formulae involving binomial coefficients

Specifying a subset of size k is equivalent to specifying its complement, a subset of size n-k and vice versa. Hence

There is just one way to choose n elements out of n ("all of them") and correspondingly just one way to choose zero element ("none of them").

The number of singletons (single-element sets) is n.

The subset of size k out of n things may be split into those which do not contain the element n, which correspond to subset of n-1 of size k, and those which do contain the element n. The latter are uniquely specified by the remaining k-1 element which are drawn from the other n-1.

There are no subsets of negative size or of size greater than n.

Examples

=

Usage

The binomial coefficient can be used to describe the mathematics of lottery games. For example the German Lotto has a system, where you can choose 6 numbers from the numbers 1 to 49. The binomial coefficient is 13,983,816, so the probability to choose the correct six numbers is .

Binomial coefficients and prime numbers

If p is a prime number then p divides for every . The converse is also true.