Contents

- 1 How many different ways can the word mathematics be arranged?
- 2 How many different words can be formed of the letters of the word mathematics so that no two vowels are together?
- 3 How many ways can an 8 letter word be arranged?
- 4 How many ways can parallel be arranged?
- 5 How many 4 letter words can be formed from the letters of the word mathematics?
- 6 How many consonants are in the word mathematics?
- 7 How many 3 letter words with or without meaning can be formed?
- 8 How many ways can a 7 letter word be arranged?
- 9 How many ways can 10 letters be arranged?
- 10 How many ways can a 5 letter word be arranged?
- 11 How many ways 5 towels can be put into 4 boxes?
- 12 How many ways can the letters of the word leader be arranged?
- 13 How many ways can we arrange all the letters such that the last two letters are vowels?

## How many different ways can the word mathematics be arranged?

In 4989600 distinct ways, the letter of the word ‘ Mathematics ‘ can be written.

## How many different words can be formed of the letters of the word mathematics so that no two vowels are together?

Ie – 10,080*12= 120,960 total arrangements where the vowels are all together. How many different words can be formed with the letters of the word “mathematics”? As ‘mathematics’ contains 11 letters so we can arrange them in 11!

## How many ways can an 8 letter word be arranged?

Enter your objects (or the names of them), one per line in the box below, then click “Show me!” to see how many ways they can be arranged, and what those arrangements are. Note: 8 items have a total of 40,320 different combinations.

## How many ways can parallel be arranged?

PARALLEL has 8 letters with one letter appearing 3 times and 1 letter appearing 2 times. The letters can be arranged in 8!/(3!* 2!) = 3360 ways.

## How many 4 letter words can be formed from the letters of the word mathematics?

MTHE – is hardly a word, so i started counting actual ” words ” so obviously completely bombed the question! Bunuel wrote: jatt86 wrote: 1) how many words can be formed by taking 4 letters at a time out of the letters of the word MATHEMATICS. There are 8 distinct letters: M-A-T-H-E-I-C-S.

## How many consonants are in the word mathematics?

The fraction of the consonants in the word ‘ mathematics ‘ is 7/11. There are a total of 11 letters in the word, of which 4 (a, e, a, i) are vowels and 7 (m, t, h, m, t, c, s) are consonants.

## How many 3 letter words with or without meaning can be formed?

= 720. Hence, the no. of 3 letter words formed from the word LOGARITHMS without repetition is 720. Hence the correct option of this question is option (a).

## How many ways can a 7 letter word be arranged?

According to the probability, 7 letter word can be arranged in 5040 ways, which is 7!. Was this answer helpful?

## How many ways can 10 letters be arranged?

50400 is the number of ways to arrange 10 letters (alphabets) word “STATISTICS” by using Permutations (nPr) formula.

## How many ways can a 5 letter word be arranged?

60 is the number of ways to arrange 5 letters (alphabets) word “PEACE” by using Permutations (nPr) formula.

## How many ways 5 towels can be put into 4 boxes?

Since there are 5 letters and each letter can be posted in 4 ways. So, total number of ways in which all the five letters can be posted = 4 × 4 × 4 × 4 × 4 = 45.

## How many ways can the letters of the word leader be arranged?

In how many ways can the letters of the word ‘LEADER’ be arranged? E. 6! = 360.

## How many ways can we arrange all the letters such that the last two letters are vowels?

If the last letter also has to be a vowel, then it can be any one of the remaining 3 vowels. After we have selected the two vowels for the first and last positions, we have 6 letters left, of which 2 repeat. Thus, the number of ways to arrange these in-between letters is 6!/ 2! = 720/ 2 = 360.