Ask Question
29 January, 20:34

Problem 4 (3 pts) : Let n be a positive integer. Show that among any group of n 1 (not necessarily consecutive) positive integers there are at least two with the same reminder when they are divided by n.

+2
Answers (1)
  1. 29 January, 23:27
    0
    Answer:There are two integers in the group of n+1 integers with exactly the same remainder when they are divided by n.

    Explanation:

    Generally, if a number is divided by p (positive integer), then the possible remainders will be from 0 to p-1.

    Here, the possible remainders when an integer is divided by n are 0,1, ..., n-1

    so the number of possible remainders when an integer is divided by n is n.

    In this case, the number of objects is n+1 integers and the number of boxes (remainders) is n.

    p/k = (n+1) / n

    = 1 + (1/n)

    = 2

    Here, 0<1/n<1

    Add 1 on both sides to get the following

    0+1 < 1+1/n<1+1

    1<1+1/n<2

    so the value of p/k = 2 means that there is atleast one remainder which is same for two integers when they are divided by n

    There are therefore two integers in the group of n+1 integers with exactly the same remainder when they are divided by n.
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Problem 4 (3 pts) : Let n be a positive integer. Show that among any group of n 1 (not necessarily consecutive) positive integers there are ...” in 📘 Computers and Technology if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers