50147
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
Variant 0
DifficultyLevel
475
Question
Christie measured the temperature every 3 hours from 6:00 am to 3:00 pm..
| Time of the day |
6:00 am |
9:00 am |
12:00 pm |
3:00 pm |
| Temperature (°C) |
22 |
27 |
32 |
26 |
Which graph shows Christie's results?
Worked Solution
1st increase = 27 − 22 = 5°
2nd increase = 32 − 27 = 5°
⇒ Temperature then drops 6° to 26°
Question Type
Multiple Choice (One Answer)
Variables
| Variable name | Variable value |
| question | Christie measured the temperature every 3 hours from 6:00 am to 3:00 pm..
>>| Time of the day | 6:00 am |9:00 am |12:00 pm |3:00 pm |
|:-:|:-:|:-:|:-:|:-:|
| Temperature ($\degree$C) | 22|27|32|26|
Which graph shows Christie's results? |
| workedSolution | 1st increase = 27 − 22 = 5°
2nd increase = 32 − 27 = 5°
$\Rightarrow$ Temperature then drops 6° to 26°
{{{correctAnswer}}} |
| correctAnswer | sm_img https://teacher.smartermaths.com.au/wp-content/uploads/2019/01/NAPX-G2-15v1-b.svg 130 indent vpad |
Answers
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
Variant 1
DifficultyLevel
472
Question
Darren measured the temperature every 3 hours from 6:00 am to 3:00 pm.
| Time of the day |
6:00 am |
9:00 am |
12:00 pm |
3:00 pm |
| Temperature (°C) |
18 |
25 |
28 |
27 |
Which graph shows Darren's results?
Worked Solution
1st increase = 25 − 18 = 7°
2nd increase = 28 − 25 = 3°
⇒ Temperature then drops 1° to 27°
Question Type
Multiple Choice (One Answer)
Variables
| Variable name | Variable value |
| question | Darren measured the temperature every 3 hours from 6:00 am to 3:00 pm.
>>| Time of the day | 6:00 am |9:00 am |12:00 pm |3:00 pm |
|:-:|:-:|:-:|:-:|:-:|
| Temperature ($\degree$C) | 18|25|28|27|
Which graph shows Darren's results? |
| workedSolution | 1st increase = 25 − 18 = 7°
2nd increase = 28 − 25 = 3°
$\Rightarrow$ Temperature then drops 1° to 27°
{{{correctAnswer}}} |
| correctAnswer | sm_img https://teacher.smartermaths.com.au/wp-content/uploads/2019/01/NAPX-G2-15v2-c.svg 130 indent vpad |
Answers
