Binomial coefficient: Difference between revisions

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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>{49 \choose 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>
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>{49 \choose 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.
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.

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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

Definition

Example

Formulas involving binomial coefficients

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

Iff p is a prime number than p divides for every . The converse is true.