
Binomial Probability
Presentation
•
Mathematics
•
11th Grade
•
Hard
Joseph Anderson
FREE Resource
14 Slides • 27 Questions
1
The binomial distribution
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A) An Introduction of binomial distribution
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Drag and Drop
A special case is where each stage has only
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Drag and Drop
At any stage,
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Drag and Drop
a die is rolled, then throws of any of 1, 2, 3 and 6 will result in 'success'.
So, in this case: P(success) =
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Some patterns begin to emerge when these probabilities are shown on the branches of a tree diagram and the number of successes is counted.
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The number of paths corresponds to the number of different ways you can order the three probabilities, in each case. The l, 3, 3, 1 sequence of the number of paths, for x = 0, 1, 2, 3, is one ofthe rows of Pascal's triangle, as shown on the right.
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Match
Match the following
1×(32)0×(31)3
3×(32)1×(31)2
3×(32)2×(31)1
1×(32)3×(31)0
P(x = 0)
P(x = 1)
P(x = 2)
P(x = 3)
P(x = 0)
P(x = 1)
P(x = 2)
P(x = 3)
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Drag and Drop
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However, the coefficients in Pascal's triangle and the patterns seen in the diagram with three stages can be used to write down expressions for the probabilities of getting 0, 1, 2, 3, 4, 5 or 6 successes.
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Multiple Choice
When the number of stages (or trials) is large (> 6), it is hard to use Pascal's triangle to find the binomial coefficients.
The number of paths giving r occurrences out of n cases equals the number of ways of choosing r out of n, which is . . .
Crn=(n−r)!r!n!
Prn=r!n!
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Drag and Drop
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Multiple Choice
If X∼B(12, 0.2) , find the probability that X=3 .
P(X=3)=C312(0.2)9(0.8)3
P(X=3)=C312(0.2)3(0.8)9
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Dropdown
If X = number of 6s seen, then
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Multiple Choice
If 25 fair dice are rolled, find the probability that three 6s are seen.
If X = number of 6s seen, then X∼(25,61) .
P(X=3)=C325(61)3(65)22
P(X=3)=C325(61)22(65)3
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B) Mean and variance of the binomial distribution
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Mean and variance of the binomial distribution
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Drag and Drop
Given that n =
Therefore the mean is np =
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Dropdown
Therefore the mean is
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Dropdown
Then, the value of np =
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The binomial distribution
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