What happens if you guess - Leigh Nataro

639,577 views ・ 2012-08-31

TED-Ed


Please double-click on the English subtitles below to play the video.

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Probability is an area of mathematics that is everywhere.
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We hear about it in weather forecasts,
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like there's an 80% chance of snow tomorrow.
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It's used in making predictions in sports,
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such as determining the odds for who will win the Super Bowl.
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Probability is also used in helping to set auto insurance rates
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and it's what keeps casinos and lotteries in business.
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How can probability affect you?
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Let's look at a simple probability problem.
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Does it pay to randomly guess on all 10 questions
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on a true/ false quiz?
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In other words, if you were to toss a fair coin
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10 times, and use it to choose the answers,
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what is the probability you would get a perfect score?
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00:58
It seems simple enough. There are only two possible outcomes for each question.
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01:03
But with a 10-question true/ false quiz,
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there are lots of possible ways to write down different combinations
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of Ts and Fs. To understand how many different combinations,
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let's think about a much smaller true/ false quiz
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with only two questions. You could answer
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"true true," or "false false," or one of each.
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First "false" then "true," or first "true" then "false."
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So that's four different ways to write the answers for a two-question quiz.
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What about a 10-question quiz?
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Well, this time, there are too many to count and list by hand.
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In order to answer this question, we need to know the fundamental counting principle.
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The fundamental counting principle states
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that if there are A possible outcomes for one event,
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and B possible outcomes for another event,
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then there are A times B ways to pair the outcomes.
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Clearly this works for a two-question true/ false quiz.
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There are two different answers you could write for the first question,
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and two different answers you could write for the second question.
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That makes 2 times 2, or, 4 different ways to write the answers for a two-question quiz.
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Now let's consider the 10-question quiz.
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To do this, we just need to extend the fundamental counting principle a bit.
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We need to realize that there are two possible answers for each of the 10 questions.
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So the number of possible outcomes is
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2, times 2, times 2, times 2, times 2, times 2,
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times 2, times 2, times 2, times 2.
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Or, a shorter way to say that is 2 to the 10th power,
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which is equal to 1,024.
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That means of all the ways you could write down your Ts and Fs,
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only one of the 1,024 ways would match the teacher's answer key perfectly.
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So the probability of you getting a perfect score by guessing
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is only 1 out of 1,024,
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or about a 10th of a percent.
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Clearly, guessing isn't a good idea.
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In fact, what would be the most common score
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if you and all your friends were to always randomly guess
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at every question on a 10-question true/ false quiz?
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Well, not everyone would get exactly 5 out of 10.
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But the average score, in the long run,
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would be 5.
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In a situation like this, there are two possible outcomes:
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a question is right or wrong,
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and the probability of being right by guessing
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is always the same: 1/2.
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To find the average number you would get right by guessing,
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you multiply the number of questions
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by the probability of getting the question right.
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Here, that is 10 times 1/2, or 5.
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Hopefully you study for quizzes,
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since it clearly doesn't pay to guess.
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But at one point, you probably took a standardized test like the SAT,
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and most people have to guess on a few questions.
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If there are 20 questions and five possible answers
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for each question, what is the probability you would get all 20 right
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by randomly guessing?
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And what should you expect your score to be?
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04:16
Let's use the ideas from before.
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First, since the probability of getting a question right by guessing is 1/5,
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we would expect to get 1/5 of the 20 questions right.
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Yikes - that's only four questions!
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Are you thinking that the probability of getting all 20 questions correct is pretty small?
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Let's find out just how small.
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Do you recall the fundamental counting principle that was stated before?
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04:40
With five possible outcomes for each question,
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we would multiply 5 times 5 times 5 times 5 times...
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Well, we would just use 5 as a factor
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20 times, and 5 to the 20th power
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is 95 trillion, 365 billion, 431 million,
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648 thousand, 625. Wow - that's huge!
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So the probability of getting all questions correct by randomly guessing
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is about 1 in 95 trillion.
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