# How Many Combinations Of 5 Are There?

## How many combinations of 6 numbers are there?

If you are just using the digits from 1 to 6, the answer would be 6*5*4*3*2*1 = 720, because you have 6 choices for the units digit, and then 5 choices left for the tens, and then 4 choices left for the hundreds and so on..

## How many combinations of 7 numbers are there?

127The number of combinations that are possible with 7 numbers is 127.

## How many combinations can a 16 team have?

256 possible combinationsWith 16 teams remaining, there are 256 possible combinations for Final Four matchups.

## How many 4 letter combinations are there?

256reto wrote: How many different 4 letter combinations can be created from the letters A,B,C, and D? This is a case of number of arrangements possible with repetition. Thus you have 4 options each for the 1st,2nd,3rd and 4th letter giving you a total of 4*4*4*4 = 256 number of possible combinations.

## How many possible combinations are there?

The number of combinations of n distinct objects, taken r at a time is: Cr = n! / r! (n – r)! Thus, 27,405 different groupings of 4 players are possible.

## How many combinations of 4 colors are there?

If permutations is intended, the answer is 4!/0! =24. Combinations of 4 colors 1 at a time = 4!/(3!)( 1!)

## How many combinations of 5 numbers are there?

Assuming no five-digit number can begin with zero, there are 9 possible choices for the first digit. Then there are 10 possible choices for each of the remaining four digits. Therefore, you have 9 x 10 x 10 x 10 x 10 combinations, or 9 x 10^4, which is 90,000 different combinations.

## What is nPr formula?

nPr(n, r) The number of possibilities for choosing an ordered set of r objects (a permutation) from a total of n objects. Definition: nPr(n,r) = n! / (n-r)! nCr(n, r)

## How do you calculate possible combinations?

Combinations Formula. Looking at the equation to calculate combinations, you can see that factorials are used throughout the formula. Remember, the formula to calculate combinations is nCr = n! / r! * (n – r)!, where n represents the number of items, and r represents the number of items being chosen at a time.

## How many combinations of 6 items are there?

64For any combination of items, each item is either included or not included in the combo. That means each item has 2 possibilities for every combination. For 6 items, that would make the number of combinations = 2^6 = 64.

## How many combinations of 50 numbers are there?

All Possible Number Combinations For 5/1-50 Lottery Games Included with Your Order: All Possible 5/50 Number Combinations. Total Combinations – 2,118,760.

## How many combinations of 3 are there?

There are, you see, 3 x 2 x 1 = 6 possible ways of arranging the three digits. Therefore in that set of 720 possibilities, each unique combination of three digits is represented 6 times.

## How many combinations of 15 games are there?

1 Expert Answer This number can only take the values 0, 1, 2, … , 15, and each of these is different. Therefore there are 16 possible outcomes. If the order of wins and losses matters, then there are 215 possible outcomes, as each game has two possibilities and there are 15 of them.

## How many combinations of 5 colors are there?

125 possibilitiesYou can choose each color as many times as you like. You have five colors to choose from for the first room, five for the second and five for the third. This gives a total of 5×5×5 = 125 possibilities.

## How many combinations of 5 games are there?

So, 3 outcomes per match, and 5 matches means there are 3^5 combinations, or 243.

## How many ways can you make the number 25?

13Note: There are 13 different ways to make 25 cents with quarters, dimes, nickels, and pennies.

## How do you find the number of possible outcomes?

Once again, the Counting Principle requires that you take the number of choices or outcomes for two independent events and multiply them together. The product of these outcomes will give you the total number of outcomes for each event. You can use the Counting Principle to find probabilities of events.