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In how many ways the word 'SCOOTY' can be arranged such that 'S' and 'Y' are always at two ends?

In how many ways the word 'SCOOTY' can be arranged such that 'S' and 'Y' are always at two ends? Correct Answer 24

Given word is SCOOTY

ATQ,

Except S & Y number of letters are 4(C 2O's T)

Hence, required number of arrangements = 4!/2! x 2! = 4!

= 4 x 3 x 2

= 24 ways.

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