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Section 8.1 Binomial Distributions
AP Statistics
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The Binomial Setting Each observation falls into one of just two categories, which for convenience we call “success” or “failure” There are a fixed number n of observations The n observations are all independent. The probability of success, call it p, is the same for each observation. AP Statistics, Section 8.1.1
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The Binomial Setting: Example
Each observation falls into one of just two categories, which for convenience we call “success” or “failure”: Basketball player at the free throw. There are a fixed number n of observations: The player is given 5 tries. The n observations are all independent: When the player makes (or misses) it does not change the probability of making the next shot. The probability of success, call it p, is the same for each observation: The player has an 85% chance of making the shot; p=.85 AP Statistics, Section 8.1.1
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Shorthand Normal distributions can be described using the N(µ,σ) notation; for example, N(65.5,2.5) is a normal distribution with mean 65.5 and standard deviation 2.5. Binomial distributions can be described using the B(n,p) notation; for example, B(5, .85) describes a binomial distribution with 5 trials and .85 probability of success for each trial. AP Statistics, Section 8.1.1
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Example Blood type is inherited. If both parents carry genes for the O and A blood types, each child has probability 0.25 of getting two O genes and so of having blood type O. Different children inherit independently of each other. The number of O blood types among 5 children of these parents is the count X off successes in 5 independent observations. How would you describe this with “B” notation? X=B(5,.25) AP Statistics, Section 8.1.1
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Example Deal 10 cards from a shuffled deck and count the number “X” of red cards. A “success” is a red card. How would you describe this using “B” notation? This is not a Binomial distribution because once you pull one card out, the probabilities change. AP Statistics, Section 8.1.1
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Binomial Coefficient Sometimes referred to as “n choose k”
For example: “I have 10 students in a class. I need to choose 2 of them.” In these examples, order is not important. AP Statistics, Section 8.1.1
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Binomial Coefficients on the Calculator
AP Statistics, Section 8.1.1
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Binomial Probabilities
AP Statistics, Section 8.1.1
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Binomial Mean AP Statistics, Section 8.1.1
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AP Statistics, Section 8.1.1
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AP Statistics, Section 8.1.1
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AP Statistics, Section 8.1.1
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Binomial Distributions on the calculator
Binomial Probabilities B(n,p) with k successes binompdf(n,p,k) Corinne makes 75% of her free throws. What is the probability of making exactly 7 of 12 free throws. binompdf(12,.75,7)=.1032 AP Statistics, Section 8.1.1
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Binomial Distributions on the calculator
Binomial Probabilities B(n,p) with k successes binomcdf(n,p,k) Corinne makes 75% of her free throws. What is the probability of making at most 7 of 12 free throws. binomcdf(12,.75,7)=.1576 AP Statistics, Section 8.1.1
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Binomial Distributions on the calculator
Binomial Probabilities B(n,p) with k successes binomcdf(n,p,k) Corinne makes 75% of her free throws. What is the probability of making at least 7 of 12 free throws. 1-binomcdf(12,.75,6)= AP Statistics, Section 8.1.1
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Binomial Simulations Corinne makes 75% of her free throws.
Simulate shooting 12 free throws. randBin(n,p) will do one simulation randBin(n,p,t) will do t simulations AP Statistics, Section 8.1.1
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Normal Approximation of Binomial Distribution
Remember AP Statistics, Section 8.1.1
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Normal Approximation of Binomial Distribution
As the number of trials n gets larger, the binomial distribution gets close to a normal distribution. Question: What value of n is big enough? The book does not say, so let’s see how the close two calculations are… AP Statistics, Section 8.1.1
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Example: A recent survey asked a nationwide random sample of 2500 adults if they agreed or disagreed that “I like buying new clothes, but shopping is often frustrating and time-consuming.” Suppose that in fact 60% of all adults would “agree”. What is the probability that 1520 or more of the sample “agree”. AP Statistics, Section 8.1.1
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TI-83 calculator nCDF(1520, 1E99, 1500, 24.495) P(X>1520)=.207
B(2500,.6) and P(X>1520) 1-binomcdf(2500,.6,1519) AP Statistics, Section 8.1.1
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Homework Binomial Worksheet Study Guide 8.2
AP Statistics, Section 8.1.1
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