Becoming Certain About Uncertainty
Probability & Statistical Analysis
Math Teacher Leader Seminar
June 2nd & 6th, 2008
Henry Kepner
Kevin McLeod
DeAnn Huinker
Connie Laughlin
Karen Corlyn
Lee Ann Pruske
Paige Richards
Mary Mooney
Session Goals
- To revisit and deepen our knowledge of probability.
- To introduce a useful and important representation of sample spaces and probabilities.
- To describe events as likely or unlikely and discuss the degree of likelihood using such words as certain, equally likely, and impossible.
- To predict the probability of outcomes of simple experiments and test the predictions.
Fair or Unfair?
Game 1
There are 2 chips: one chip with the letter x on both sides. One chip with an x on one side and a y on the other side.
Rules: Flip both chips.
Score: Player I gets a point if there is a match. Player II gets a point if there is no match.
Question: Is this a fair game? Why or why not?
Fair or Unfair Game Prediction Sheet
Directions: Before each game, predict whether the game is fair or unfair and why you feel it is. After each game discussion, clarify your prediction.
Game 1. Fair or Unfair - 2 Chips
Pre-game prediction and justificationPost game thoughts
Game 2. Fair or Unfair - 3 Chips
Pre-game prediction and justificationPost game thoughts
Game 3. Making Purple- Spinners
Pre-game prediction and justificationPost game thoughts
Fair or Unfair?
Game 2
There are 3 chips: one chip with an A on one side and a B on the other side; one chip with an A on one side and a C on the other side; one chip with a Bon one side and a C on the other side.
Rules: Flip all three chips at the same time.
Score: Player I gets a point if any two chips match. Player II gets a point if all three chips are different.
Question: Is this a fair game? Why or why not?
The cost to play the game is $2. The winner gets $6 for making purple. Can the school expect to make money with this game?
Milwaukee Public Schools
Mathematics Framework
Big Ideas
- Probability is the mathematical expression of likelihood.
- Probability, expressed as a fraction, will lie between zero and one.
- Outcomes are not necessarily equally likely.
- Though individual outcomes cannot be predicted with certainty, patterns emerge over many repetitions.
- The probabilities of compound events can be computed from the probabilities of the simple events which comprise them.
- Theoretical models exist which accurately describe the pattern of occurrences of outcomes over many repetitions of a random experiment.
Developed by the Milwaukee Mathematics Partnership (MMP) 1
with support by the National Science Foundation under Grant No. 0314898.1