[list][*]When reaching into a dark closet and pulling out one shoe from a pile of 20 pairs of shoes, you pull out a left shoe.[br][/*][*]When listening to a playlist—which has 5 songs on it—in shuffle mode, the first song on the playlist plays first.[br][/*][/list]
You will win grand prize in a raffle if you purchased 2 out of the 100 tickets.[br]
You will wait less than 10 minutes before ordering at a fast food restaurant.[br]
You will get an even number when you roll a standard number cube.[br]
A four-year-old child is over 6 feet tall.[br]
No one in your class will be late to class next week.
The next baby born at a hospital will be a boy.
It will snow at our school on July 1.
The Sun will set today before 11:00 p.m.
Spinning this spinner will result in green.[br] [img]data:image/png;base64,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[/img]
Spinning this spinner will result in red.[br][br] [img]data:image/png;base64,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[/img]
Discuss your answers to the previous question with your partner. If you disagree, work to reach an agreement.[br]
Invent another situation for each label, for a total of 5 more events.
[list][*]In the first round, one of you will score on an even roll and one of you will score on an odd roll. You decide that first.[br][/*][*]In the second round, the winner of round 1 will score on numbers , and the other player will score on numbers .[br][/*][*]Each round is 10 rolls. Be sure to turn on "History" after your first roll and wait for it to update before rolling again.[br][br][/*][/list]When each player had three numbers, did one of them usually win?
When one player had four numbers, did you expect them to win? Explain your reasoning.
On a game show, there are 3 closed doors. One door has a prize behind it. The contestant chooses one of the doors. The host of the game show, who knows where the prize is located, opens one of the [i]other[/i] doors which does not have the prize. The contestant can choose to stay with their first choice or switch to the remaining closed door.[br][br]Do you think it matters if the contestant switches doors or stays?[br]
Practice playing the game with your partner and record your results. Whoever is the host starts each round by secretly deciding which door has the prize.[br][br][list][*]Play 20 rounds where the contestant always stays with their first choice.[/*][*]Play 20 more rounds where the contestant always switches doors.[/*][/list][br]Did the results from playing the game change your answer to the first question? Explain.
Below are some cards that describe events. Order the events from least likely to most likely.[br][br]After ordering the first set of cards, pause here so your teacher can review your work. Then, your teacher will give you a second set of cards.[br][br]Add the new set of cards to the first set so that all of the cards are ordered from least likely to most likely.[br]