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**CHAPTER 7: Exploring Data: Part I Review**

Basic Practice of Statistics - 3rd Edition CHAPTER 7: Exploring Data: Part I Review Chapter 5

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**Exploring One Variable**

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**Exploring Data – Two Variables**

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Chapters 1-6 A: Data Identify the individuals and variables in a set of data. Identify each variable as categorical or quantitative. Identify the explanatory and response variables in situations where one variable explains or influences another.

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**Chapters 1-6 B: Displaying Distributions**

Recognize when a pie chart can and cannot be used. Make a bar graph of the distribution of a categorical variable or, in general, to compare related quantities. Interpret pie charts and bar graphs. Make a histogram of the distribution of a quantitative variable. Make a stemplot of the distribution of a small set of observations. Make a time plot of a quantitative variable over time. Recognize patterns such as trends and cycles in time plots.

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**Chapters 1-6 C: Describing Distributions (Quantitative)**

Look for the overall pattern and for major deviations from the pattern. Assess the shape of a distribution from a histogram or stemplot. Describe the overall pattern by giving numerical measures of center and spread in addition to a verbal description of shape. Decide which measures of center and spread are more appropriate. Recognize outliers and give plausible explanations for them.

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**Chapters 1-6 D: Numerical Summaries of Distributions**

Find the median and quartiles for a set of observations. Find the five-number summary and draw a boxplot. Find the mean and standard deviation for a set of observations. Understand that the median is more resistant than the mean. Recognize that skewness in a distribution moves the mean away from the median toward the long tail. Know the basic properties of the standard deviation.

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**Chapters 1-6 E: Density Curves and Normal Distributions**

Know that areas under a density curve represent proportions of all observations and that the total area under a density curve is 1. Approximate the median and mean on a density curve. Know that the mean and median both lie at the center of a symmetric density curve and that the mean moves toward the long tail of a skewed curve. Recognize the shape of Normal curves and estimate by eye both the mean and standard deviation from such a curve.

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**Chapters 1-6 E: Density Curves and Normal Distributions (con’t)**

Use the rule and symmetry to state what percent of the observations from a Normal distribution fall between two points when both lie at one, two, or three standard deviations from the mean. Find the z-score of an observation. Interpret z-scores. Given that a variable has a Normal distribution, calculate the proportion of values above, below, and between stated values. Given that a variable has a Normal distribution, calculate the point having a stated proportion of values above or below it.

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**Chapters 1-6 F: Scatterplots and Correlation**

Make a scatterplot to display the relationship between two quantitative variables. Add a categorical variable to a scatterplot. Describe the direction, form, and strength of the overall pattern of a scatterplot. Recognize outliers. Judge whether it is appropriate to use correlation to describe the relationship between two quantitative variables. Find the correlation r. Know the basic properties of correlation r.

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**Chapters 1-6 G: Regression Lines**

Understand that regression requires an explanatory and a response variable. Use a calculator or software to find the least-squares regression line. Explain what the slope and intercept mean in the equation of a regression line. Draw the graph of a regression line when given an equation. Find the slope and intercept of the least-squares regression line from the means and standard deviations of x and y and their correlation.

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**Chapters 1-6 G: Regression Lines (con’t)**

Use r2 to describe how much of the variation in one variable can be accounted for by a straight-line relationship with another variable. Recognize outliers and potentially influential observations from a scatterplot with the regression line drawn on it. Calculate the residuals and plot them against the explanatory variable.

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**Chapters 1-6 H: Cautions about Correlation and Regression**

Understand that both r and the least-squares regression line can be strongly influenced by a few extreme observations. Recognize possible lurking variables that may explain the observed association between two variables. Understand that even a strong correlation does not mean there is a cause-and-effect relationship between x and y. Give plausible explanations for an observed association between two variables.

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**Chapters 1-6 I: Categorical Data**

Find the marginal distributions from a two-way table. Express any distribution in percents. Describe the relationship between two categorical variables by comparing the conditional distributions of one variable for the different categories of the other variable. Recognize Simpson’s paradox and be able to explain it.

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