4. Data Analysis - Descriptive Statistics

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Data Analysis - Descriptive Statistics
Descriptive Statistics:
Ways of describing quantitative data + identifying patterns/trends using graphs, tables + summary statistics.
2. Data Analysis - Descriptive Statistics
Method - Measures of Central Tendency:
any measure of average value in set of data.
calculated differently for each situation.
Mean, Median, Mode.
2a. Data Analysis - Descriptive Statistics
Measures of Central Tendency - Mean:
add all data items; divide by number of items.
Strength - most sensitive measure of central tendency (takes account of exact distance between all values of all data).
Limitation - sensitivity = distorted by extreme values = unrepresentative.
2b. Data Analysis - Descriptive Statistics
Measures of Central Tendency - Median:
items in order; tick off each side until left w/ middle number.
2 middle numbers = find average (add , ÷ 2).
Strength - not affected by extreme scores, easier calculate than mean; used for ordinal data.
Limitation - not sensitive, exact values not reflected.
2c. Data Analysis - Descriptive Statistics
Measures of Central Tendency - Mode:
work out most common data item.
Strength - unaffected by extreme values; nominal data.
Limitation - not useful explaining data when more than one mode.
3. Data Analysis - Descriptive Statistics
Method - Measures of Dispersion:
based on spread scores - how dispersed (spread out) data items are.
3a. Data Analysis - Descriptive Statistics
Measures of Dispersion - Range:
find lowest value and highest value.
lowest - highest then +1.
Strength - easy calculate; provide margin of error (+1).
Limitation - affected by extreme values (outliers).
3c. Data Analysis - Descriptive Statistics
Measures of Dispersion - Standard Deviation:
measure of average distance between each data item above and below mean.
greater the standard deviation, greater the dispersion (spread) of data.
large standard deviation = not all participants affected by IV in same way; some anomalies.
small standard deviation = data is clustered around the mean; participants affected by IV in similar way.
Strength - sophisticated measure of dispersion bc considers exact values in data set.
Limitation - distorted by extreme values.
4. Data Analysis - Descriptive Statistics
Data Distributions:
When data displayed on graph, see bell curve.
Way the bell curve looks = find out how data distributed.
Use average then standard deviation to work out how data distributed.
4a. Data Analysis - Descriptive Statistics
Normal Distribution:
Classic bell-shaped curve + shows data equally distributed.
Mean, median, mode in exact midpoint.
Distribution is symmetrical around middle point.
Dispersion of scores either side of midpoint consistent and can be expressed w/ standard deviation.
4b. Data Analysis - Descriptive Statistics
Skewed Distributions:
In some population scores aren’t distributed equally around the mean = skewed distribution (positively/negatively skewed).
4c. Data Analysis - Descriptive Statistics
Skewed Distribution - Negatively Skewed:
right skewed - bulk of scores concentrated on right = anomalous results on left.
mean pulled to left (bc lower scorers minority).
mode, highest peak.
median middle.
4d. Data Analysis - Descriptive Statistics
Skewed Distributions - Positively Skewed:
left skewed; long tail on right.
mode, highest peak; median comes next, followed by mean (bc outliers pulling mean to right as it includes all scores).
4e. Data Analysis - Descriptive Statistics
What do Skewed Distributions Show?
mean not representative score - most scores either above (i.e. bigger than) or below (smaller than) the mean.
the mean shouldn’t be used as sole measure of tendency when distributions skewed.