For the following surveys, state whether the data found should be grouped or ungrouped when constructing a frequency table:
A survey conducted of 1000 people, asking them how many languages they speak.
A survey conducted of 1000 people, asking them how many different countries they know the names of.
Find the class centre of the following class intervals:
27 - 40
19 \leq t < 23
If one of the class intervals for height is 10 < \text{height} \leq 19, find the next equal-width class interval.
If the range of a set of continuous data is 28, find the size of each class interval if we group the data into:
4 equal-width class intervals.
7 equal-width class intervals.
Construct a grouped frequency table for the following data:
46,\enspace 54,\enspace 35,\enspace 23,\enspace 24,\enspace 28,\enspace 26,\enspace 11,\enspace 19,\enspace 17,\enspace 32
83,\enspace 68,\enspace 39,\enspace 42,\enspace 86,\enspace 66,\enspace 64,\enspace 76,\enspace 63,\enspace 43,\enspace 65,\enspace 83,\enspace 63,\enspace\\ 67,\enspace 49,\enspace 51,\enspace 32,\enspace 55,\enspace 38,\enspace 65,\enspace 41,\enspace 73,\enspace 35,\enspace 36,\enspace 74
Consider the following set of scores:
30,\enspace 67,\enspace 24,\enspace 51,\enspace 49,\enspace 53,\enspace 36,\enspace 24,\enspace 57,\enspace 66,\enspace 26
Determine a set of five class intervals that could be used to analyse this data.
Construct a grouped frequency table for the data.
Consider the following set of scores:
12,\enspace 59,\enspace 61,\enspace 27,\enspace 58,\enspace 18,\enspace 76,\enspace 27,\enspace 52,\enspace 19,\enspace 13,\enspace 56,\enspace 71,\enspace 31,\enspace 73,\enspace \\ 60,\enspace 41,\enspace 17,\enspace 22,\enspace 68,\enspace 57,\enspace 15,\enspace 40,\enspace 19,\enspace 76,\enspace 44,\enspace 60,\enspace 55,\enspace 36
Determine a set of seven class intervals that could be used to analyse this data.
Construct a grouped frequency table for the data.
Construct a frequency table for the following column graphs:
Consider the following frequency table:
Class interval | Class centre | Frequency |
---|---|---|
21.5 \leq p < 24.5 | 23 | 3 |
24.5 \leq p < 27.5 | 26 | 3 |
27.5 \leq p < 30.5 | 29 | 0 |
30.5 \leq p < 33.5 | 32 | 9 |
33.5 \leq p < 36.5 | 35 | 5 |
36.5 \leq p < 39.5 | 38 | 4 |
39.5 \leq p < 42.5 | 41 | 2 |
Construct a frequency polygon from this data.
How many values are in the class interval 27.5 \leq p < 30.5?
How many values fall between 24.5 inclusive, and 36.5?
How many values are below 33.5?
How many values are above and including 30.5?
Consider the following frequency table:
Construct a frequency polygon from this data.
How many values are in the class 27.5 to 30.5?
How many values fall between 24.5 and 36.5?
How many values are below 33.5?
How many values are above 30.5?
Class limits | Midpoint | Frequency |
---|---|---|
21.5 - 24.5 | 23 | 1 |
24.5 - 27.5 | 26 | 5 |
27.5 - 30.5 | 29 | 0 |
30.5 - 33.5 | 32 | 8 |
33.5 - 36.5 | 35 | 5 |
36.5 - 39.5 | 38 | 3 |
39.5 - 42.5 | 41 | 1 |
A survey was conducted which asked 30 people how many books they had read in the past month. Based on the frequency table provided, state whether the following statements are correct:
11 people have read from 6 to 10 books in the past month.
28 people have read at most 15 books in the past month.
We cannot determine from the table how many people have read exactly 12 books.
We can determine that 2 people have read exactly 5 books in the past month.
Number of books read | Frequency |
---|---|
1-5 | 2 |
6-10 | 11 |
11-15 | 15 |
16-20 | 2 |
The following frequency table below shows the resting heart rate of some people taking part in a study:
Complete the table.
How many people took part in the study?
How many people had a resting heart rate between 55 and 74?
How many people had a resting heart rate of below 65?
Heart Rate | Class Centre | Frequency |
---|---|---|
45-54 | 15 | |
55-64 | 25 | |
65-74 | 26 | |
75-84 | 30 |
In product testing, the number of faults detected in producing a certain machinery is recorded each day for several days. The frequency table shows the results:
Construct a bar chart to represent the data.
What is the lowest possible number of faults that could have been recorded on any particular day?
Number of faults | Frequency |
---|---|
0 - 3 | 10 |
4 - 7 | 14 |
8 - 11 | 20 |
12 - 15 | 16 |
The following frequency table shows the average time spent travelling to work for 50 people:
Commute time (minutes) | Frequency |
---|---|
0\leq \text{time} \lt 20 | 14 |
20\leq \text{time} \lt 40 | 16 |
40 \leq \text{time} \lt60 | 10 |
60 \leq \text{time} \lt 80 | 7 |
80\leq \text{time} \lt 100 | 3 |
\text{Total} | 50 |
State whether the following statements about the data are accurate:
The data shows that most people travel to work by car or by walking, since most travel times are fairly short, and only a few people travel by bus or train.
The data suggests that people prefer a shorter commute to work. A majority live within 40 minutes travel, and in general the longer the commute the less people there are in that category.
The data suggests that people don't care too much about how far away from work they live. Roughly equal portions of people live less than 40 minutes away and more than 40 minutes away.
The data shows that everyone lives within an hours travel from their work, with the peak amount of people living between 20 and 40 minutes away.
As part of a fuel watch initiative, the price of petrol, p, at a service station was recorded each day for 21 days. The frequency table shows the findings:
Price (in cents per litre) | Class Centre | Frequency |
---|---|---|
120.9 < p \leq 125.9 | 123.4 | 4 |
125.9 < p \leq 130.9 | 128.4 | 6 |
130.9 < p \leq 135.9 | 133.4 | 5 |
135.9 < p \leq 140.9 | 138.4 | 6 |
Find the highest price that could have been recorded.
How many days was the price above 130.9 cents?
The following frequency table shows the price of the most recent book that seventy two university students bought:
Which groups represent peaks in the data set?
Describe what the data shows regarding the price university students generally pay for their books.
\text{Price }( \$ ) | \text{Frequency} |
---|---|
0-19 | 6 |
20-39 | 20 |
40-59 | 12 |
60-79 | 6 |
80-99 | 19 |
100-119 | 9 |
\text{Total} | 72 |
The following frequency table shows the data distribution for the length of leaves (in millimetres) collected from a species of tree in the botanical gardens:
How many leaves less than 60 \text{ mm} were collected?
What was the most common interval of leaf length collected?
Are leaves more likely to be at least 60 \text{ mm} in length?
Can we conclude from the table that there were no leaves collected with a length less than 5 \text{ mm}? Explain your answer.
Leaf length | Frequency |
---|---|
0 \leq x \lt 20 | 5 |
20\leq x \lt 40 | 11 |
40\leq x \lt 60 | 19 |
60\leq x \lt 80 | 49 |
80\leq x \lt 84 | 43 |