Intuitive understanding of a combinatorics formula. – math.stackexchange.com

Intuitive understanding of a combinatorics formula. – math.stackexchange.com

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The number of ways in which $m+n+p$ things can be divided into three unequal groups containing $m,n$ and $p$ things is $\dfrac{(m+n+p)!}{m!n!p!}$ I need help understanding this formula intuitively ...

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