discrete math about Pigeonhole Principle. Prove that any set of 10 positive integers less than or equal to 100 will always contain two subsets with the same sum. Can anyone help me with this problem?

Presley Esparza

Presley Esparza

Answered question

2022-09-04

discrete math about Pigeonhole Principle
Prove that any set of 10 positive integers less than or equal to 100 will always contain two subsets with the same sum.
Can anyone help me with this problem?

Answer & Explanation

Yadira Mcdowell

Yadira Mcdowell

Beginner2022-09-05Added 13 answers

Step 1
Let S be a set consisting of ten distinct positive integers, each of them less than or equal to 100.
How many subsets does S have?
Step 2
How big can the sum of the elements of T possibly get, for any subset T S?
By showing that S has more subsets than possible sums-of-subsets, the pigeonhole principle then tells you that there are two distinct subsets whose sums are equal.

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