Chapter 4
T/F 1. A sample systemically has less variability than a population. 2. The standard deviation is the distance from the mean to the farthest point on the distribution curve.
1. True; extreme scores affect variability, but less likely to be included in sample 2. False; standard deviation extends from mean about halfway to most extreme score
What are the two ways in computing SS?
Definitional Formula and Computational Formula
Range
Distance coved by scores in a distribution, from smallest to largest - For continuous data, real limits are:
Deviation
Distance from the mean
Variance
Equals the mean of the squared deviations ---> it's the average squared distance from the mean
What does low variability mean?
Existing patterns can be seen clearly
Does adding a constant to each score change the standard deviation?
No, but the mean is changed
What are the differences between population and sample variance?
Population Variance - mean is known - deviations are computed from a known mean Sample Variance - population mean is unknown - restricts variability
What is the formula for variance?
SS (sum of squares)= sum of squared deviations of scores from the mean
How does samples differ from population?
Samples have less variability
What is the most common and most important way in measuring variability?
Standard Deviation
The standard deviation measures....
Standard distance of a score from the mean
Does multiplying each score change the standard deviation?
Yes, both mean and standard deviation is changed Standard deviation is multiplied by the constant
What are 3 measures of variability?
range, variance, standard deviation
How to find Standard Deviation
the square root of the variance Variance is found as it equals the mean of the squared deviations
What is the purpose of measuring variability?
- Describe distribution of scores --> tells whether scores clustered close together or spread out over a large distance - Measure how well and individual score represents distribution
Sample variance and standard deviation
- Formula for variance has n-1 rather than N in the denominator - Used s instead of σ
Variability
- Quantitative distance measure based on differences between scores - Describes distance of spread of scores or distance of a score from mean
Population Variance and Standard Deviation
- Variance is average of squared deviations and represented as sigma squared: σ^2 - Standard deviation is square root of variance and represented as sigma: σ
T/F 1. A biased statistic has been influenced by researcher error. 2. On average, an unbiased sample statistic has the same value as the population parameter?
1. False; bias refers to systematic effect of using sample data to estimate population parameter 2. True; each sample's statistic differs from population parameter, but the average of all samples will equal the parameter
T/F 1. The computational and definitional formulas for SS sometimes give different results 2. If all the scores in a data set are the same, the Standard Deviation is equal to 1
1. False; results should be identical because computational formula is algebraic rearrangement of definitional formula 2. False; when all the scores are the same, they are all equal to the mean, their deviations=0 as well as their standard deviation
Definitional Formula
1. Find each deviation score 2. Square each deviation score 3. Sum squared deviations
Computational Formula
1. Square each score and sum squared scores 2. Find sum of scores, square it, divide by N 3. Subtract second part from first
How do you know if the sample statistics are unbiased or biased to population parameter?
If sample stats is UNBIASED, then the average value of the stats is equal to the population parameter If sample stats is BIASED, then the average value of the stats is underestimates/overestimated with the population parameter
What does standard deviation describe?
It describes variability by measuring distance from the mean
What does the vertical line in the "center" mean in a population and sample graph?
It is the location of the mean Horizontal line to right, left or both denotes distance of one standard deviation
What is the goal of inferential statistics?
It is used to detect meaningful and significant patterns in research results
What does high variability mean?
It means that it obscure any patterns that might have exist and be visible in low variability samples Variability also called error variance
Standard Deviation
Measure of the standard, or average, distance from the mean Describes whether scores are clustered closely around mean or widely scattered
Degrees of freedom
df= n-1