The standard deviation alone does not measure relative variation. For example, a standard deviation of $1 would be considered large if it is describing the variability from store to store in the price of an ice cube tray. On the other hand, a standard deviation of $1 would be considered small if it is describing store-to-store variability in the price of a particular brand of freezer. A quantity designed to give a relative measure of variability is the coefficient of variation. Denoted by CV, the coefficient of variation expresses the standard deviation as a percentage of the mean. It is defined by the formula CV = 100(s/ x ). Consider two samples. Sample 1 gives the actual weight (in ounces) of the contents of cans of pet food labeled as having a net weight of 8 oz. Sample 2 gives the actual weight (in pounds) of the contents of bags of dry pet food labeled as having a net weight of 50 lb. There are weights for the two samples.

Sample 1	6.9	5.7	5.1	6.3	5.1
	6.9	6.3	5.5	5.5	5.6
Sample 2	50.3	52.2	52.4	50.7	51.9
	47	50.4	50.3	48.7	48.2

(a) For each of the given samples, calculate the mean and the standard deviation. (Round all intermediate calculations and answers to five decimal places.)

For sample 1
Mean
Standard deviation

For sample 2
Mean
Standard deviation

(b) Compute the coefficient of variation for each sample. (Round all answers to two decimal places.)

CV1
CV2