Math, asked by aherakshada18, 7 months ago

Akshada vowels are always come together then how many ways arrange​

Answers

Answered by padmagalli82
0

Step-by-step explanation:

1)Take the vowels together and treat them as single entity (AEIAE) PPRCT

2)Number of ways in which the above pattern can be arranged is 6!/2!

3)the vowel entity can be arranged in itself in 5!/(2!*2!)

4)Therefore the total number of ways to arrange the pattern will be……………… 6!*5!/(2!*2!*2!)

this is second ans from this two what you want you can take

There are total 10 letters in given word appreciate . out of these 10 letters 5 are vowels that is the letters { a,a,e,e,i} are vowels in which a & e has been repeated twice. Since we want vowels to remain together in each arrangements so treat all the vowels together as one item . Now remaining 5 consonants ( p repeated twice) together with one item(vowels) , the 6 can be arranged on a line in ( 6!/ 2! ) = 360 ways but 5 vowels in which a & e each repeated twice can be arranged among themselves in ( 5!/2!×2! ) = 30 ways . Hence the total no.of arrangements = 360 × 30 = 10800 .

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