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In the word "FAVOURITE" if all the consonants are arranged in the reverse alphabetical order first and then all the vowels are arranged in alphabetical order respectively. Then, how many letters are there in alphabetical series between the third letter from the right end and the fourth letter from the left end? 

In the word "FAVOURITE" if all the consonants are arranged in the reverse alphabetical order first and then all the vowels are arranged in alphabetical order respectively. Then, how many letters are there in alphabetical series between the third letter from the right end and the fourth letter from the left end?  Correct Answer two

The given word = FAVOURITE

After arranging all the consonants in reverse alphabetical order, we get - VTRF

Now, arranging all the vowels in alphabetical order, we get - VTRFAEIOU

Here, the third letter from right end is I and fourth letter from left end F.

And, we know that there are two letters between F and I in alphabetical series.

Hence, there are two letters between F and I.

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