The letters in the word ″banana″ can be arranged in one of sixty different ways, according to the problem.

Therefore, there are sixty distinct permutations of the letters in the word ″banana.″

Contents

- 1 What is the permutation of the word banana?
- 2 How many different permutations of a 6-letter word are there?
- 3 How do you calculate permutations of a word?
- 4 How many distinguishable ways can the letters in BANANA be written?
- 5 How do you determine the number of distinguishable permutations?
- 6 How many distinct 6 letters arrangement are there in word BANANA using all letters?
- 7 How many 5 letter permutations are there in the word apple?
- 8 How many distinguishable permutations are in the word engineering?
- 9 How many distinguishable permutations are in the word engineering are there?
- 10 How many distinguishable permutations are in the word mathematics?
- 11 How many distinguishable permutations are possible with all the letters of the word Mississippi?
- 12 What is the distinguishable permutation of the letter of the word Mississippi?
- 13 How many distinguishable permutations are possible with all the letters of the word ellipses?
- 14 What is distinct or distinguishable permutation?
- 15 What is the permutation of the word BANANA?
- 16 How many permutations are there of the letters of the word addresses?
- 17 How many permutations of the word Orange are there?
- 18 How many permutations can be found from the word ability?

## What is the permutation of the word banana?

There are a total of six letters in the word ″BANANA.″ The word ″banana″ has a total of three letters ″A.″ Therefore, the permutation is 6! / (3! * 2!) = (6 * 5 * 4 * 3!) / (3! * 2!) = 60. Since the total number of ‘N’s’ in the word ‘BANANA’ is 2, the answer is 60.

## How many different permutations of a 6-letter word are there?

A word that has six letters has 6! = 6 5 4 3 2 1 = 720 distinct possible combinations. Writing down all of the possible permutations is often either a highly challenging or an extremely time-consuming process. You may probably guess that writing down 720 unique ‘words’ will take a significant amount of time on its own.

## How do you calculate permutations of a word?

Simply calculating n!, where n is the number of letters in the word, is all that is required to determine the number of possible permutations for that word. A word that has six letters has 6! = 6 5 4 3 2 1 = 720 distinct possible combinations.

## How many distinguishable ways can the letters in BANANA be written?

Therefore, there are 720 divided by (62), which is 720/12, which equals 60 different ways to rearrange the letters in the word ″BANANA.″

## How do you determine the number of distinguishable permutations?

Take the total number of letters in the factorial, divide it by the number of times each letter appears in the factorial, and you will get the number of identifiable permutations. In their most basic form, the tiny ns represent the relative frequency of each individual (distinguishable) letter. The number N represents the entire amount of letters.

## How many distinct 6 letters arrangement are there in word BANANA using all letters?

The most helpful response from the expert. The total number of permutations of the word ″banana″ is calculated as follows: 6!/(3! 2!) = 60 (permutation of the six letters ″B″, ″A″, ″N″, and ″A″, where 3 A’s and 2 N’s are the same).

## How many 5 letter permutations are there in the word apple?

Explanation in detail step by step: There are five letters in the word ″APPLE,″ and the first letter is an A, the second letter is a P, the third letter is a P, and the fourth letter is an L. 5! /2! Therefore, there are sixty different possible permutations for the word ″APPLE.″

## How many distinguishable permutations are in the word engineering?

=2550*n!`

## How many distinguishable permutations are in the word engineering are there?

1 correct answer The total number of permutations is 11!

## How many distinguishable permutations are in the word mathematics?

The letters A, A, T, and T may be permuted among each other in a particular permutation of the word MATHEMATICS in a total of (42)=6 unique ways.

## How many distinguishable permutations are possible with all the letters of the word Mississippi?

There we have it! There are 34,650 different ways that the word ″MISSISSIPPI″ may be written.

## What is the distinguishable permutation of the letter of the word Mississippi?

As a result, there are a total of 34650 different permutations that are feasible inside the word ″MISSISSIPPI.″

## How many distinguishable permutations are possible with all the letters of the word ellipses?

2. 18=5040 From the word ″ELLIPSES 4,″ there may be generated a total of 5,040 distinct permutations.

## What is distinct or distinguishable permutation?

According to the definition provided by their very name, distinguishable permutations are permutations (or arrangements) that can be differentiated from one another.

## What is the permutation of the word BANANA?

There are a total of six letters in the word ″banana.″ The total number of permutations that may be achieved with six letters is six!

## How many permutations are there of the letters of the word addresses?

Exercise 21a: How many different ways are there to spell the word ″addresses″ using the letters of the alphabet? 15120.

## How many permutations of the word Orange are there?

The letters in the word orange may be arranged in 720 different ways, which is the only solution to this problem.

## How many permutations can be found from the word ability?

= 2520 possible configurations for it to take.