Data Analysis Exercises - Contact Essay

Exhibit 1.1: Frequency Distribution and Graphing with Excel

Figure 1: TechTicket ticket agency sales in the last 240 days

Q1 (b)

The shape of the histogram columns is normal distribution with a bell-shaped symmetrical density curve. Thus, the mean of the distribution equals its median (Berenson, 2014). The chart also has one peak at the center.
The shape of the graph can be altered by changing the class width. For instance, increasing the class width to 1,500 gives a new graph as shown below.

Figure 2: New graph after increasing the class width to1,000

Increasing the class width from 500 to 1,000 reduces the number of histogram columns. However, the shape of the distribution does not change; the shape of the histogram columns is normal distribution with a bell-shaped symmetrical density curve, mean of the distribution equals its median and the chart also has one peak at the center.

Q1 (c)

The assumption made here is that the data is normally distributed. With normal distribution, the data lean towards to a central value with no bias left or right (Gupta, 2016).

To obtain the mean and standard deviation of the data in the Exhibit 1;

Step 1: We first calculate the midpoints of the classes using the formula

Midpoint of interval = 0.5 (Lower class limit + Upper class limit)

Step 2: We multiply the frequency of each interval by its mid-point

Step 3: We obtain the sum of all the frequencies (f) and the sum of all the fx.

Table 1: Frequency table for Calculation of mean (See excel calculations)

Sales ($)

Number of days

Mid-point (x)

Frequency (f)

0 – 1,000

500

2500

1,000 – 1,500

1250

20000

1,500 – 2,000

1750

47250

2,000 – 2,500

2250

146250

2,500 – 3,000

2750

121000

3,000 – 4,000

3500

168000

4,000 – 5,000

4500

112500

5,000 – 10,000

7500

75000

Σ (Sum)

240

692500

To obtain the mean, we divide ‘sum of fx’ by ‘sum of f’ which in this case is 240 days. Thus the mea of the data in Exhibit 1 is given by

Mean=692,500/240= 2885.416667 ~ $2,885/day

The Standard Deviation of the same data is calculated using the formula

Table 1: Frequency table for calculation of standard deviation (See excel calculations)

Sales ($)

Number of days

Mid-point (x)

Frequency (f)

(x – )

(x – )²

(x – )²f

0 – 1,000

500

2500

-385

148546

742730.0347

1,000 – 1,500

1250

20000

400000000

6400000000

1,500 – 2,000

1750

47250

2232562500

60279187500

2,000 – 2,500

2250

146250

21389062500

1.39029E+12

2,500 – 3,000

2750

121000

14641000000

6.44204E+11

3,000 – 4,000

3500

168000

28224000000

1.35475E+12

4,000 – 5,000

4500

112500

12656250000

3.16406E+11

5,000 – 10,000

7500

75000

5625000000

56250000000

Σ (Sum)

240

692500

3.82858E+12

In our case, from Excel (see the attached worksheet), S if given by the

3.66865E+12/240 =123,636.7573~$123,636/day

From the report, two measures of central tendency could have been conducted; mode and median. This is because using mean would have skewed the results to the middle point of the 7 point scale and in this case the score would have been 4 and not 3.1 as given. For mode, the doctor could have looked at the most repeated score. With median, the doctor could easily picked the value that is at the middle which would have been 4 and not 3.1 as given.

Q3 (a)

Table 3: Tabulations of statistics (Please see the attached Excel doc.)

	Mel	Syd
Count	70.0	70.0
Mean	65.8	67.1
Median	65.8	66.5
Standard Deviation	4.0	6.1
Minimum,	55.7	55.8
Maximum,	77.0	81.8
Range,	21.3	26.0
1st Quartile,	63.9	62.3
3rd Quartile	68.5	71.5
IQR	4.6	9.1
Coefficient of Variation	6.1	9.1

Q3 (b) (i)

Table 3: A percentage frequency table (Please see the attached Excel doc.)

Syd	Percentage Value	Mel	Percentage Value
52.5	0%	52.5	0%
55	0%	55	0%
57.5	4%	57.5	3%
60	4%	60	6%
62.5	21%	62.5	7%
65	14%	65	23%
67.5	7%	67.5	29%
70	14%	70	19%
72.5	14%	72.5	10%
75	7%	75	3%
77.5	7%	77.5	1%