∑
Binomial Coefficient
★★☆☆☆Middle School
📖Definition
The binomial coefficient (n k) or ⁿCₖ is the number of ways to choose k items from n items. Also coefficients in binomial expansion.
📐Formulas
\binomnk = (n!)/(k!(n-k)!)
Definition of binomial coefficient
\binomnk = \binomnn-k
Symmetry
\binomnk + \binomnk+1 = \binomn+1k+1
Pascal's identity
(x+y)ⁿ = ∑_k=0ⁿ \binomnk x^n-k y^k
Binomial theorem
✏️Examples
예제 1
How many ways to choose 3 from 10 people?
예제 2
Expand (x+y)³.
📜History
Discovered by: Blaise Pascal (1654)
Systematized with Pascal's triangle, but known since ancient times.
⚡Applications
Probability
Binomial distribution
Combinatorics
Counting
Statistics
Sample selection
🔗Related Documents
→Prerequisites
←Next Topics
↔Related
#이항계수#조합#binomial#choose