Binomial coefficient: Difference between revisions

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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 elements. The binomial coefficient is written as ${\displaystyle {n \choose k}}$

Definition

${\displaystyle {n \choose k}={\frac {n\cdot (n-1)\cdot (n-2)\cdots (n-k+1)}{1\cdot 2\cdot 3\cdots k}}={\frac {n!}{k!\cdot (n-k)!}}\quad \mathrm {for} \ n\geq k\geq 0}$

Example

${\displaystyle {8 \choose 3}={\frac {8\cdot 7\cdot 6}{1\cdot 2\cdot 3}}=56}$

Formulas involving binomial coefficients

${\displaystyle {n \choose k}={n \choose n-k}}$

${\displaystyle {n \choose n}={n \choose 0}=1\quad \mathrm {for} \ n\geq 0}$

${\displaystyle {n \choose 1}=n\quad \mathrm {for} \ n\geq 1}$

${\displaystyle {n \choose k}={n-1 \choose k}+{n-1 \choose k-1}}$

${\displaystyle {n \choose k}=0\quad \mathrm {if} \ k>n\ \mathrm {or} \ k\ <0}$

Examples

${\displaystyle k>n\ \mathrm {:} \ {n \choose k}={\frac {n\cdot n-1\cdot n-2\cdots n-n\cdots n-k+1}{1\cdot 2\cdot 3\cdots k}}}$ = ${\displaystyle {n \choose k}={\frac {0}{1\cdot 2\cdot 3\cdots k}}=0}$

${\displaystyle k\ <0\ \mathrm {:} \ {n \choose n-k}={n \choose k}}$

${\displaystyle n-k>n\Rightarrow {n \choose n-k}=0}$

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 ${\displaystyle {49 \choose 6}}$ is 13.983.816, so the probability to choose the correct six numbers is ${\displaystyle {\frac {1}{13.983.816}}={\frac {1}{49 \choose 6}}}$

binomial coefficients and prime numbers

Iff p is a prime number than p divides ${\displaystyle {p \choose k}}$ for every ${\displaystyle 1<k<p\ }$. The converse is true.