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 5 basketball players be placed in 3 positions?

**15**.

## How many ways can a basketball team of 5 players in any position be chosen from 8 players?

How many ways can a basketball team of 5 players in any position be chosen from 8 players? A. **40,320**.

## How many ways can a basketball team of 5 players?

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

## How many ways can 5 basketball players be listed in order in a program?

Step-by-step explanation:

That would be 5! ( 5 factorial). = **120**.

## How many ways can 5 starting positions?

There are 5^5 = **3125 possible outcomes**.

## 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 a basketball team of 3 players be chosen from 8 players?

I’m going to work with 8 choose 3 since it is easier. **6 ways**. = 8!/[3!

## How many ways can you split 8 players into two teams of 4 players each?

Because the order of the teams themselves does not matter, we must divide by 4! = 24, the number of different orders we can put the four teams in, because all 24 different orders are in fact the same set of teams. So the answer is 2520/4! = **105**.

## How many ways can you generate a team of 7 from 14 players?

**3432 possible teams** of seven players each can be generated from 14 players where each team contains 7 players.

## How many ways can a team of 10 basketball players be chosen from 12 players?

In how many ways can a team of 10 basketball players be chosen from 12 players? **87**.

## 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 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.