Aussie Maths & Science Teachers: Save your time with SmarterEd
Ashan's mathematics class needs to complete six tests, each worth 100 marks.
After completing the first five tests, Ashan calculated that he would need a mark of 90 in the final test in order to have a mean mark of 80 for the six tests.
What was Ashan's mean mark after completing the first five tests?
Consider the following dataset.
`{:[13,16,17,17,21,24]:}`
Which row of the table shows how the median and mean are affected when a score of 5 is added to the dataset?
\(38 \ \ 25 \ \ 38 \ \ 46 \ \ 55 \ \ 68 \ \ 72 \ \ 55 \ \ 36 \ \ 38\)
--- 4 WORK AREA LINES (style=lined) ---
--- 5 WORK AREA LINES (style=lined) ---
Consider the following dataset.
`1 5 9 10 15`
Suppose a new value, `x`, is added to this dataset, giving the following.
`1 5 9 10 15 x`
It is known that `x` is greater than 15. It is also known that the difference between the means of the two datasets is equal to ten times the difference between the medians of the two datasets.
Calculate the value of `x`. (4 marks)
--- 8 WORK AREA LINES (style=lined) ---
Jamal surveyed eight households in his street. He asked them how many kilolitres (kL) of water they used in the last year. Here are the results.
`220, 105, 101, 450, 37, 338, 151, 205`
--- 1 WORK AREA LINES (style=lined) ---
--- 1 WORK AREA LINES (style=lined) ---
A small population consists of three students of heights 153 cm, 168 cm and 174 cm. Samples of varying sizes can be taken from this population.
What is the mean of the mean heights of all the possible samples? Justify your answer. (2 marks)
--- 4 WORK AREA LINES (style=lined) ---
A grouped data frequency table is shown.
\begin{array} {|c|c|}
\hline
\rule{0pt}{2.5ex} \textit{Class Interval} \rule[-1ex]{0pt}{0pt} & \ \ \ \ \ \textit{Frequency}\ \ \ \ \ \\
\hline
\rule{0pt}{2.5ex} \text{1 – 5} \rule[-1ex]{0pt}{0pt} & 3 \\
\hline
\rule{0pt}{2.5ex} \text{6 – 10} \rule[-1ex]{0pt}{0pt} & 6 \\
\hline
\rule{0pt}{2.5ex} \text{11 – 15} \rule[-1ex]{0pt}{0pt} & 8 \\
\hline
\rule{0pt}{2.5ex} \text{16 – 20} \rule[-1ex]{0pt}{0pt} & 9 \\
\hline
\end{array}
What is the mean for this set of data?
Vicki wants to investigate the number of hours spent on homework by students at her high school.
--- 2 WORK AREA LINES (style=lined) ---
The responses are shown in the frequency table.
What is the mean amount of time spent on homework? (2 marks)
--- 4 WORK AREA LINES (style=lined) ---
i. `text(A valid method would be using a stratified sample.)`
`text(The number of students sampled in each year is)`
`text(proportional to the size of each year.)`
| ii. |  |
| `text(Mean)` | `= text(Sum of Scores) / text(Total scores)` |
| `= 1455/200` | |
| `= 7.275\ text(hours)` |
The mean of a set of 5 scores is 62.
What is the new mean of the set of scores after a score of 14 is added?
What is the mean of the set of scores?
`3, \ 4, \ 5, \ 6, \ 6, \ 8, \ 8, \ 8, \ 15`
Consider the following set of scores:
`3, \ 5, \ 5, \ 6, \ 8, \ 8, \ 9, \ 10, \ 10, \ 50.`
--- 1 WORK AREA LINES (style=lined) ---
--- 5 WORK AREA LINES (style=lined) ---
Christina has completed three Mathematics tests. Her mean mark is 72%.
What mark (out of 100) does she have to get in her next test to increase her mean mark to 73%? (2 marks)
--- 5 WORK AREA LINES (style=lined) ---
The height of each student in a class was measured and it was found that the mean height was 160 cm.
Two students were absent. When their heights were included in the data for the class, the mean height did not change.
Which of the following heights are possible for the two absent students?
Twenty Year 12 students were surveyed. These students were asked how many hours of sport they play per week, to the nearest hour.
The results are shown in the frequency table.
\begin{array} {|c|c|}
\hline
\rule{0pt}{2.5ex} \textit{Hours per week} \rule[-1ex]{0pt}{0pt} & \ \ \ \ \ \textit{Frequency}\ \ \ \ \ \\
\hline
\rule{0pt}{2.5ex} \text{0 – 2} \rule[-1ex]{0pt}{0pt} & 5 \\
\hline
\rule{0pt}{2.5ex} \text{3 – 5} \rule[-1ex]{0pt}{0pt} & 10 \\
\hline
\rule{0pt}{2.5ex} \text{6 – 8} \rule[-1ex]{0pt}{0pt} & 3 \\
\hline
\rule{0pt}{2.5ex} \text{9 – 11} \rule[-1ex]{0pt}{0pt} & 2 \\
\hline
\end{array}
What is the mean number of hours of sport played by the students per week?
The heights of the players in a basketball team were recorded as 1.8 m, 1.83 m, 1.84 m, 1.86 m and 1.92 m. When a sixth player joined the team, the average height of the players increased by 1 centimetre.
What was the height of the sixth player?
The eye colours of a sample of children were recorded.
When analysing this data, which of the following could be found?
The mean of a set of ten scores is 14. Another two scores are included and the new mean is 16.
What is the mean of the two additional scores?
The July sales prices for properties in a suburb were:
$552 000, $595 000, $607 000, $607 000, $682 000, and $685 000.
On 1 August, another property in the same suburb was sold for over one million dollars.
If the property had been sold in July, what effect would it have had on the mean and median sale prices for July?