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503367
Mathematics: Statistics 2
Description
A-level Maths (S2) Mind Map on Mathematics: Statistics 2, created by declanlarkins on 24/01/2014.
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maths
s2
maths
s2
a-level
Mind Map by
declanlarkins
, updated more than 1 year ago
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Created by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
Copied by
declanlarkins
almost 11 years ago
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Resource summary
Mathematics: Statistics 2
Continuous Random Variables
Probability density functions
To find mean and variance
Consideration of area
Understand concept
Normal Distribution
Annotations:
x~N(\(\mu\),\(\sigma^2\))
Solve problems
P(X>x)
Relationships between variables
Annotations:
\(x\) , \(\mu\) , \(\sigma\)
Use tables
Or calculator functions
Models continuous random variables
Approximation to binomial
Conditions
Continuity Correction
Poisson Distribution
Understand conditions of distribution
Mean and variance
Annotations:
X~Po(\(\mu\)) both mean and variance = \(\mu\)
Use normal approximation when needed
Continuity correction
Conditions of aproximation
Approximation to binomial
Conditions
Calculate probabilities
Using tables
Using formula
Sampling and Hypothesis Tests
Understand differences between population and sample
Importance of randomness in samples
Producing random samples
eg. random numbers
Recognise sample mean is random variable
Annotations:
Sample \(\mu\) = Population \(\mu\) Sample \(\sigma^2\) = \(\frac{Population \sigma^2}{n}\)
How distribution of population and sample are related
Central Limit Theorem
Calculate unbiased estimates of population mean and variance from a sample
Understand hypothesis tests
One-tailed and two-tailed tests
Null hypothesis
Alternative hypothesis
Significance level
Rejection region/Critical region
Acceptance region
Test statistic
Formulate hypotheses and carry out tests
Single observation from a binomial distribution
Perhaps using normal approximation
Normal distribution
A large sample using CLT
Single observation from a Poisson distribution
Type I and type II errors
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