Consider two coins, one fair and one unfair. The probability of getting heads on a given flip of the unfair coin is 0.75. You are given one of these coins and will gather information about your coin by flipping it. Based on your flip results, you will infer which of the coins you were given. At the end of the question, which coin you were given will be revealed. When you flip your coin, your result is based on a simulation. In a simulation, random events are modeled in such a way that the simulated outcomes closely match real-world outcomes. In this simulation, each flip is simulated based on the probabilities of obtaining heads and tails for whichever coin you were given. Your results will be displayed in sequential order from left to right. Here's your coin! Flip it 10 times by clicking on the red FLIP icons:

MATLAB: An Introduction with Applications
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ISBN:9781119256830
Author:Amos Gilat
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Chapter1: Starting With Matlab
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Consider two coins, one fair and one unfair. The probability of getting heads on a given flip of the unfair coin is 0.75. You are given one of these coins
and will gather information about your coin by flipping it. Based on your flip results, you will infer which of the coins you were given. At the end of the
question, which coin you were given will be revealed.
way that the simulated outcomes
When you flip your coin, your result is based on a simulation. In a simulation, random events are modeled in such
closely match real-world outcomes. In this simulation, each flip is simulated based on the probabilities of obtaining heads and tails for whichever coin
you were given. Your results will be displayed in seguential order from left to right.
Here's your coin! Flip it 10 times by clicking on the red FLIP icons:
COFA
Transcribed Image Text:Consider two coins, one fair and one unfair. The probability of getting heads on a given flip of the unfair coin is 0.75. You are given one of these coins and will gather information about your coin by flipping it. Based on your flip results, you will infer which of the coins you were given. At the end of the question, which coin you were given will be revealed. way that the simulated outcomes When you flip your coin, your result is based on a simulation. In a simulation, random events are modeled in such closely match real-world outcomes. In this simulation, each flip is simulated based on the probabilities of obtaining heads and tails for whichever coin you were given. Your results will be displayed in seguential order from left to right. Here's your coin! Flip it 10 times by clicking on the red FLIP icons: COFA
What is the probability of obtaining exactly as many heads as you just obtained if your coin is the unfair coin?
O 0.0023
O 0.0021
O 0.7769
O 0.2503
What is the probability of obtaining exactly as many heads as you just obtained if your coin is the fair coin?
O 0.0021
O 0.0023
O 0.7769
O 0.1172
When you compare these probabilities, it appears more likely that your coin is the
coin.
If you flip a fair coin 10 times, what is the probability of obtaining as many heads as you did or greater?
O 0.5234
O 0.0689
O 0.1719
O 0.7769
The probability you just found is a measure of how unusual your results are if your coin is fair. A low probability (0.10 or less) indicates that your
results are so unusual that it is unlikely that you have the fair coin; thus, you can infer that your coin is unfair.
On the basis of this probability, you
v infer that your coin is unfair.
Click here to find out whether you were flipping the fair coin or the unfair coin.
Transcribed Image Text:What is the probability of obtaining exactly as many heads as you just obtained if your coin is the unfair coin? O 0.0023 O 0.0021 O 0.7769 O 0.2503 What is the probability of obtaining exactly as many heads as you just obtained if your coin is the fair coin? O 0.0021 O 0.0023 O 0.7769 O 0.1172 When you compare these probabilities, it appears more likely that your coin is the coin. If you flip a fair coin 10 times, what is the probability of obtaining as many heads as you did or greater? O 0.5234 O 0.0689 O 0.1719 O 0.7769 The probability you just found is a measure of how unusual your results are if your coin is fair. A low probability (0.10 or less) indicates that your results are so unusual that it is unlikely that you have the fair coin; thus, you can infer that your coin is unfair. On the basis of this probability, you v infer that your coin is unfair. Click here to find out whether you were flipping the fair coin or the unfair coin.
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