How many ways can you arrange the letters from the word MATHEMATICS such that all vowels are never together?
`(8!xx4!)/(2!2!)``(8!xx4!)/(2!2!2!)``(8!)/(2!2!2!)``(8!)/(4!2!2!)` Show
Answer : B Solution : There are 4 vowels viz. A,E, A, I. Considering these four vowels as one letter we have 8 letteres (M, T, H, M, T, C, S and one letter obtained by combining all vowels), out of which M occurs twice, T occurs twice and the rest all different.
Post your comments here:Name *: Email : (optional) » Your comments will be displayed only after manual approval. How many ways can you arrange the letters from the word MATHEMATICS such that all the vowels are never together?∴ Required number of words = (10080 x 12) = 120960.
How many ways can be letter of the word MATHEMATICS be arranged so that the vowels always come together?Number of ways of arranging these letters =8! / ((2!)( 2!)) = 10080.
How many ways can the letters of the word MATHEMATICS be arranged so that the vowels come together Brainly?So total 120960 ways.
How many ways can the letters in MATHEMATICS be arranged?There are 24 different ways to arrage the letters in the word math .
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