5 schoolchildren came to the library, which has many identical textbooks in ten subjects , each of whom wants to take a textbook. The librarian writes in the journal in order the names (without number) of the borrowed textbooks without the names of the students who took them. How many different lists could appear in the magazine?
The solution of the problem
Since the textbooks for each subject are the same, and the librarian writes down only the name (without a number), the list is a repeating layout . the number of elements of the original set is 10, and the number of positions is 5.
Then the number of different lists is
= 100000.
Answer : 100000
Check yourself!
1. Phone number consists of 7 digits. What is the maximum number of calls the loser Petya can make before he guesses the correct number.
SOLUTION
SOLUTION
SOLUTION
Check yourself!
1. Phone number consists of 7 digits. What is the maximum number of calls the loser Petya can make before he guesses the correct number.
Solution.
Because numbers can be repeated, then everything is possible
different numbers.
If Petya is unlucky, he must will call 10 million times.
