Question

The number of arrangements that can be made out of the letter of the word "SUCCESS" so
that the all s's do not come together is------​

Answer 1

Step-by-step explanation:

Total together of 7 (3 S's, 2 c's, 2 different) letters =3!2!7!

Total together with 2 C's in which 3 S's come together =2!5!

Thus, total in which 3 S's do not come together =2!3!7!−2!5!=2!5!(642−1)=360

Answer 2

Answer:

Idk this question

Sorry I hope you understand