Chapter 3 Math
If all the data values in a set are identical, what can you conclude about the standard deviation?
The standard deviation is zero.
Central Tedency
Center around a particular value to gather in a category rather than spread themselves across the range among the available categories
What is an advantage of using the range as a measure of variation?
It is easy to compute.
What is a disadvantage of using the range as a measure of variation?
It uses only two entries from the data set
Which is not a measure of dispersion?
Mean
Which measure of center must be equal to an actual data value? Explain why.
Since the mode is the most frequent observation that occurs in the data set, it must be an actual value from the data set.
If a professor adds 10 points to each student's final exam score, how will it affect the distribution of final exam scores?
The center will change, but the shape and spread will remain the same
If the standard deviation for a data set is zero, what can you conclude about the data?
The data values must all be equal.
Which statement is not true regarding the mean?
The mean is always the best measure of center.
Which statement is not true regarding the median?
The median is always one of the values in the data set.
Which measure of center (mean or median) is resistant? Explain what it means for that measure to be resistant.
The median is resistant because it is not sensitive to extreme values in the data set. If the largest observation was doubled, for example, the median would not change since that largest value does not factor into its computation.
If the standard deviation of a variable is 0, then the mean is equal to the median.
True
The range measures the spread of a distribution. It is the distance from the smallest value to the largest value. Is the range sensitive to the presence of outliers?
Yes
Mean
average not a resistant measure
What measure of central tendency best describes the "center" of the distribution?
median
Median
the middle score in a distribution; half the scores are above it and half are below it a resistant measure
Mode
the most frequently occurring score(s) in a distribution a resistant measure
In distributions that are skewed to the right, what is the relationship of the mean, median, and mode?
mean > median > mode
The data value that occurs with the greatest frequency is called the
mode
In distributions that are skewed to the left, what is the relationship of the mean, median, and mode?
mode > median > mean
Variance is the square root of standard deviation.
False
Which distribution shape (skewed left, skewed right, or symmetric) is most likely to result in the mean being substantially smaller than the median?
A distribution that is skewed left will likely have a mean that is smaller than the median since the extreme values in the tail tend to pull the mean to the left.
Explain the relationship between variance and standard deviation. Can either of these measures be negative? Explain.
The standard deviation is the positive square root of the variance. The standard deviation and variance can never be negative. Squared deviations can never be negative.
Explain why it is misleading to use the term "average" to describe your typical bowling score.
The word "average" is ambiguous and can refer to any measure of center. It is better to use the specific measure of center you intend mean, median, or mode.
Name and describe the three most important measures of center.
The mean, median, and mode are the most important measures of center. The mean of a data set is its arithmetic average. The median of a data set is the middle value in its ordered list. The mode of a data set is its most frequently occurring value.
When comparing two populations with the same variable of interest in the same unit of measure, the larger the standard deviation, the (blank) dispersion there is in the distribution.
Mode
