30051
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
Variant 0
DifficultyLevel
543
Question
Karen needs 3475 centimetres of ribbon for a science project.
Choose an equivalent length of ribbon for Karen to use.
Worked Solution
Convert cm to metres ⇒ Divide by 100
3475 cm=1003475=34.75=34 metres and 75 centimetres
Question Type
Multiple Choice (One Answer)
Variables
| Variable name | Variable value |
| question | Karen needs 3475 centimetres of ribbon for a science project.
Choose an equivalent length of ribbon for Karen to use. |
| workedSolution | Convert cm to metres $\Rightarrow$ Divide by 100
$\begin{aligned} 3475 \ \text{cm} &= \frac{3475}{100} \cr
&=34.75 \cr &=34\ \text{metres and } \ 75\ \text{centimetres}
\end{aligned}$ |
| correctAnswer | 34 metres and 75 centimetres |
Answers
| Is Correct? | Answer |
| ✓ | 34 metres and 75 centimetres |
| x | 3 metres and 475 centimetres |
| x | 34 centimetres and 75 millimetres |
| x | 347 centimetres and 5 millimetres |
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Variant 1
DifficultyLevel
544
Question
Morris bought a compact car that is 1515 millimetres long.
An equivalent car length is:
Worked Solution
1000 millimetres = 1 metre.
∴ 1515 mm = 1 metre and 515 millimetres
Question Type
Multiple Choice (One Answer)
Variables
| Variable name | Variable value |
| question | Morris bought a compact car that is 1515 millimetres long.
An equivalent car length is:
|
| workedSolution | 1000 millimetres = 1 metre.
$\therefore$ 1515 mm = {{{correctAnswer}}} |
| correctAnswer | 1 metre and 515 millimetres |
Answers
| Is Correct? | Answer |
| x | 15 metres and 15 millimetres |
| ✓ | 1 metre and 515 millimetres |
| x | 1 metre and 515 centimetres |
| x | 1 metre and 15 centimetres |