Back to Exercise: Use probabilities to make fair decisions

Exercises: Use Probabilities to Make Fair Decisions

Work through each section in order. A decision procedure is FAIR when every option has exactly the same probability of being chosen. For design problems, describe the mapping and state each option's probability. When a device's outcomes do not divide evenly among the choices, use a divisible range or rejection sampling (reject the leftover outcomes and redraw), and verify each choice has probability $\frac{1}{k}$.

Grade 11·19 problems·~35 min·Common Core Math - HS Statistics and Probability·group·hss-md-b-6
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A

Warm-Up: What Makes a Decision Fair

These problems review the meaning of a fair decision.

1.

A decision procedure between several people is called fair. Which statement is the correct definition of a fair procedure?

2.

A teacher must choose one of two students for a prize. Which method gives each student probability exactly 12\frac{1}{2}?

3.

A fair six-sided die is used to choose fairly among 3 people. Two faces are assigned to each person: person X gets {1,2}\{1, 2\}, person Y gets {3,4}\{3, 4\}, person Z gets {5,6}\{5, 6\}. What is each person's probability of being chosen?

B

Fluency Practice

Judge whether each procedure is fair and design simple fair mappings.

1.

A coin is biased: it lands heads 70%70\% of the time and tails 30%30\% of the time. It is used to decide between two people (heads for one, tails for the other). Is this procedure fair?

2.

You want to choose fairly among 6 people using one fair six-sided die, assigning one face to each person. What is each person's probability of being chosen? Enter your answer as a fraction.

3.

A random number generator produces integers from 1 to 100, each equally likely. To choose between two people, the blocks are: person P gets 115050, person Q gets 5151100100. Is this procedure fair?

4.

A fair six-sided die is used to choose among 3 people, but the faces are assigned unequally: person X gets {1,2,3}\{1, 2, 3\}, person Y gets {4,5}\{4, 5\}, person Z gets {6}\{6\}. What is wrong, and how can it be fixed?

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