Question 1160133: Find the number of ways of permitting the letters of the word HELL, such that:
a) The 2l’s will always be together
b) The 2l’s will always be apart
2. Given that there are 10 students to be seated on 5 desks. How many different arrangements of the students are possible on the assumption that all seats are to be filled
Answer by ikleyn(52781)   (Show Source):
You can put this solution on YOUR website! .
I will solve #2 ONLY.
In all, there are 10 seats. (Although the problem does not say it clearly, openly and explicitly, it is clear from the context)
By the way, it is a HUGE deficiency of the problem (!)
All essential conditions for the solution MUST be presented in clear form (!)
A reader should not retrieve them from the context (!) (!) (!)
Then the number of ways is 10*9*8*7*6*5*4*3*2*1 = 10! = 3628800.
EXPLANATION
Any of 10 students can occupy the seat #1.
Any of remaining 9 students may occupy the seat #2.
Any of remaining 8 students may occupy the seat #3.
. . . And so on, to the end . . .
It is a standard method and a standard mantra in solving such problems.
Done.
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