Discussion | This Discussion will give you the opportunity to calculate or identify the three measures of central tendency. You will be asked to select an appropriate real life situation in which one measure would be more appropriate than the other two measures of center. 1. Select a topic of interest to you and record the topic in your posting‚ for example: “What is the average number of hours people watch TV every week?” Make sure the question you ask will be answered with a number‚ rather
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Mean‚ Median‚ Mode‚ and Range Mean‚ median‚ and mode are three kinds of "averages". There are many "averages" in statistics‚ but these are‚ I think‚ the three most common‚ and are certainly the three you are most likely to encounter in your pre-statistics courses‚ if the topic comes up at all. The "mean" is the "average" you are used to‚ where you add up all the numbers and then divide by the number of numbers. The "median" is the "middle" value in the list of numbers. To find the median‚ your
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3.1 Measures of Central Tendency (Page 1 of 16) 3.1 Measures of Central Tendency Mean‚ Median and Mode a. mean‚ x = Example 1 b. ! x = sum of the entries n number of entries Find the mean of 26‚ 18‚ 12‚ 31‚ 42 The median is the middle value of an ordered set of data. If there is an even number of data values‚ then the median is the mean of the two middle values. Example 2 Find the median of 25‚ 30‚ 37‚ 21‚ 38 Example 3 Find the median of 3‚ 7‚ 9‚ 4‚ 8‚ 2‚ 6‚ 5 c. The mode is the
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Sampling and Measures of Central Tendency and Dispersion Introduction: Overall Job Satisfaction (OJS) was the variable selected for this exercise because it lends itself to measures of central tendency and dispersion. The data are quantitative and continuous in nature. Data Selected: The instructions for the exercise suggested a sample of approximately 30 individuals from one of eight variables. There were 288 measures of OJS. Every ninth individual was selected resulting in thirty-two
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Subject: Math – Measures of Central Tendency Grade: 6th GLE Standard: Mathematics - Data and Probability. 2. Select and use appropriate statistical methods to analyze data. A. Describe and analyze data - find the range and measures of center‚ including median‚ mode‚ and mean. Materials: - Bag of mixed candy‚ or something comparable the students can sort and count - Whiteboard/blackboard - Computer and display ability - Legal sized paper or construction paper Objectives/Learning Targets:
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1 Measures of Central Tendency “Measures of central tendency (averages) are statistical constants which enable us to figure out in a single effort the significance of the whole.” (Prof Bowley) The main objectives of measure of central tendency are To reduce data in a single value. To make easy comparisons between data. There are different types of averages; each has its own business applications. 1. Arithmetic Mean 2. Median 3. Mode 4. Geometric Mean 5. Harmonic Mean 1.1 Arithmetic
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What is central tendency? Explain three important measures of central tendency? • Measures of central tendency are scores that represent the center of the distribution. Three of the most common measures of central tendency are: – • Mean Median Mode – – The Mean The mean is the arithmetic average of the scores. – Mean is the average of the scores in a distribution _ X = _________ i N Σ Xi Mean Example Exam Scores 75 91 82 78 72 94 68 88
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Statistics: Median‚ Mode and Frequency Distribution Given a list of numbers‚ The median is the “middle value” of a list. It is the smallest number such that at least half the numbers in the list are no greater than it. If the list has an odd number of entries‚ the median is the middle entry in the list after sorting the list into increasing order. If the list has an even number of entries‚ the median is equal to the sum of the two middle (after sorting) numbers
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Statistics (Measures of Central Tendency) Central Tendency: In a representative sample‚ the value of a series of data have a tendency to cluster around a certain point usually at the center of the series is usually called central tendency and its numerical measures are called the measures of central tendency or measures of location. Different Measures of Central Tendency: The following are the important measures of central tendency which are generally used in business: Arithmetic mean Geometric
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| | | | | | | | | | | | | | | | | I. Calculate the mean‚ median‚ and mode for the following scores: | | | | | | | | | | A. 5‚2‚8‚2‚3‚2‚4‚0‚6Mean: 3.56Median: 3 Mode: 2 | | | | | | | | | | | | | | | B. 30‚ 20‚ 17‚ 12‚ 30‚ 30‚ 14‚ 19Mean: 21.5 Median: 19.5Mode: 30 | | | | | | | | | | | | | C. 1.5‚ 4.5‚ 3.2‚ 1.8‚ 5.0‚ 2.2Mean: 3.03Median: 2.7Mode: No mode | | | | | | | | | | | | | | | | | | | | | | | |
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