The purpose of this discussion is for students to explain their interpretations of the questions and share methods for solving.

Some questions for discussion:

• “How did you calculate the number of outcomes in the sample space?” (Counting the items in the tree, table, or list, or using the multiplication idea from an earlier lesson.)
• “For each problem, how many outcomes were in the event that was described?” (There is only 1 way to get G and 3. There are 3 ways to get B and an odd number: B1, B3, B5. There are 12 outcomes in the last event because there are 3 regions that are not R and 4 regions that are not 2, and .)

Some students may not recognize that rolling a 2 then a 3 is different from rolling a 3 then a 2. Ask students to imagine the number cubes are different colors to help see that there are actually 2 different ways to get these results. 

Similarly, some students may think that HHT counts the same as HTH and THH. Ask the student to think about the coins being flipped one at a time rather than all tossed at once. Drawing an entire tree and seeing all the branches may further help.

The purpose of the discussion is for students to explain their methods for solving the problems and to discuss how writing out the sample space aided in their solutions.

Poll the class on how they computed the number of outcomes in the sample space and the number of outcomes in the event for the second set of questions given these options: list, table, tree, computed outcomes without writing them all out, or another method.

Consider these questions for discussion:

• “Which representation did you use for each of the problems?”
  • “Do you think you will always try to use the same representation, or can you think of situations when one representation might be better than another?”
• “Do you have a method for finding the number of outcomes in the sample space or event that is more efficient than just counting them?” (The number of outcomes in the sample space for the number cubes can be found using \(6 \boldsymbol{\cdot} 6 = 36\). To find the number of outcomes with at least 1 even number, I know there are 6 for each time an even is rolled first and only 3 for each time an odd number is rolled first, so the number of outcomes is \(3 \boldsymbol{\cdot} 6 + 3 \boldsymbol{\cdot} 3 = 27\).)
• “One of the events has a probability of 0. What does this mean?” (It is impossible.)
• “What is the probability of an event that is certain?” (1)
• “Jada was concerned with having all three coins show the same side. What would be the probability of having at least one coin not match the others?” (68. There are 6 outcomes where at least one coin does not match: HHT, TTH, HTH, THT, HTT, THH.)
  • “How are the probability of having at least 1 coin not matching the other and the probability of having the coins match related? How does it address Jada's concern?” (Because every outcome in the sample space has the coins either matching or not, and because there is no outcome that applies to both events, together the sum of their probabilities must be 100%, or 1.)

Students may misread the problem and think that they replace the card before picking the next one. Ask these students to read the problem more carefully and ask them, “What is possible to get when you draw the second card while you already have a red card in your hand?”

The purpose of the discussion is for students to compare the same context with replacement and without replacement.

Consider asking these questions for discussion: 

• “How would your calculations change if the experiment required replacing the first card before picking a second card?” (There would be 25 outcomes in the sample space. The probability of getting the same color twice would be . The probability of getting different colors would be . The probability of getting red and white would be . The probability of getting a black card would be , and not getting a black card would be . It would still be impossible to get a blue card, so its probability would be 0.)
• “What do you notice about the sum of the probability of getting a black card and the probability of not getting a black card?” (They have a sum of 1.)
  • “Why might these outcomes have probabilities with this relationship?” (Since the player either gets a black card or not, together their probabilities should be 1, or 100%.)