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1/20/2015 What You Will Learn Section 13.1 Sampling Techniques Copyright 2013, 2010, 2007, Pearson, Education, Inc. Sampling Techniques Random Sampling Systematic Sampling Cluster Sampling Stratified Sampling Convenience Sampling 13.1-2 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Statistics Statistics Statistics is the art and science of gathering, analyzing, and making inferences (predictions) from numerical information, data, obtained in an experiment. Statistics is divided into two main branches. Descriptive statistics is concerned with the collection, organization, and analysis of data. Inferential statistics is concerned with making generalizations or predictions from the data collected. 13.1-3 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Statisticians A statistician’s interest lies in drawing conclusions about possible outcomes through observations of only a few particular events. The population consists of all items or people of interest. The sample includes some of the items in the population. 13.1-5 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.1-4 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Statisticians When a statistician draws a conclusion from a sample, there is always the possibility that the conclusion is incorrect. 13.1-6 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 1 1/20/2015 Types of Sampling Types of Sampling A random sampling occurs if a sample is drawn in such a way that each time an item is selected, each item has an equal chance of being drawn. When a sample is obtained by drawing every nth item on a list or production line, the sample is a systematic sample. 13.1-7 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.1-8 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Types of Sampling Types of Sampling A cluster sample is sometimes referred to as an area sample because it is frequently applied on a geographical basis. Stratified sampling involves dividing the population by characteristics called stratifying factors such as gender, race, religion, or income. 13.1-9 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.110 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Types of Sampling Example 1: Identifying Sampling Techniques Convenience sampling uses data that are easily or readily obtained, and can be extremely biased. Identify the sampling technique used to obtain a sample in the following. Explain your answer. a) Every 20th soup can coming off an assembly line is checked for defects. Solution Systematic Sampling Every 20th item is selected. 13.111 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.112 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 2 1/20/2015 Example 1: Identifying Sampling Techniques Example 1: Identifying Sampling Techniques b) A $50 gift certificate is given away at the Annual Bankers Convention. Tickets are placed in a bin, and the tickets are mixed up. Then the winning ticket is selected by a blindfolded person. Solution Random Sampling Each ticket has an equal chance. c) Children in a large city are classified based on the neighborhood school they attend. A random sample of five schools is selected. All the children from each selected school are included in the sample. 13.113 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Solution Cluster Sampling Random sample of geographic areas is selected. 13.114 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Identifying Sampling Techniques Example 1: Identifying Sampling Techniques d) The first 50 people entering a zoo are asked if they support an increase in taxes to support a zoo expansion. e) Viewers of the USA Network are classified according to age. Random samples from each age group are selected. Solution Stratified Sampling Viewers divided into strata by age, random sample from each strata. Solution Convenience Sampling Sample is selected by picking data that is easily obtained. 13.115 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.116 Copyright 2013, 2010, 2007, Pearson, Education, Inc. What You Will Learn Section 13.2 The Misuses of Statistics Copyright 2013, 2010, 2007, Pearson, Education, Inc. Misuses of Statistics What is Not Said Vague or Ambiguous Words Draw Irrelevant Conclusions Charts and Graphs 13.218 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 3 1/20/2015 Misuses of Statistics Misuses of Statistics When examining statistical information, consider the following: Was the sample used to gather the statistical data unbiased and of sufficient size? Is the statistical statement ambiguous, could it be interpreted in more than one way? Many individuals, businesses, and advertising firms misuse statistics to their own advantage. 13.219 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.220 Copyright 2013, 2010, 2007, Pearson, Education, Inc. What is Not Said What is Not Said “Four out of five dentists recommend sugarless gum for their patients who chew gum.” In this advertisement, we do not know the sample size and the number of times the experiment was performed to obtain the desired results. The advertisement does not mention that possibly only 1 out of 100 dentists recommended gum at all. In a golf ball commercial, a “type A” ball is hit and a second ball is hit in the same manner. The type A ball travels farther. We are supposed to conclude that the type A is the better ball. The advertisement does not mention the number of times the experiment was previously performed or the results of the earlier experiments. 13.221 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.222 Copyright 2013, 2010, 2007, Pearson, Education, Inc. What is Not Said Vague or Ambiguous Words Possible sources of bias include (1) wind speed and direction, (2) that no two swings are identical, and (3) that the ball may land on a rough or smooth surface. Vague or ambiguous words also lead to statistical misuses or misinterpretations. The word average is one such culprit. There are at least four different “averages,” some of which are discussed in Section 13.4. Each is calculated differently, and each may have a different value for the same sample. 13.223 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.224 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 4 1/20/2015 Vague or Ambiguous Words Vague or Ambiguous Words During contract negotiations, it is not uncommon for an employer to state publicly that the average salary of its employees is $45,000, whereas the employees’ union states that the average is $40,000. Who is lying? Actually, both sides may be telling the truth. Each side will use the average that best suits its needs to present its case. Advertisers also use the average that most enhances their products. Consumers often misinterpret this average as the one with which they are most familiar. 13.225 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.226 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Vague or Ambiguous Words Draw Irrelevant Conclusions Another vague word is largest. For example, ABC claims that it is the largest department store in the United States. Does that mean largest profit, largest sales, largest building, largest staff, largest acreage, or largest number of outlets? Still another deceptive technique used in advertising is to state a claim from which the public may draw irrelevant conclusions. 13.227 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.228 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Draw Irrelevant Conclusions Draw Irrelevant Conclusions For example, a disinfectant manufacturer claims that its product killed 40,760 germs in a laboratory in 5 seconds. “To prevent colds, use disinfectant A.” It may well be that the germs killed in the laboratory were not related to any type of cold germ. Company C claims that its paper towels are heavier than its competition’s towels. Therefore, they will hold more water. Is weight a measure of absorbency? A rock is heavier than a sponge, yet a sponge is more absorbent. 13.229 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.230 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 5 1/20/2015 Draw Irrelevant Conclusions Draw Irrelevant Conclusions An insurance advertisement claims that in Duluth, Minnesota, 212 people switched to insurance company Z. One may conclude that this company is offering something special to attract these people. What may have been omitted from the advertisement is that 415 people in Duluth, Minnesota, dropped insurance company Z during the same period. A foreign car manufacturer claims that 9 of every 10 of a popular-model car it sold in the United States during the previous 10 years were still on the road. From this statement, the public is to conclude that this foreign car is well manufactured and would last for many years. 13.231 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Draw Irrelevant Conclusions The commercial neglects to state that this model has been selling in the United States for only a few years. The manufacturer could just as well have stated that 9 of every 10 of these cars sold in the United States in the previous 100 years were still on the road. 13.233 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.232 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs Charts and graphs can also be misleading. Even though the data is displayed correctly, adjusting the vertical scale of a graph can give a different impression. 13.234 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs Charts and Graphs While each graph presents identical information, the vertical scales have been altered. The graph in part (a) appears to show a greater increase than the graph in part (b), again because of a different scale. 13.235 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.236 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 6 1/20/2015 Charts and Graphs Charts and Graphs Consider a claim that if you invest $1, by next year you will have $2. This type of claim is sometimes misrepresented. Actually, your investment has only doubled, but the area of the square on the right is four times that of the square on the left. By expressing the amounts as cubes, you increase the volume eightfold. 13.237 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs 13.238 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs A circle graph can be misleading if the sum of the parts of the graphs does not add up to 100%. 13.239 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.240 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs Charts and Graphs The graph on the previous slide is misleading since the sum of its parts is 183%. A graph other than a circle graph should have been used to display the top six reasons Americans say they use the Internet. Despite the examples presented in this section, you should not be left with the impression that statistics is used solely for the purpose of misleading or cheating the consumer. 13.241 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.242 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 7 1/20/2015 Charts and Graphs Section 13.2 As stated earlier, there are many important and necessary uses of statistics. Most statistical reports are accurate and useful. You should realize, however, the importance of being an aware consumer. 13.243 The Misuses of Statistics Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. What You Will Learn Misuses of Statistics Misuses of Statistics What is Not Said Vague or Ambiguous Words Draw Irrelevant Conclusions Charts and Graphs Many individuals, businesses, and advertising firms misuse statistics to their own advantage. 13.245 13.247 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.246 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Misuses of Statistics What is Not Said When examining statistical information, consider the following: Was the sample used to gather the statistical data unbiased and of sufficient size? Is the statistical statement ambiguous, could it be interpreted in more than one way? “Four out of five dentists recommend sugarless gum for their patients who chew gum.” In this advertisement, we do not know the sample size and the number of times the experiment was performed to obtain the desired results. The advertisement does not mention that possibly only 1 out of 100 dentists recommended gum at all. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.248 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 8 1/20/2015 What is Not Said What is Not Said In a golf ball commercial, a “type A” ball is hit and a second ball is hit in the same manner. The type A ball travels farther. We are supposed to conclude that the type A is the better ball. The advertisement does not mention the number of times the experiment was previously performed or the results of the earlier experiments. Possible sources of bias include (1) wind speed and direction, (2) that no two swings are identical, and (3) that the ball may land on a rough or smooth surface. 13.249 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.250 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Vague or Ambiguous Words Vague or Ambiguous Words Vague or ambiguous words also lead to statistical misuses or misinterpretations. The word average is one such culprit. There are at least four different “averages,” some of which are discussed in Section 13.4. Each is calculated differently, and each may have a different value for the same sample. During contract negotiations, it is not uncommon for an employer to state publicly that the average salary of its employees is $45,000, whereas the employees’ union states that the average is $40,000. Who is lying? Actually, both sides may be telling the truth. Each side will use the average that best suits its needs to present its case. 13.251 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.252 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Vague or Ambiguous Words Vague or Ambiguous Words Advertisers also use the average that most enhances their products. Consumers often misinterpret this average as the one with which they are most familiar. Another vague word is largest. For example, ABC claims that it is the largest department store in the United States. Does that mean largest profit, largest sales, largest building, largest staff, largest acreage, or largest number of outlets? 13.253 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.254 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 9 1/20/2015 Draw Irrelevant Conclusions Draw Irrelevant Conclusions Still another deceptive technique used in advertising is to state a claim from which the public may draw irrelevant conclusions. For example, a disinfectant manufacturer claims that its product killed 40,760 germs in a laboratory in 5 seconds. “To prevent colds, use disinfectant A.” It may well be that the germs killed in the laboratory were not related to any type of cold germ. 13.255 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Draw Irrelevant Conclusions Company C claims that its paper towels are heavier than its competition’s towels. Therefore, they will hold more water. Is weight a measure of absorbency? A rock is heavier than a sponge, yet a sponge is more absorbent. 13.257 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.256 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Draw Irrelevant Conclusions An insurance advertisement claims that in Duluth, Minnesota, 212 people switched to insurance company Z. One may conclude that this company is offering something special to attract these people. What may have been omitted from the advertisement is that 415 people in Duluth, Minnesota, dropped insurance company Z during the same period. 13.258 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Draw Irrelevant Conclusions Draw Irrelevant Conclusions A foreign car manufacturer claims that 9 of every 10 of a popular-model car it sold in the United States during the previous 10 years were still on the road. From this statement, the public is to conclude that this foreign car is well manufactured and would last for many years. The commercial neglects to state that this model has been selling in the United States for only a few years. The manufacturer could just as well have stated that 9 of every 10 of these cars sold in the United States in the previous 100 years were still on the road. 13.259 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.260 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 10 1/20/2015 Charts and Graphs Charts and graphs can also be misleading. Even though the data is displayed correctly, adjusting the vertical scale of a graph can give a different impression. 13.261 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs While each graph presents identical information, the vertical scales have been altered. 13.262 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs Charts and Graphs The graph in part (a) appears to show a greater increase than the graph in part (b), again because of a different scale. Consider a claim that if you invest $1, by next year you will have $2. This type of claim is sometimes misrepresented. Actually, your investment has only doubled, but the area of the square on the right is four times that of the square on the left. 13.263 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs By expressing the amounts as cubes, you increase the volume eightfold. 13.265 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.264 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs A circle graph can be misleading if the sum of the parts of the graphs does not add up to 100%. 13.266 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 11 1/20/2015 Charts and Graphs Charts and Graphs The graph on the previous slide is misleading since the sum of its parts is 183%. A graph other than a circle graph should have been used to display the top six reasons Americans say they use the Internet. 13.267 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.268 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Charts and Graphs Charts and Graphs Despite the examples presented in this section, you should not be left with the impression that statistics is used solely for the purpose of misleading or cheating the consumer. As stated earlier, there are many important and necessary uses of statistics. Most statistical reports are accurate and useful. You should realize, however, the importance of being an aware consumer. 13.269 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Section 13.3 Frequency Distribution and Statistical Graphs Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.270 Copyright 2013, 2010, 2007, Pearson, Education, Inc. What You Will Learn Frequency Distributions Histograms Frequency Polygons Stem-and-Leaf Displays Circle Graphs 13.372 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 12 1/20/2015 Frequency Distribution A piece of data is a single response to an experiment. A frequency distribution is a listing of observed values and the corresponding frequency of occurrence of each value. 13.373 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Frequency Distribution The number of children per family is recorded for 64 families surveyed. Construct a frequency distribution of the following data: 13.374 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.376 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Frequency Distribution 13.375 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Frequency Distribution Eight families had no children, 11 families had one child, 18 families had two children, and so on. Note that the sum of the frequencies is equal to the original number of pieces of data, 64. 13.377 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Rules for Data Grouped by Classes 1. The classes should be of the same “width.” 2. The classes should not overlap. 3. Each piece of data should belong to only one class. Often suggested that there be 5 – 12 classes. 13.378 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13 1/20/2015 Definitions Classes 0−4 5−9 10 − 14 Lower class limits Upper class limits 15 − 19 20 − 24 25 − 29 Example 3: A Frequency Distribution of Family Income The following set of data represents the family income (in thousands of dollars, rounded to the nearest hundred) of 15 randomly selected families. 46.5 65.2 35.5 Midpoint of a class is found by adding the lower and upper class limits and dividing the sum by 2. 13.379 13.380 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 31.8 52.4 40.3 45.8 44.6 39.8 44.7 53.7 56.3 40.9 48.8 50.7 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 3: A Frequency Distribution of Family Income Example 3: A Frequency Distribution of Family Income Construct a frequency distribution with a first class of 31.5–37.6. Solution Class width is 37.6 – 31.5 = 6.2. Solution Rearrange data from lowest to highest. 31.8 35.5 39.8 13.381 40.3 40.9 44.6 44.7 45.8 46.5 48.8 50.7 52.4 53.7 56.3 65.2 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.382 Example 3: A Frequency Distribution of Family Income Histograms A histogram is a graph with observed values on its horizontal scale and frequencies on its vertical scale. Because histograms and other bar graphs are easy to interpret visually, they are used a great deal in newspapers and magazines. Solution The modal class is 43.9–50.0. The class mark of the first class is (31.5 + 37.6)÷2 = 34.55. 13.383 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.384 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 14 1/20/2015 13.385 Constructing a Histogram Constructing a Histogram A bar is constructed above each observed value (or class when classes are used), indicating the frequency of that value (or class). The horizontal scale need not start at zero, and the calibrations on the horizontal and vertical scales do not have to be the same. The vertical scale must start at zero. To accommodate large frequencies on the vertical scale, it may be necessary to break the scale. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.386 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.388 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.390 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 4: Construct a Histogram The frequency distribution developed in Example 1 is shown on the next slide. Construct a histogram of this frequency distribution. 13.387 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 4: Construct a Histogram Solution Vertical scale: 0 – 20. Horizontal scale: 0 – 9. Bar above 0 extends to 8. Above 1, bar extends to 11. Bar above 2 extends to 18. Continue this procedure for each observed value to get the histogram on the next slide. 13.389 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 15 1/20/2015 13.391 13.393 Frequency Polygon Constructing a Frequency Polygon Frequency polygons are line graphs with scales the same as those of the histogram; that is, the horizontal scale indicates observed values and the vertical scale indicates frequency. Place a dot at the corresponding frequency above each of the observed values. Then connect the dots with straightline segments. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.392 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Constructing a Frequency Polygon Example 5: Construct a Histogram When constructing frequency polygons, always put in two additional class marks, one at the lower end and one at the upper end on the horizontal scale. Since the frequency at these added class marks is 0, the end points of the frequency polygon will always be on the horizontal scale. Construct a frequency polygon of the frequency distribution in Example 1, found on the next slide. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.394 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 5: Construct a Histogram Solution Vertical scale: 0 – 20. Horizontal scale: 0 – 9, plus one at each end. Place a mark above 0 at 8. Place a mark above 1 at 11. And so on. Connect the dots, bring the end points down to the horizontal axis. 13.395 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.396 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 16 1/20/2015 Stem-and-Leaf Display A stem-and-leaf display is a tool that organizes and groups the data while allowing us to see the actual values that make up the data. 13.397 13.399 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.398 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Constructing a Stem-and-Leaf Display Constructing a Stem-and-Leaf Display To construct a stem-and-leaf display each value is represented with two different groups of digits. The left group of digits is called the stem. The remaining group of digits on the right is called the leaf. There is no rule for the number of digits to be included in the stem. Usually the units digit is the leaf and the remaining digits are the stem. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.3100 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 8: Constructing a Stemand-Leaf Display Example 8: Constructing a Stemand-Leaf Display The table below indicates the ages of a sample of 20 guests who stayed at Captain Fairfield Inn Bed and Breakfast. Construct a stem-and-leaf display. 29 31 39 43 56 60 62 59 58 32 47 27 50 28 71 72 44 45 44 68 Solution 13.3101 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Stem 2 3 4 5 6 7 13.3102 Leaves 978 192 37454 6980 028 12 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 17 1/20/2015 Circle Graphs Example 9: Circus Performances Circle graphs (also known as pie charts) are often used to compare parts of one or more components of the whole to the whole. Eight hundred people who attended a Ringling Bros. and Barnum & Bailey Circus were asked to indicate their favorite performance. The circle graph shows the percentage of respondents that answered tigers, elephants, acrobats, jugglers, and other. Determine the number of respondents for each category. 13.3103 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 9: Circus Performances 13.3104 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 9: Circus Performances Solution To determine the number of respondents in a category, we multiply the percentage for each category, written as a decimal number, by the total number of people, 800. 13.3105 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.3106 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 9: Circus Performances Example 9: Circus Performances Solution Tigers 38% Elephants 26% Acrobats 17% Jugglers 14% Other 5% Create the table on the next slide. Solution 13.3107 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.3108 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 18 1/20/2015 Example 9: Circus Performances Section 13.4 Solution 304 people indicated tigers were their favorite performance, 208 indicated elephants, 136 people indicated the acrobats, 112 people indicated the jugglers, and 40 people indicated some other performance. 13.3109 Measures of Central Tendency Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. What You Will Learn Measures of Central Tendency Averages Mean Median Mode Midrange Quartiles An average is a number that is representative of a group of data. There are at least four different averages: the mean, the median, the mode, and the midrange. Each is calculated differently and may yield different results for the same set of data. 13.4111 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4112 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Measures of Central Tendency Mean (or Arithmetic Mean) Each will result in a number near the center of the data; for this reason, averages are commonly referred to as measures of central tendency. The mean, x , is the sum of the data divided by the number of pieces of data. The formula for calculating the mean is Σx x= n where Σx represents the sum of all the data and n represents the number of pieces of data. 13.4113 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4114 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 19 1/20/2015 Example 1: Determine the Mean Determine the mean age of a group of patients at a doctor’s office if the ages of the individuals are 28, 19, 49, 35, and 49. Solution x= 13.4115 The median is the value in the middle of a set of ranked data. Σx 28 + 19 + 49 + 35 + 49 = n 5 180 = = 36 5 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 2: Determine the Median Determine the median age of a group of patients at a doctor’s office if the ages of the individuals are 28, 19, 49, 35, and 49. Solution Rank the data from smallest to largest. 19 28 35 49 49 35 is in the middle, 35 is the median. 13.4117 Median Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4116 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 3: Determine the Median of an Even Number of Pieces of Data Determine the median of the following sets of data. a) 9, 14, 16, 17, 11, 16, 11, 12 b) 7, 8, 8, 8, 9, 10 13.4118 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 3: Determine the Median of an Even Number of Pieces of Data Example 3: Determine the Median of an Even Number of Pieces of Data Solution 9, 11, 11, 12, 14, 16, 16, 17 8 pieces of data Median is half way between middle two data points 12 and 14 (12 + 14)÷2 = 26 ÷ 2 = 13 Solution 13.4119 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 7, 8, 8, 8, 9, 10 6 pieces of data Median is half way between middle two data points 8 and 8 (8 + 8)÷2 = 16 ÷ 2 = 8 13.4120 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 20 1/20/2015 Mode Example 4: Determine the Mode The mode is the piece of data that occurs most frequently. Determine the mean age of a group of patients at a doctor’s office if the ages of the individuals are 28, 19, 49, 35, and 49. Solution The age 49 is the mode because it occurs twice and the other values occur only once. 13.4121 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4122 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Midrange Example 5: Determine the Midrange The midrange is the value halfway between the lowest (L) and highest (H) values in a set of data. Determine the midrange age of a group of patients at a doctor’s office if the ages of the individuals are 28, 19, 49, 35, and 49. Midrange = lowest value + highest value 2 Solution Midrange = 13.4123 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4124 68 19 + 49 = 34 = 2 2 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Measures of Position Percentiles Measures of position are often used to make comparisons. Two measures of position are percentiles and quartiles. There are 99 percentiles dividing a set of data into 100 equal parts. 13.4125 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4126 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 21 1/20/2015 Percentiles Quartiles A score in the nth percentile means that you out-performed about n% of the population who took the test and that (100 – n)% of the people taking the test performed better than you did. Quartiles divide data into four equal parts: The first quartile is the value that is higher than about 1/4, or 25%, of the population. It is the same as the 25th percentile. 13.4127 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Quartiles 13.4128 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Quartiles The second quartile is the value that is higher than about 1/2 the population and is the same as the 50th percentile, or the median. The third quartile is the value that is higher than about 3/4 of the population and is the same as the 75th percentile. 13.4129 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4130 Copyright 2013, 2010, 2007, Pearson, Education, Inc. To Determine the Quartiles of a Set of Data To Determine the Quartiles of a Set of Data 1. Order the data from smallest to largest. 2. Find the median, or 2nd quartile, of the set of data. If there are an odd number of pieces of data, the median is the middle value. If there are an even number of pieces of data, the median will be halfway between the two middle pieces of data. 13.4131 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.4132 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 22 1/20/2015 To Determine the Quartiles of a Set of Data To Determine the Quartiles of a Set of Data 3. The first quartile, Q1, is the median of the lower half of the data; that is, Q1, is the median of the data less than Q2. 4. The third quartile, Q3, is the median of the upper half of the data; that is, Q3 is the median of the data greater than Q2. 13.4133 13.4134 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 8: Finding Quartiles Electronics World is concerned about the high turnover of its sales staff. A survey was done to determine how long (in months) the sales staff had been in their current positions. The responses of 27 sales staff follow. Determine Q1, Q2, and Q3. 13.4135 Example 8: Finding Quartiles 25 3 7 15 31 36 17 21 2 11 42 16 23 16 21 9 20 5 8 12 27 14 39 24 18 6 10 Solution List data from 2 3 5 12 14 15 21 23 24 13.4136 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. smallest to largest. 6 7 8 9 10 11 16 17 18 19 20 21 25 27 31 36 39 42 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 8: Finding Quartiles Solution 2 3 5 6 7 8 9 12 14 15 16 17 18 19 21 23 24 25 27 31 36 The median, or middle of the points is Q2 = 17. The median, or middle of the pieces of data is Q1 = 9. The median, or middle of the pieces of data is Q3 = 24. 13.4137 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 10 20 39 27 11 21 42 data lower 13 upper 13 Section 13.5 Measures of Dispersion Copyright 2013, 2010, 2007, Pearson, Education, Inc. 23 1/20/2015 What You Will Learn Measures of Dispersion Range Standard Deviation Measures of dispersion are used to indicate the spread of the data. 13.5139 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.5140 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Range Example 1: Determine the Range The range is the difference between the highest and lowest values; it indicates the total spread of the data. Range = highest value – lowest value The amount of caffeine, in milligrams, of 10 different soft drinks is given below. Determine the range of these data. 38, 43, 26, 80, 55, 34, 40, 30, 35, 43 13.5141 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Determine the Range Solution 38, 43, 26, 80, 55, 34, 40, 30, 35, 43 Range = highest value – lowest value = 80 – 26 = 54 The range of the amounts of caffeine is 54 milligrams. 13.5143 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.5142 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Standard Deviation The standard deviation measures how much the data differ from the mean. It is symbolized with s when it is calculated for a sample, and with ⌠ (Greek letter sigma) when it is calculated for a population. ∑ (x − x ) 2 s= 13.5144 n −1 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 24 1/20/2015 Standard Deviation The standard deviation, s, of a set of data can be calculated using the following formula. ∑ (x − x ) 2 s= 13.5145 n −1 Copyright 2013, 2010, 2007, Pearson, Education, Inc. To Find the Standard Deviation of a Set of Data 1. Find the mean of the set of data. 2. Make a chart having three columns: Data Data – Mean (Data – Mean)2 3. List the data vertically under the column marked Data. 4. Subtract the mean from each piece of data and place the difference in the Data – Mean column. 13.5146 Copyright 2013, 2010, 2007, Pearson, Education, Inc. To Find the Standard Deviation of a Set of Data To Find the Standard Deviation of a Set of Data 5. Square the values obtained in the Data – Mean column and record these values in the (Data – Mean)2 column. 6. Determine the sum of the values in the (Data – Mean)2 column. 7. Divide the sum obtained in Step 6 by n – 1, where n is the number of pieces of data. 8. Determine the square root of the number obtained in Step 7. This number is the standard deviation of the set of data. 13.5147 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.5148 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 3: Determine the Standard Deviation of Stock Prices Example 3: Determine the Standard Deviation of Stock Prices The following are the prices of nine stocks on the New York Stock Exchange. Determine the standard deviation of the prices. $17, $28, $32, $36, $50, $52, $66, $74, $104 Solution The mean x is ∑x x= n 13.5149 Copyright 2013, 2010, 2007, Pearson, Education, Inc. = = 13.5150 17 + 28 + 32 + 36 + 50 + 52 + 66 + 74 + 104 9 459 9 = 51 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 25 1/20/2015 Example 3: Determine the Standard Deviation of Stock Prices Example 3: Determine the Standard Deviation of Stock Prices Solution Use the formula ∑ (x − x ) 2 s= n −1 = 5836 = 729.5 ≈ 27.01 9 −1 The standard deviation, to the nearest tenth, is $27.01. 13.5151 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.5152 Copyright 2013, 2010, 2007, Pearson, Education, Inc. What You Will Learn Section 13.6 The Normal Curve Copyright 2013, 2010, 2007, Pearson, Education, Inc. Rectangular Distribution J-shaped Distribution Bimodal Distribution Skewed Distribution Normal Distribution z-Scores 13.6154 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Rectangular Distribution J-shaped Distribution All the observed values occur with the same frequency. The frequency is either constantly increasing or constantly decreasing. 13.6155 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6156 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 26 1/20/2015 Bimodal Distribution Skewed Distribution Two nonadjacent values occur more frequently than any other values in a set of data. Has more of a “tail” on one side than the other. 13.6157 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6158 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Skewed Distribution Skewed Distribution Smoothing the histograms of the skewed distributions to form curves. The relationship between the mean, median, and mode for curves that are skewed to the right and left. 13.6159 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6160 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Normal Distribution Properties of a Normal Distribution The most important distribution is the normal distribution. The graph of a normal distribution is called the normal curve. The normal curve is bell shaped and symmetric about the mean. In a normal distribution, the mean, median, and mode all have the same value and all occur at the center of the distribution. 13.6161 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6162 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 27 1/20/2015 Empirical Rule Approximately 68% of all the data lie within one standard deviation of the mean (in both directions). Approximately 95% of all the data lie within two standard deviations of the mean (in both directions). Approximately 99.7% of all the data lie within three standard deviations of the mean (in both directions). 13.6163 Copyright 2013, 2010, 2007, Pearson, Education, Inc. z-Scores z-scores (or standard scores) determine how far, in terms of standard deviations, a given score is from the mean of the distribution. 13.6164 Copyright 2013, 2010, 2007, Pearson, Education, Inc. z-Scores Example 2: Finding z-scores The formula for finding z-scores (or standard scores) is A normal distribution has a mean of 80 and a standard deviation of 10. z= = value of piece of data − mean standard deviation x−µ 13.6165 Find z-scores for the following values. a) 90 b) 95 c) 80 d) 64 σ Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6166 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 2: Finding z-scores Example 2: Finding z-scores Solution a) 90 Solution b) 95 z = value of piece of data − mean standard deviation 90 − 80 10 = =1 10 10 A value of 90 is 1 standard deviation above the mean. z90 = 13.6167 Copyright 2013, 2010, 2007, Pearson, Education, Inc. z = value of piece of data − mean standard deviation 95 − 80 15 = = 1.5 10 10 A value of 90 is 1.5 standard deviations above the mean. z95 = 13.6168 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 28 1/20/2015 Example 2: Finding z-scores Example 2: Finding z-scores Solution c) 80 Solution d) 64 z = value of piece of data − mean standard deviation 80 − 80 0 = =0 10 10 The mean always has a z-score of 0. z80 = 13.6169 Copyright 2013, 2010, 2007, Pearson, Education, Inc. z = z64 = value of piece of data − mean standard deviation 64 − 80 −16 = = −1.6 10 10 A value of 64 is 1.6 standard deviations below the mean. 13.6170 Copyright 2013, 2010, 2007, Pearson, Education, Inc. To Determine the Percent of Data Between any Two Values To Determine the Percent of Data Between any Two Values 1. Draw a diagram of the normal curve indicating the area or percent to be determined. 2. Use the formula to convert the given values to z-scores. Indicate these z-scores on the diagram. 3. Look up the percent that corresponds to each z-score in Table 13.7. a) When finding the percent of data to the left of a negative z-score, use Table 13.7(a). 13.6171 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6172 Copyright 2013, 2010, 2007, Pearson, Education, Inc. To Determine the Percent of Data Between any Two Values To Determine the Percent of Data Between any Two Values b) When finding the percent of data to the left of a positive z-score, use Table 13.7(b). c) When finding the percent of data to the right of a z-score, subtract the percent of data to the left of that zscore from 100%. 13.6173 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6174 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 29 1/20/2015 To Determine the Percent of Data Between any Two Values To Determine the Percent of Data Between any Two Values c) Or use the symmetry of a normal distribution. d) When finding the percent of data between two z-scores, subtract the smaller percent from the larger percent. 13.6175 Copyright 2013, 2010, 2007, Pearson, Education, Inc. To Determine the Percent of Data Between any Two Values 13.6176 Example 5: Horseback Rides Assume that the length of time for a horseback ride on the trail at Triple R Ranch is normally distributed with a mean of 3.2 hours and a standard deviation of 0.4 hour. a) What percent of horseback rides last at least 3.2 hours? Solution In a normal distribution, half the data are above the mean. Since 3.2 hours is the mean, 50%, of the horseback rides last at least 3.2 hours. 4. Change the areas you found in Step 3 to percents as explained earlier. 13.6177 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.6178 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 5: Horseback Rides Example 5: Horseback Rides b) What percent of horseback rides last less than 2.8 hours? Solution Convert 2.8 to a z-score. c) What percent of horseback rides are at least 3.7 hours? Solution Convert 3.7 to a z-score. 2.8 − 3.2 = −1.00 0.4 The area to the left of –1.00 is 0.1587. The percent of horseback rides that last less than 2.8 hours is 15.87%. 3.7 − 3.2 = 1.25 0.4 Area to left of 1.25 is .8944 = 89.44%. % above 1.25: 1 – 89.44% = 10.56%. Thus, 10.56% of horseback rides last at least 3.7 hours. z2.8 = 13.6179 Copyright 2013, 2010, 2007, Pearson, Education, Inc. z3.7 = 13.6180 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 30 1/20/2015 Example 5: Horseback Rides Example 5: Horseback Rides d) What percent of horseback rides are between 2.8 hours and 4.0 hours? Solution Convert 4.0 to a z-score. Solution 4.0 − 3.2 = 2.00 0.4 Area to left of 2.00 is .9722 = 97.22%. Percent below 2.8 is 15.87%. The percent of data between –1.00 and 2.00 is 97.22% – 15.87% = 81.58%. z4.0 = 13.6181 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Thus, the percent of horseback rides that last between 2.8 hours and 4.0 hours is 81.85%. 13.6182 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 5: Horseback Rides 13.6183 e) In a random sample of 500 horseback rides at Triple R Ranch, how many are at least 3.7 hours? Section 13.7 Solution In part (c), we determined that 10.56% of all horseback rides last at least 3.7 hours. Thus, 0.1056 × 500 = 52.8, or approximately 53, horseback rides last at least 3.7 hours. Linear Correlation and Regression Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. What You Will Learn Linear Correlation Linear Correlation Scatter Diagram Linear Regression Least Squares Line Linear correlation is used to determine whether there is a linear relationship between two quantities and, if so, how strong the relationship is. 13.7185 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.7186 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 31 1/20/2015 Linear Correlation Coefficient The linear correlation coefficient, r, is a unitless measure that describes the strength of the linear relationship between two variables. If the value is positive, as one variable increases, the other increases. If the value is negative, as one variable increases, the other decreases. The variable, r, will always be a value between –1 and 1 inclusive. 13.7187 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Scatter Diagrams Scatter Diagrams A visual aid used with correlation is the scatter diagram, a plot of points (bivariate data). The independent variable, x, generally is a quantity that can be controlled. The dependent variable, y, is the other variable. 13.7188 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Correlation The value of r is a measure of how far a set of points varies from a straight line. The greater the spread, the weaker the correlation and the closer the r value is to 0. The smaller the spread, the stronger the correlation and the closer the r value is to 1 or –1. 13.7189 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Correlation 13.7190 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Linear Correlation Coefficient The formula to calculate the correlation coefficient (r) is as follows. r= ( ) ( )( ) n (∑ x )− (∑ x ) n (∑ y )− (∑ y ) n ∑ xy − ∑ x ∑ y 2 13.7191 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.7192 2 2 2 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 32 1/20/2015 Example 1: Number of Absences Versus Number of Defective Parts Example 1: Number of Absences Versus Number of Defective Parts Egan Electronics provided the following daily records about the number of assembly line workers absent and the number of defective parts produced for 6 days. Determine the correlation coefficient between the number of workers absent and the number of defective parts produced. 13.7193 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.7194 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.7196 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Number of Absences Versus Number of Defective Parts Solution Here’s the scatter diagram. 13.7195 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 1: Number of Absences Versus Number of Defective Parts Example 1: Number of Absences Versus Number of Defective Parts Solution Find r. Solution r= ( ) ( )( ) n (∑ x )− (∑ x ) n (∑ y )− (∑ y ) 6 (387)− (17)(106) 6 (75)− (17) 6 (2002)− (106) n ∑ xy − ∑ x ∑ y 2 2 r= 13.7197 2 Copyright 2013, 2010, 2007, Pearson, Education, Inc. r= 2 2 2322 − 1802 ( ) ( ) 6 75 − 289 6 2002 − 11,236 r= 2 13.7198 520 450 − 289 13,212 − 11,236 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 33 1/20/2015 Example 1: Number of Absences Versus Number of Defective Parts Solution r= 520 ≈ 0.922 161 1976 Since the maximum possible value for r is 1.00, a correlation coefficient of 0.922 is a strong, positive correlation. This result implies that, generally, the more assembly line workers absent, the more defective parts produced. 13.7199 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Linear Regression Linear Regression Linear regression is the process of determining the linear relationship between two variables. 13.7200 Copyright 2013, 2010, 2007, Pearson, Education, Inc. The Line of Best Fit The equation of the line of best fit is The line of best fit (regression line or the least squares line) is the line such that the sum of the squares of the vertical distances from the line to the data points (on a scatter diagram) is a minimum. y = mx + b, where ) ( )(∑ y ), n (∑ x )− (∑ x ) ∑ y − m (∑ x ) b= m= ( n ∑ xy − ∑ x and 2 2 n 13.7201 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.7202 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 3: The Line of Best Fit Example 3: The Line of Best Fit a) Use the data in Example 1 to find the equation of the line of best fit that relates the number of workers absent on an assembly line and the number of defective parts produced. b) Graph the equation of the line of best fit on a scatter diagram that illustrates the set of bivariate points. Solution From Example 1, we know that 13.7203 Copyright 2013, 2010, 2007, Pearson, Education, Inc. m= ( ) ( )(∑ y ) n (∑ x )− (∑ x ) n ∑ xy − ∑ x 2 = 13.7204 2 520 ≈ 3.23 161 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 34 1/20/2015 Example 3: The Line of Best Fit Example 3: The Line of Best Fit Solution Now, find the y-intercept, b. ∑y − m ∑x b= n 106 − 3.23 17 = 6 Solution ( ) ( ) ≈ 13.7205 The equation of the line of best fit is y = mx + b y = 3.23x + 8.52 51.09 ≈ 8.52 6 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Example 3: The Line of Best Fit 13.7206 Example 3: The Line of Best Fit Solution To graph y = 3.23x + 8.52, plot at least two points and draw the graph. x 2 4 6 13.7207 x 2 4 6 y 14.98 21.44 27.90 Copyright 2013, 2010, 2007, Pearson, Education, Inc. Copyright 2013, 2010, 2007, Pearson, Education, Inc. 13.7208 y 14.98 21.44 27.90 Copyright 2013, 2010, 2007, Pearson, Education, Inc. 35
