How many words can be formed from the letters of the word Mississippi?

2! 4!. ∴ Hence the number of ways can the letters in ‘MISSISSIPPI’ be arranged is 34650.

How many different word can be formed by jumbling the letter of the word Mississippi in which no three S occur together?

No. of arrangement of the words MISSISSIPPI is =11!

How many anagrams of the word Mississippi are there with no two alphabet S’s are adjacent to each other?

The total arrangements of the letters in Mississippi having no consecutive s’s=70X105=7350. So, the answer is 7350.

How many different words can be formed by using all the letters of the word Allahabad?

(i) The given word, ‘ALLAHABAD’ contains 9 letters consisting of 4 A’s, 2 L’s, 1 H, 1 B and 1 D. Hence, the number of difference words formed by using all the leters of the given word =9!

How many different words can be formed by jumbling the letter in the word Mississippi in which the four I’s not come together?

In how many of distinct permutations of the letters in the word MISSISSIPPI do the 4 I’s not come together? 31.

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

Total number of 4 letter words formed from the letters of the word MISSISSIPPI can be computed by summing up the result of all these 5 cases. Therefore total of 176 words can be formed from the letters of the word MISSISSIPPI.

How many different words can be formed with the letters of the word mathematics?

There are 11 letters in the word MATHEMATICS, in which the letters A, M and T are repeated twice. Therefore no. of possible arrangements (words) of the letters in the word mathematics. = 11!/2!

How many different words can be formed with the letters of the word equation so that?

Hence, we can form a total 4320 different words ending and beginning with consonants with the letters of the word EQUATION.

How many different words can be formed with the letters of the word Mississippi in how many of these permutations four I’s do not come together?

Hence in 33810 distinct permutations of the letters in MISSISSIPPI the four I’s do not come together.

How many words can be formed by using all the letters of the word?

=151200. You are almost right. If a1,a2,… are the numbers of times different letters appear in your word, then the answer is n!/a1!

How many words can be formed by using all letters of word given?

Total number of words =11(3!) ×(3!) ×(2!) =554400.

How many different words can be formed with Haryana?

(i) The given word, ‘HARYANA’ consists of 7 letters, out of which there are 1 H, 3 A’s, 1 R, 1 Y and 1 N. Total number of words formed by all the letters of the given word =7! 3! =840.

How many s are there in the word Mississippi?

MISSISSIPPI in which no three ” S ” occur together No. of arrangement of the words MISSISSIPPI is = 11! 4! ⋅ 4! ⋅ 2! now arrangement of the words in which all ” S ” are together is = 8! 4! ⋅ 2! total no. of arrangements of the words in which all four ” S ” are occur…

How many possible string combinations can be formed using the word Mississippi?

In this question, we have to find the number of string combinations that can be formed using the word MISSISSIPPI. Consider this series of ‘x’ as a vacant space to fill characters. Note that there are 11 x’s which is equal to the length of word MISSISSIPPI. Step 1: We position the four SSSS’s, giving us C (11,4) possible arrangements.

How many vowels are there in the word mathematics?

The word ‘MATHEMATICS’ has 11 letters. It has the vowels ‘A’,’E’,’A’,’I’ in it and these 4 vowels must always come together. Hence these 4 vowels can be grouped and considered as a single letter.