A quality characteristic of interest for a tea-bag-filling process is the weight of the tea in the individual bags. If the bags are under filled, two problems arise. First, customers may not be able to brew the tea to be as strong as they wish. Second, the company may be in violation of the truth-in-labeling laws. In this example, the label weight on the package indicates that, on average, there are 3.40 grams of tea in a bag. If the average amount of tea in a bag exceeds the label weight, the company is giving away product. Getting an exact amount of tea in a bag is problematic because of variation in the temperature and humidity inside the factory, differences in the density of the tea, and the extremely fast filling operation of the machine (approximately 215 bags a minute). The following table provides the weight in grams of a sample of 50 bags produced in one hour by a single machine:

2.95

3.70

3.42

3.40

3.53

2.54

3.54

3.45

3.52

4.2

3.57

3.40

3.83

2.54

3.55

2.62

3.66

3.46

2.64

3.51

3.67

3.40

3.47

3.61

2.53

3.32

2.67

3.29

3.49

3.55

3.77

3.57

3.42

3.58

3.68

3.50

3.32

3.50

3.53

2.58

3.61

3.45

3.44

3.25

3.56

3.63

3.50

2.57

3.67

3.36

Task:

– Compute the arithmetic meanand median.

– Compute the first quartile and third quartile.

– Compute the range, inter-quartile range, variance, standard deviation, and coefficient of variation.

– Interpret the measures of central tendencywithin the context of this problem. Why should the company producing the tea bags be concerned about the central tendency?

– Interpret the measures of variation within the context of this problem. Why should the company producing the tea bags be concerned about variation?

Please see the attachments for the mathematical calculations.

Interpret the measures of central tendency within the context of this problem. Why should the company producing the tea bags be concerned about the central tendency?

Measures of central tendency such as mean, median etc. describes the tendency of the observations to cluster round some central value. This central value gives an idea of the location of the distribution and may be used as a typical value or representative value of the distribution.

Mean is defined as the arithmetic average of data, that is, the sum of all the numbers divided by the number of observations contributing to that sum. The …

This solution provides a step by step method for the calculation of descriptive statistics. Formula for the calculation and Interpretations of the results are also included. Attachment files, both in Excel and Word need to be opened.