How many arrangements of the letter of word EXAMINATION be made such that vowels come together?

So, there are 18,14,400 ways in which the word ‘EXAMINATION’ can be arranged by keeping the first letter as ‘M’. Since all the vowels have to come together we are going to treat them as single letters. We treat them as EAIAIO single objects.

How many different ways can the letters of the word EXAMINATION be arranged so that vowels always occupy odd places?

Answer Expert Verified So required number of words will be 360 x 180 = 64,800.

How many vowels are there in EXAMINATION?

6 vowles are there in word EXAMINATION………

How many words can be formed with the letter of EXAMINATION?

Words that can be made with examination 266 words can be made from the letters in the word examination.

How many arrangements of the letter of the word keyboard can be made if the vowels are to occupy only odd places?

2880. Hope it is helpfull!!

How many ways can you arrange the letters in the word machine?

Required number of ways = (360 * 2) = 720. In how many different ways can the letters of the word ‘MACHINE’ be arranged so that the vowels may occupy only the odd positions? Now, 3 vowels can be placed at any of the three places, out of the four marked 1, 3, 5,7.

How many vowels are there in the word education?

We know that there are 5 vowels and 21 consonants. The 5 vowels are A, E, I, O, U. The total number of words present in the word EDUCATION is 9. In which E, U, A, I, O are vowels.

How many vowels are there in English answer?

Answer: There are five vowels in English alphabet. They are A, E, I, O, U.

How many syllables are there in the word examination?

Wondering why examination is 5 syllables?

How many words can be formed by using the consonants of the word remote?

We found a total of 50 words by unscrambling the letters in remote.

How many vowels can never be together in a word examination?

So, the number of arrangements of the letters of the word examination such that the vowels will always be together is 360 ∗ 180 = 64800. Hence, the required number of arrangements such that the vowels can never be together is 4989600 − 64800 = 4924800.

How many ways can the 6 vowels be arranged among themselves?

Now, bunch all the 6 vowels together. Then total number of letters become 6 which can be arranged in 6! 2! = 360 ways and the 6 vowels can be arranged among themselves in 6! 2! ∗ 2! = 180 ways. So, the number of arrangements of the letters of the word examination such that the vowels will always be together is 360 ∗ 180 = 64800.

How many letters of the word examination can be arranged in 11?

There are 11 letters in the word examination. Out of these there are 6 vowels (2 i’s, 2 a’s & e and o) and 5 consonants (2 n’s, 1 m, 1x and 1 t). Now, all the 11 letters of the word examination can be arranged in 11! 2! ∗ 2! ∗ 2! = 4989600.

How many ways to arrange letters of a word?

Number of Ways to Arrance ‘n’ Letters of a Word ‘n’ Letters Words Ways to Arrange 7 Letters Word 5,040 Distinct Ways 8 Letters Word 40,320 Distinct Ways 9 Letters Word 362,880 Distinct Ways 10 Letters Word 3,628,800 Distinct Ways