# Beta version

BETA TEST VERSION OF THIS ITEM

This online calculator is currently under heavy development. It may or it may NOT work correctly.

You CAN try to use it. You CAN even get the proper results.

However, please VERIFY all results on your own, as the level of completion of this item is NOT CONFIRMED.

Feel free to send any ideas and comments !

This online calculator is currently under heavy development. It may or it may NOT work correctly.

You CAN try to use it. You CAN even get the proper results.

However, please VERIFY all results on your own, as the level of completion of this item is NOT CONFIRMED.

Feel free to send any ideas and comments !

# Pool of items and desired type of results

Detected pool of items | ||

Desired results length | ||

The elements can be used more than once |

# Generated results

Pool of items | ||

Detected pool of items | ||

Elements frequency of appearance in the pool | ||

Total number of items in the pool | ||

Number of unique items in the pool | ||

Number of results | ||

Number of possible combinations | - | |

Number of results formula | Show source$-$ | |

Generated results | ||

Generation algorithm | ||

Combinations |

# Some facts

**Combination**consists in choosing**any number of elements from the pool**but**without building a new sequence**. We simple pull out selected items from the pool and... its all.- In the case of the combination the
**order of the elements does not matter**. It is only important if the given element**is in use or not**(e.g. whether a given number was drawn in the lottery). - If we have the
**n-element set**and we choose**k elements**, then the number of possible combinations is:

$C_{n}^{k} = \binom{n}{k} = \frac{n!}{k! (n - k)!}$or if we assume that the same element can be used**more than once**:

$\overline{C}_{n}^{k} = \frac{(k + n - 1)!}{k! (n - 1)!}$ - ⓘ Hint: More combinatorial items on Calculla:

- combinatorial tables - short crib with common combinatorics related
**formulas**,

- permutations generator - simple tool to create list of all possible
**permutations**(with or without repetition) based on given input pool of items,

- combinations generator - simple tool to create list of all possible
**combinations**(with or without repetition) based on given input pool of items,

- variations generator - simple tool to create list of all possible
**variations**(with or without repetition) based on given input pool of items.

- combinatorial tables - short crib with common combinatorics related

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