Annenberg Probability Module
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What is a random event? Give an example of something that happens randomly and something that does not.
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When I read the solution to this question I began to feel the same confusion that has followed me through many years of working with statistics. The solution mentioned that some things are just random while others require skill. I understand that. The example they used as a random event is what card would show up on top of a freshly shuffled deck. Where I get confused is would that actually be random? You would always have a 1 in 42 chance of drawing a specific card. SO it isn't as if the probability of pulling any one card is randomly changing. Am I just over thinking this?
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Suppose you toss a fair coin three times, and the coin comes up as heads all three times. What is the probability that the fourth toss will be tails?
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This question made me laugh a little bit. Logically, I know that in a coin toss, there will always be a 50/50 chance of heads or tails. It is easy to forget this in the heat of the moment, though. I know that my odds are still 50/50 but there is this nagging feeling in your mind that the next toss HAS to have this certain outcome.
A Whale of a Tale article
Create your own probability line chart that displays events that are impossible, certain, likely, or
unlikely to happen. You should have a minimum of 2 events for each area
Dice Toss
- Based on the data, the class concluded that 7 was the most likely outcome. Some of the students did have some preconceptions, though. For example, some students thought that 12 would be unlikely because it is more difficult to roll a 6. I think that this would be a difficult concept to get out of their heads. Like I explained earlier with the coin toss, even though you know that there is an equal chance of either outcome, it is so easy to get caught up in the results. You could toss a coin 4 times and get 4 heads in a row, but that doesn't affect the probability that you could land on tails next even though you may feel otherwise.
- I do not think that they were too young. They were able to clearly answer their teacher's questions and even expressed their surprise at some of the results.
- The teacher asked the students to roll 36 times because it would allow the students to collect a large amount of data to be able to see the trends. One advantage to this is that the results would be more accurate. One disadvantage is that this would take up a lot of time in class. Also the large amount of data might be overwhelming.
I love you point for question A3 I did not think about that. but i would say yes that it was at random just because there are so many cards and you have multiple chances. I do love your graph again I still cant figure that out.:) I remember doing the Dice toss in school is always a good one to do as a probability activity. For B2 I agree with that as well I understand that it is 50/50 but there is always an outcome so i try to call it before it lands to see if if works, and it does not im always wrong.:) great work on this.
ReplyDeleteI also made a comment in my blog about question B2. It's so easy to forget simple things we know when they are re-worded. I also agree with your answers to the questions on the dice video. The students are definitely not too young to begin learning probability. They knew the answers and were very engaged in the activity.
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