Game 1: You flip a coin and win if it lands showing heads.[br]Game 2: You roll a standard number cube and win if it lands showing a number that is divisible by 3.
[size=150]For each situation, list the [b]sample space [/b]and tell how many outcomes there are.[/size][br][br]Han rolls a standard number cube once.
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[/img][br][br]Clare spins this spinner once.
Kiran selects a letter at [b]random [/b]from the word “MATH.”
Mai selects a letter at random from the alphabet.
Noah picks a card at random from a stack that has cards numbered 5 through 20.
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[/img][br][br]Is Clare more likely to have the spinner stop on the red or blue section?[br]
Is Kiran or Mai more likely to get the letter T?[br]
Is Han or Noah more likely to get a number that is greater than 5?[br]
Suppose you have a spinner that is evenly divided showing all the days of the week. You also have a bag of papers that list the months of the year. Are you more likely to spin the current day of the week or pull out the paper with the current month?
Are there any outcomes for two people in this activity that have the same likelihood? Explain or show your reasoning.
Your teacher will give your group a bag of paper slips with something printed on them. Repeat these steps until everyone in your group has had a turn.[br][list][*]As a group, guess what is printed on the papers in the bag and record your guess in the table.[/*][*]Without looking in the bag, one person takes out one of the papers and shows it to the group.[/*][*]Everyone in the group records what is printed on the paper.[/*][*]The person who took out the paper puts it back into the bag, shakes the bag to mix up the papers, and passes the bag to the next person in the group.[/*][/list]
How was guessing the sample space the fourth time different from the first?
What could you do to get a better guess of the sample space?
Look at all the papers in the bag. Were any of your guesses correct?
Are all of the possible outcomes equally likely? Explain.
Use the sample space to determine the [b]probability [/b]that a fifth person would get the same outcome as person 1.