AP
Statistics Topic Outline
Following
is an outline of the major topics covered by the AP Statistics Examination.
The ordering here is intended to define the scope of the course but not
necessarily the sequence. The percentages in parentheses for each content
area indicate the coverage for that content area in the examination.
I.
Exploring Data: Describing patterns and departures from patterns
Exploratory
analysis of data makes use of graphical and numerical techniques to
study patterns and departures from patterns. Emphasis should be placed
on interpreting information from graphical and numerical displays and summaries.
A.Constructing
and interpreting graphical displays of distributions of univariate
data (dotplot, stemplot,
histogram, cumulative frequency plot)
1.
Center and spread
2.
Clusters and gaps
3.
Outliers and other unusual features
4.
Shape
B.Summarizing
distributions of univariate data
1.
Measuring center: median, mean
2.
Measuring spread: range, interquartile
range, standard deviation
3.
Measuring position: quartiles, percentiles, standardized scores (z-scores)
4.
Using boxplots
5.
The effect of changing units on summary measures
C.
Comparing distributions of univariate data
(dotplots, back-to back stemplots,
parallel boxplots)
1.
Comparing center and spread: within group, between group variation
2.
Comparing clusters and gaps
3.
Comparing outliers and other unusual features
4.
Comparing shapes
D.
Exploring bivariate data
1.
Analyzing patterns in scatterplots
2.
Correlation and linearity
3.
Least-squares regression line
4.
Residual plots, outliers, and influential points
5.
Transformations to achieve linearity: logarithmic and power transformations
E.
Exploring categorical data
1.
Frequency tables and bar charts
2.
Marginal and joint frequencies for two-way tables
3.
Conditional relative frequencies and association
4.
Comparing distributions using bar charts
II.
Sampling and Experimentation: Planning and conducting a study
Data
must be collected according to a well-developed plan if valid information
on a conjecture is to be obtained. This plan includes clarifying the question
and deciding upon a method of data collection and analysis.
A.
Overview of methods of data collection
1.
Census
2.
Sample survey
3.
Experiment
4.
Observational study
B.
Planning and conducting surveys
1.
Characteristics of a well-designed and well-conducted survey
2.
Populations, samples, and random selection
3.
Sources of bias in sampling and surveys
4.
Sampling methods, including simple random sampling, stratified random sampling,
and cluster sampling
C.
Planning and conducting experiments
1.
Characteristics of a well-designed and well-conducted experiment
2.
Treatments, control groups, experimental units, random assignments, and
replication
3.
Sources of bias and confounding, including placebo effect and blinding
4.
Completely randomized design
5.
Randomized block design, including matched pairs design
D.Generalizability
of results and types of conclusions that can be drawn from observational
studies, experiments, and surveys
III.
Anticipating Patterns: Exploring random phenomena using probability
and simulation
Probability
is the tool used for anticipating what the distribution of data should
look like under a given model.
A.
Probability
1.
Interpreting probability, including long-run relative frequency interpretation
2.
'Law of Large Numbers' concept
3.
Addition rule, multiplication rule, conditional probability, and independence
4.
Discrete random variables and their probability distributions, including
binomial and geometric
5.
Simulation of random behavior and probability distributions
6.
Mean ( expected value) and standard deviation
of a random variable, and linear transformation of a random variable
B.
Combining independent random variables
1.
Notion of independence versus dependence
2.
Mean and standard deviation for sums and differences of independent random
variables
C.
The normal distribution
1.
Properties of the normal distribution
2.
Using tables of the normal distribution
3.
The normal distribution as a model for measurements
D.
Sampling distributions
1.
Sampling distribution of a sample proportion
2.
Sampling distribution of a sample mean
3.
Central Limit Theorem
4.
Sampling distribution of a difference between two independent sample
proportions
5.
Sampling distribution of a difference between two independent sample means
6.
Simulation of sampling distributions
7.
t-distribution
8.
Chi-square distribution
IV.
Statistical Inference: Estimating population parameters and testing hypotheses
Statistical
inference guides the selection of appropriate models.
A.
Estimation (point estimators and confidence intervals)
1.
Estimating population parameters and margins of error
2.
Properties of point estimators, including unbiasedness
and variability
3.
Logic of confidence intervals, and properties of confidence intervals
4.
Large sample confidence interval for a proportion
5.
Large sample confidence interval for a difference between two proportions
6.
Confidence interval for a mean
7.
Confidence interval for a difference between two means (unpaired and paired)
8.
Confidence interval for the slope of a least-squares regression line
B.
Tests of significance
1.
Logic of significance testing, null and alternative hypotheses; p-values;
one- and two-sided tests; concepts of Type I and Type II errors; concept
of power
2.
Large sample test for a proportion
3.
Large sample test for a difference between two proportions
4.
Test for a mean
5.
Test for a difference between two means (unpaired and paired)
6.
Chi-square test for goodness of fit, homogeneity of proportions, and independence
(one- and two-way tables)
7.
Test for the slope of a least-squares regression line
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