Understanding Using Expected Values to Make Decisions
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Beginner
Start here! Easy to understand
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Beginner Explanation
Simple explanation with payoffs incorporated: $E(X) = 2 \times (1/6) + 5 \times (1/6) + (-1) \times (4/6)$
Practice Problems
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1
Quick Quiz
Single Choice Quiz
Beginner
What is the expected value if you win $2$ tokens with probability $\frac{1}{6}$ and win $0$ tokens otherwise?
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2
Real-World Problem
Question Exercise
Intermediate
Teenager Scenario
Consider a game where a player wins $5$ tokens with probability $\frac{1}{6}$, or loses $1$ token (the entry fee) otherwise. Should you play?
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3
Thinking Challenge
Thinking Exercise
Intermediate
Think About This
Consider a spinner with six equally likely sectors: red, blue, and four others. Red wins $2$ tokens, blue wins $5$ tokens, others lose $1$ token each. Should you play?
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4
Challenge Quiz
Single Choice Quiz
Advanced
If a game costs 1 token to play, and you have an expected value of $0.5$ tokens per play, what is your average gain per play?
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Recap
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