| Programs Click
here to preview episodes below online 1- What
Is Statistics? - Using historical anecdotes and contemporary applications,
this introduction to the series explores the vital links between statistics and
our everyday world. The program also covers the evolution of the discipline.
2 - Picturing Distributions - With this program, students will see how
key characteristics in the distribution of a histogram - shape, center, and spread
- help professionals make decisions in such diverse fields as meteorology, television
programming, health care, and air traffic control. Through a discussion of the
advantages of back-to-back stem plots, this program also emphasizes the importance
of seeking explanations for gaps and outliers in small data sets. 3
- Describing Distributions - This program examines the difference between
mean and median, explains the use of quartiles to describe a distribution, and
looks to the use of box-plots and the five-number summary for comparing and describing
data. An illustrative example shows how a city government used statistical methods
to correct inequity between men’s and women’s salaries. 4
- Normal Distributions - Students will advance from histograms through smooth
curves to normal curves, and finally to a single normal curve for standardized
measurement, as this program shows ways to describe the shape of a distribution
using progressively simpler methods. In a lesson on creating a density curve,
students also learn why, under steadily decreasing deviation, today’s baseball
players are less likely to achieve a .400 batting average. 5
- Normal Calculations - With this program, students will discover how to convert
the standard normal and use the standard deviation; how to use a table of areas
to compute relative frequencies; how to find any percentile; and how a computer
creates a normal quartile plot to determine whether a distribution is normal.
Vehicle emissions standards and medical studies of cholesterol provide real-life
examples. 6 - Time Series - Statistics can reveal
patterns over time. Using the concept of seasonal variation, this program shows
ways to present smooth data and recognize whether a particular pattern is meaningful.
Stock market trends and sleep cycles are used to explore the topics of deriving
a time series and using the 68-95-99.7 rule to determine the control limits. 7
- Models for Growth - Topics of this program include linear growth, least
squares, exponential growth, and straightening an exponential growth curve by
logic. A study of growth problems in children serves to illustrate the use of
the logarithm function to transform an exponential pattern into a line. The program
also discusses growth in world oil production over time. 8
- Describing Relationships - Segments describe how to use a scatter-plot to
display relationships between variables. Patterns in variables (positive, negative,
and linear association) and the importance of outliers are discussed. The program
also calculates the least squares regression line of metabolic rate y on lean
body mass x for a group of subjects and examines the fit of the regression line
by plotting residuals. 9 - Correlation - With
this program, students will learn to derive and interpret the correlation coefficient
using the relationship between a baseball player’s salary and his home run
statistics. Then they will discover how to use the square of the correlation coefficient
to measure the strength and direction of a relationship between two variables.
A study comparing identical twins raised together and apart illustrates the concept
of correlation. 10 - Multidimensional Data Analysis
- This program reviews the presentation of data analysis through an examination
of computer graphics for statistical analysis at Bell Communications Research.
Students will see how the computer can graph multivariate data and its various
ways of presenting it. The program concludes with an example of a study that analyzes
data on many variables to get a picture of environmental stresses in the Chesapeake
Bay. 11 - The Question of Causation - Causation
is only one of many possible explanations for an observed association. This program
defines the concepts of common response and confounding, explains the use of two-way
tables of percents to calculate marginal distribution, uses a segmented bar to
show how to visually compare sets of conditional distributions, and presents a
case of Simpson’s Paradox. The relationship between smoking and lung cancer
provides a clear example. 12 - Experimental Design
- Statistics can be used to evaluate anecdotal evidence. This program distinguishes
between observational studies and experiments and reviews basic principles of
design including comparison, randomization, and replication. Case material from
the Physician’s Health Study on heart disease demonstrates the advantages
of a double-blind experiment. 13 - Blocking and Sampling
- Students learn to draw sound conclusions about a population from a tiny
sample. This program focuses on random sampling and the census as two ways to
obtain reliable information about a population. It covers single- and multi-factor
experiments and the kinds of questions each can answer, and explores randomized
block design through agriculturists’ efforts to find a better strawberry.
14 - Samples and Surveys - This program shows
how to improve the accuracy of a survey by using stratified random sampling and
how to avoid sampling errors such as bias. While surveys are becoming increasingly
important tools in shaping public policy, a 1936 Gallup poll provides a striking
illustration of the perils of under coverage. 15 -
What Is Probability? - Students will learn the distinction between deterministic
phenomena and random sampling. This program introduces the concepts of sample
space, events, and outcomes, and demonstrates how to use them to create a probability
model. A discussion of statistician Persi Diaconis's work with probability theory
covers many of the central ideas about randomness and probability. 16
- Random Variables - This program demonstrates how to determine the probability
of any number of independent events, incorporating many of the same concepts used
in previous programs. An interview with a statistician who helped to investigate
the space shuttle accident shows how probability can be used to estimate the reliability
of equipment. 17 - Binomial Distributions - This
program discusses binomial distribution and the criteria for it, and describes
a simple way to calculate its mean and standard deviation. An additional feature
describes the quincunx, a randomizing device at the Boston Museum of Science,
and explains how it represents the binomial distribution. 18
- The Sample Mean and Control Charts - The successes of casino owners and
the manufacturing industry are used to demonstrate the use of the central limit
theorem. One example shows how control charts allow us to effectively monitor
random variation in business and industry. Students will learn how to create x-bar
charts and the definitions of control limits and out-of-control limits. 19
- Confidence Intervals - This program lays out the parts of the confidence
interval and gives an example of how it is used to measure the accuracy of long-term
mean blood pressure. An example from politics and population surveys shows how
margin of error and confidence levels are interpreted. The program also explains
the use of a formula to convert the z* values into values on the sampling distribution
curve. Finally, the concepts are applied to an issue of animal ethics. 20
- Significance Tests - This program explains the basic reasoning behind tests
of significance and the concept of null hypothesis. The program shows how a z-test
is carried out when the hypothesis concerns the mean of a normal population with
known standard deviation. These ideas are explored by determining whether a poem's
fits Shakespeare as well as Shakespeare fits Shakespeare. Court battles over discrimination
in hiring provide additional illustration. 21 - Inference
for One Mean - In this program, students discover an improved technique for
statistical problems that involve a population mean: the t statistic for use when
σ is not known. Emphasis is on paired samples and the t confidence test
and interval. The program covers the precautions associated with these robust
t procedures, along with their distribution characteristics and broad applications.
22 - Comparing Two Means - How to recognize a
two-sample problem and how to distinguish such problems from one- and paired-sample
situations are the subject of this program. A confidence interval is given for
the difference between two means, using the two-sample t statistic with conservative
degrees of freedom. 23 - Inference for Proportions
- This program marks a transition in the series: from a focus on inference
about the mean of a population to exploring inferences about a different kind
of parameter, the proportion or percent of a population that has a certain characteristic.
Students will observe the use of confidence intervals and tests for comparing
proportions applied in government estimates of unemployment rates. 24
- Inference for Two-way Tables - A two-way table of counts displays the relationship
between two ways of classifying people or things. This program concerns inference
about two-way tables, covering use of the chi-square test and null hypothesis
in determining the relationship between two ways of classifying a case. The methods
are used to investigate a possible relationship between a worker's gender and
the type of job he or she holds. 25 - Inference for
Relationships - With this program, students will understand inference for
simple linear regression, emphasizing slope, and prediction. This unit presents
the two most important kinds of inference: inference about the slope of the population
line and prediction of the response for a given x. Although the formulas are more
complicated, the ideas are similar to t procedures for the mean symbol of a population.
26 - Case Study - This
program presents a detailed case study of statistics at work. Operating in a real-world
setting, the program traces the practice of statistics - planning the data collection,
collecting and picturing the data, drawing inferences from the data, and deciding
how confident we can be about our conclusions. Students will begin to see the
full range and power of the concepts and techniques they have learned.
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