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Learn how to describe and analyze sample data using descriptive statistics. Explore frequency distributions, graphical representations, measures of central tendency and variability, examining relationships among variables, correlation coefficients, and regression analysis.
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14 Descriptive Statistics
Descriptive Statistics • The goal of descriptive statistics is to describe sample data • Can be contrasted with inferential statistics where the goal is to make inferences about populations from sample data
Frequency Distributions • A listing of values in a data set along with their frequency
Graphic Representations of Data • Bar graph • used with categorical variables • height of bar represents frequency of category • bars should not touch • Histogram • used with quantitative variables • no space between bars
Graphic Representations of Data (cont'd) • Line graphs • also used with quantitative variables • particularly useful for interpreting interactions • Scatterplots • depicts relationship between two quantitative variables
Figure 14.5 Line graph of results from pretest–posttest control group design studying effectiveness of social skills treatment.
Figure 14.6 A scatterplot of starting salary by college GPA.
Measures of Central Tendency • Provide a single value that is typical of the distribution of scores • mode • most frequently occurring value • least useful measure of central tendency • median • middle score when numbers are in ascending or descending order
Measures of Central Tendency (cont'd) • Provide a single value that is typical of the distribution of scores • Mean • arithmetic average • most commonly used measure of central tendency
Measures of Variability • Provides a numerical value indicating the amount of variation in a group of scores • range • highest score minus lowest score • rarely used as a measure of variability • variance • average deviation of the data values from their mean in squared units
Measures of Variability (cont'd) • Provides a numerical value indicating the amount of variation in a group of scores • standard deviation • square root of variance • roughly the average amount that individual scores deviate from the mean
Measures of Variability (cont'd) • Provides a numerical value indicating the amount of variation in a group of scores • standard deviation and the normal curve • z-scores • standardized values transformed from raw scores • mean of z-distribution is always zero; standard deviation always 1
Measures of Variability (cont'd) • Provides a numerical value indicating the amount of variation in a group of scores • z-scores • indicates how far above or below a raw score is from its mean in standard deviation units; e.g., a z-score of +1.00 indicates a raw score that is one standard deviation unit above the mean • in a normal distribution, the proportion of scores occurring between any two points can be determined
Examining Relationships Among Variables • Unstandardized difference between means • a comparison of mean differences between levels of a categorical independent variable • Standardized difference between means • effect size • Cohen’s d is a common measure of effect size • mean difference is divided by standard deviation • small, medium, and large effect sizes are indicated by values of at least .2, .5, and .8 respectively
Examining Relationships Among Variables (cont'd) • Correlation Coefficient • numerical representation of the strength and direction of relationship between two variables • value ranges from +1.0 to -1.0; absolute value indicates strength of relationship; sign indicates direction • positive correlation indicates that the two variables vary together in the same direction; negative correlation means that they move in opposite directions
Examining Relationships Among Variables (cont'd) • Correlation Coefficient • Pearson correlation (r) used with two quantitative variables; only appropriate if data is related in a linear fashion • partial correlation is a technique that involves examining correlation after controlling for one or more variables • a scatterplot can be used to judge the strength and direction of a correlation
Figure 14.10 Correlations of different strengths and directions.
Regression Analysis • Statistical technique designed to predict dependent variable based on one or more predictor values • simple regression involves the use of one independent or predictor variable • multiple regression involves two or more independent or predictor variables • prediction is made using the regression equation
Regression Analysis (cont'd) • Statistical technique designed to predict dependent variable based on one or more predictor values • prediction is made using the regression equation • y-intercept - point where regression line crosses y-axis • regression coefficient - predicted change in the dependent variable (Y) given a one unit change in the independent variable (X)
Regression Analysis (cont'd) • Statistical technique designed to predict dependent variable based on one or more predictor values • prediction is made using the regression equation • partial regression coefficient
Contingency Tables • Table used to examine relationship between two categorical variables • Cells may contain frequencies or percentages
