Suppose that you have 19 balls to place into four different bins. Nine of the balls are red, while the other 10 are blue. Use a proof by contradiction to show that no matter how the balls are placed into the bins, there must be at least one bin containing at least three red balls.

Suppose that you have 19 balls to place into four different bins. Nine of the balls are red, while the other 10 are blue. Use a proof by contradiction to show that no matter how the balls are placed into the bins, there must be at least one bin containing at least three red balls.

Name: Suppose that you have 19 balls to place into four different bins. Nin
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Description: Suppose that you have 19 balls to place into four different bins. Nineof the balls are red, while the other 10 are blue. Use a proof by contradiction to showthat no matter how the balls are placed into the bins, there must be at least one bincontain

A First Course in Probability (10th Edition)

10th Edition

ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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Concept explainers

Permutations and Combinations

If there are 5 dishes, they can be relished in any order at a time. In permutation, it should be in a particular order. In combination, the order does not matter. Take 3 letters a, b, and c. The possible ways of pairing any two letters are ab, bc, ac, ba, cb and ca. It is in a particular order. So, this can be called the permutation of a, b, and c. But if the order does not matter then ab is the same as ba. Similarly, bc is the same as cb and ac is the same as ca. Here the list has ab, bc, and ac alone. This can be called the combination of a, b, and c.

Counting Theory

The fundamental counting principle is a rule that is used to count the total number of possible outcomes in a given situation.

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Suppose that you have 19 balls to place into four different bins. Nine
of the balls are red, while the other 10 are blue. Use a proof by contradiction to show
that no matter how the balls are placed into the bins, there must be at least one bin
containing at least three red balls.

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