# FAQ: How Many Ways Can 5 Basketball Players Be Listed In Order In A Program?

Contents

- 1 How many ways can 5 basketball players be listed?
- 2 How many ways can basketball team of 5 players be chosen from 6 players?
- 3 How many ways can a team of 5 basketball players be selected from 12 people?
- 4 How many ways can a coach select 5 players from a team of 8?
- 5 How many ways can 4 persons be arranged in a straight line?
- 6 How many ways can you split 10 players into two teams of 5 players each?
- 7 How many ways can 6 people be divided into two groups?
- 8 How many different ways are there to select 4 different players from 10 players?
- 9 How many different teams of 4 students could be chosen from the 15 students?
- 10 How many ways can a committee of 5 be chosen from 10?
- 11 How do you solve permutations?
- 12 How many ways can 8 students sit around a circular table?
- 13 How many ways can at least two team members?

## How many ways can 5 basketball players be listed?

= 126. Your final answer is 126 ways. In how many ways can 5 basketball players be chosen from a group of 9 players?

## How many ways can basketball team of 5 players be chosen from 6 players?

The number of ways of selecting a team of five is 10 5 = 252.

## How many ways can a team of 5 basketball players be selected from 12 people?

There are 12 people on a basketball team, and the coach needs to choose 5 to put into a game. a. How many different possible ways can the coach choose a team of 5 players? 12C2 = 792 ways the coach can choose a team of 5.

## How many ways can a coach select 5 players from a team of 8?

First notice that 8 choose 5 is the same as 8 choose 3 since choosing five players to be on the court is equivalent to choosing 3 players to sit on the bench. I’m going to work with 8 choose 3 since it is easier. 6 ways. = 8!/[3!

## How many ways can 4 persons be arranged in a straight line?

A group of 4 people are standing in a straight line. In how many different ways can these people be standing on the line? The answer is 24.

## How many ways can you split 10 players into two teams of 5 players each?

There are (105)=10×9×8×7×65×4×3×2×1=252 ways of chosing the starting five. The number of ways of dividing the squad into two teams of five is 2522= 126.

## How many ways can 6 people be divided into two groups?

2 unequal groups, if there must be at least one person in each group? So, to choose the first group I have 6 possibilities of which I am choosing 3. For the second group, I have 3 remaining people of which 3 must be chosen -> hence 6C3×3C3= 20.

## How many different ways are there to select 4 different players from 10 players?

Explanation: there are 4 different ways are there to select 4 different players from 10 players on a team to play to play four tennis matches.

## How many different teams of 4 students could be chosen from the 15 students?

How many different committees of 4 students can be chosen from a group of 15? Answer: There are possible combinations of 4 students from a set of 15. There are 1365 different committees.

## How many ways can a committee of 5 be chosen from 10?

5! Therefore, the number of ways of selecting a committee of 5 members from a group of 10 persons is 252.

## How do you solve permutations?

To calculate the number of permutations, take the number of possibilities for each event and then multiply that number by itself X times, where X equals the number of events in the sequence. For example, with four-digit PINs, each digit can range from 0 to 9, giving us 10 possibilities for each digit.

## How many ways can 8 students sit around a circular table?

Therefore, 8 persons can be arranged around a circular table in 5040 ways.

## How many ways can at least two team members?

Answer

- Answer: 120.
- Step-by-step explanation:
- Then, the number if ways to select at least two team members out of 7 members in a group:-
- Therefore, (1) becomes.
- Hence, the number if ways to select at least two team members out of 7 members in a group =120.