Difference between revisions of "SOCR EduMaterials Activities CardsCoinsSampling"
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− | * '''Exercise 2''': Suppose we need to validate that a coin given to us is '''fair'''. We toss the coin 6 times independently and observe only one Head. If the coin was fair P(Head)=P(Tail)=0.5 and we would expect about 3 Heads and 3 Tails, right? Under these fair coin assumptions what is the ('''theoretical''') probability that only 1 Head is observed in 6 tosses? Use the [http://socr.stat.ucla.edu/htmls/SOCR_Experiments.html Binomial Coin Experiment] to: | + | * '''Exercise 2''': Now we'll learn how to use these Card experimental results to compute expectations, summarize the outcomes of a large numer of experiments and validate these <b>random</b> simulations with the corresponding theoretical probabilities. |
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+ | ** First, select the [http://socr.stat.ucla.edu/htmls/SOCR_Experiments.html Card-Experiment]. Then we can run 10 (or more) experiments by clicking the '''RUN''' Button (>>). The output may look like this (recall that the actual cards will be different each time you perform the experiment): | ||
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+ | <center>[[Image:SOCR_Activities_CardCoinSampling_Dinov_092206_Fig4.jpg|300px]]</center> | ||
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+ | ** Now select with the mouse all outcome values in the eleven columns (recall that the first column is the index of the experiment, the remaining 2xN, in this case 10, columns represent the denomination (1<=Y<=13) and the suit (0<=Z<=3) of the cards in the randomly drawn hand). Save this selection (sky-blue highlight) in your mouse buffer, <nowiki><CNTR>+C, or <APPLE>+C</nowiki>. Open a new browser tab or window, envoke the [http://socr.stat.ucla.edu/htmls/SOCR_Charts.html SOCR Charts] and select the SOCR Area-Chart Demo: | ||
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+ | <center>[[Image:SOCR_Activities_CardCoinSampling_Dinov_092206_Fig5.jpg|300px]]</center> | ||
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+ | * '''Exercise 3''': Suppose we need to validate that a coin given to us is '''fair'''. We toss the coin 6 times independently and observe only one Head. If the coin was fair P(Head)=P(Tail)=0.5 and we would expect about 3 Heads and 3 Tails, right? Under these fair coin assumptions what is the ('''theoretical''') probability that only 1 Head is observed in 6 tosses? Use the [http://socr.stat.ucla.edu/htmls/SOCR_Experiments.html Binomial Coin Experiment] to: | ||
** Emprerically compute the odds (chances) of observing one Head in 6 fair-coin-tosses (run 100 experiments and record the number of them that contain exactly 1 Head); | ** Emprerically compute the odds (chances) of observing one Head in 6 fair-coin-tosses (run 100 experiments and record the number of them that contain exactly 1 Head); | ||
** Emperically estimate the Bias of the coin we have tested. Experiment with tossing 30 coins at a time. You should change the p-value=P(Head), run experiments and pick a value on the X-axis that the emperical distribution (red-histogram) peaks at. Perhaps you want this peak X value to be close to the observed 1-out-of-6 Head-count for the original test of the coin. Explain your findings! | ** Emperically estimate the Bias of the coin we have tested. Experiment with tossing 30 coins at a time. You should change the p-value=P(Head), run experiments and pick a value on the X-axis that the emperical distribution (red-histogram) peaks at. Perhaps you want this peak X value to be close to the observed 1-out-of-6 Head-count for the original test of the coin. Explain your findings! | ||
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<center>[[Image:SOCR_Activities_CardCoinSampling_Dinov_092206_Fig2.jpg|300px]]</center> | <center>[[Image:SOCR_Activities_CardCoinSampling_Dinov_092206_Fig2.jpg|300px]]</center> | ||
− | * '''Exercise | + | * '''Exercise 4''': In the SOCR [http://socr.stat.ucla.edu/htmls/SOCR_Experiments.html Ball and Urn Experiment] how does the distribution of the number of red balls (Y) depend on the sampling strategy (with or without replacement)? Do N, R and n also play roles? |
** Suppose N=100, n=5, R=30 and you run 1,000 experiments. What proportion of the 1,000 samples had zero or one red balls in them? Record this value. | ** Suppose N=100, n=5, R=30 and you run 1,000 experiments. What proportion of the 1,000 samples had zero or one red balls in them? Record this value. | ||
** Now run the Binomial Coin Experiment with n=5 and p= 0.3. Run the Binomial experiment 1,000 times? What is the proportion of observations that have zero or one head in them? Record this value also. How close is the proportion value you abtained before to this sample proportion value? Is there a reason to expect that these two quantities (coming from two distinct experiments and two different underlying probability models) should be similar? Explain. | ** Now run the Binomial Coin Experiment with n=5 and p= 0.3. Run the Binomial experiment 1,000 times? What is the proportion of observations that have zero or one head in them? Record this value also. How close is the proportion value you abtained before to this sample proportion value? Is there a reason to expect that these two quantities (coming from two distinct experiments and two different underlying probability models) should be similar? Explain. |
Revision as of 14:28, 12 October 2006
SOCR Educational Materials - Activities - SOCR Cards and Coins Sampling Activity
This is a heterogeneous Activity that demonstrates different settings for sampling drawing synergetic parallels between empirical and theoretical probability calculations
- Exercise 1: Supose a random card is drawn from a standard well-shuffled deck of 52 playing cards. What is the theoretical probability of the event A = {the drawn card is a king or a club}? In this applet an outcome of a King is recorded in the first variable Y and corresponds to Y=13; the second variable Z corresponds to the suit of the card with a Club, ♣, represented by Z=0. Using the SOCR Card-Experiment perform 20 experiments and determine the proportion of the outcomes the event A was observed. This would correspond to the emperical probability (the chance) of the event A. How close are the observed and the theoretical proabilities for the event A? Would the discrepancy between these increase or dicrease if the number of hands drawn increases? First do the xperiment and then report you findings!
- Exercise 2: Now we'll learn how to use these Card experimental results to compute expectations, summarize the outcomes of a large numer of experiments and validate these random simulations with the corresponding theoretical probabilities.
- First, select the Card-Experiment. Then we can run 10 (or more) experiments by clicking the RUN Button (>>). The output may look like this (recall that the actual cards will be different each time you perform the experiment):
- Now select with the mouse all outcome values in the eleven columns (recall that the first column is the index of the experiment, the remaining 2xN, in this case 10, columns represent the denomination (1<=Y<=13) and the suit (0<=Z<=3) of the cards in the randomly drawn hand). Save this selection (sky-blue highlight) in your mouse buffer, <CNTR>+C, or <APPLE>+C. Open a new browser tab or window, envoke the SOCR Charts and select the SOCR Area-Chart Demo:
- Exercise 3: Suppose we need to validate that a coin given to us is fair. We toss the coin 6 times independently and observe only one Head. If the coin was fair P(Head)=P(Tail)=0.5 and we would expect about 3 Heads and 3 Tails, right? Under these fair coin assumptions what is the (theoretical) probability that only 1 Head is observed in 6 tosses? Use the Binomial Coin Experiment to:
- Emprerically compute the odds (chances) of observing one Head in 6 fair-coin-tosses (run 100 experiments and record the number of them that contain exactly 1 Head);
- Emperically estimate the Bias of the coin we have tested. Experiment with tossing 30 coins at a time. You should change the p-value=P(Head), run experiments and pick a value on the X-axis that the emperical distribution (red-histogram) peaks at. Perhaps you want this peak X value to be close to the observed 1-out-of-6 Head-count for the original test of the coin. Explain your findings!
- Exercise 4: In the SOCR Ball and Urn Experiment how does the distribution of the number of red balls (Y) depend on the sampling strategy (with or without replacement)? Do N, R and n also play roles?
- Suppose N=100, n=5, R=30 and you run 1,000 experiments. What proportion of the 1,000 samples had zero or one red balls in them? Record this value.
- Now run the Binomial Coin Experiment with n=5 and p= 0.3. Run the Binomial experiment 1,000 times? What is the proportion of observations that have zero or one head in them? Record this value also. How close is the proportion value you abtained before to this sample proportion value? Is there a reason to expect that these two quantities (coming from two distinct experiments and two different underlying probability models) should be similar? Explain.
- SOCR Home page: http://www.socr.ucla.edu
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