Number, NAPX-E4-NC28 SA
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
Variant 0
DifficultyLevel
729
Question
Write the answer to this division in the box.
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.1224.36 |
= 0.12×10024.36×100 |
|
= 122436 |
|
= 203 |
∴ 24.36 ÷ 0.12 = 203
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box. |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{24.36}{0.12}$ | \= $\dfrac{24.36 \times 100}{0.12\times 100}$ |
| | \= $\dfrac{2436}{12}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 24.36 ÷ 0.12 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 203 | |
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
Variant 1
DifficultyLevel
725
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.0510.55 |
= 0.05×10010.55×100 |
|
= 51055 |
|
= 211 |
∴ 10.55 ÷ 0.05 = 211
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{10.55}{0.05}$ | \= $\dfrac{10.55 \times 100}{0.05\times 100}$ |
| | \= $\dfrac{1055}{5}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 10.55 $\div$ 0.05 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 211 | |
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
Variant 2
DifficultyLevel
726
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.1428.14 |
= 0.14×10028.14×100 |
|
= 142814 |
|
= 201 |
∴ 28.14 ÷ 0.14 = 201
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{28.14}{0.14}$ | \= $\dfrac{28.14 \times 100}{0.14\times 100}$ |
| | \= $\dfrac{2814}{14}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 28.14 $\div$ 0.14 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 201 | |
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
Variant 3
DifficultyLevel
727
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.0318.36 |
= 0.03×10018.36×100 |
|
= 31836 |
|
= 612 |
∴ 18.36 ÷ 0.03 = 612
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{18.36}{0.03}$ | \= $\dfrac{18.36 \times 100}{0.03\times 100}$ |
| | \= $\dfrac{1836}{3}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 18.36 $\div$ 0.03 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 612 | |
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
Variant 4
DifficultyLevel
728
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 100
|
|
| 0.12108.24 |
= 0.12×100108.24×100 |
|
= 1210824 |
|
= 902 |
∴ 108.24 ÷ 0.12 = 902
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 100
>| | |
| --------------------- | -------------- |
| $\dfrac{108.24}{0.12}$ | \= $\dfrac{108.24 \times 100}{0.12\times 100}$ |
| | \= $\dfrac{10824}{12}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 108.24 $\div$ 0.12 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 902 | |
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
Variant 5
DifficultyLevel
724
Question
Write the answer to this division in the box
Worked Solution
One strategy:
Multiplying numerator and denominator by 10
|
|
| 0.372.6 |
= 0.3×1072.6×10 |
|
= 3726 |
|
= 242 |
∴ 72.6 ÷ 0.3 = 242
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Write the answer to this division in the box |
| workedSolution | One strategy:
Multiplying numerator and denominator by 10
>| | |
| --------------------- | -------------- |
| $\dfrac{72.6}{0.3}$ | \= $\dfrac{72.6 \times 10}{0.3\times 10}$ |
| | \= $\dfrac{726}{3}$ |
|| \= {{{correctAnswer0}}}|
>$\therefore$ 72.6 $\div$ 0.3 = {{{correctAnswer0}}} |
| correctAnswer0 | |
| prefix0 | |
| suffix0 | |
Answers
Specify one or more 'ANSWER' block(s) as exampled below.
Note: correctAnswer is required, the rest are optional. ("correctAnswer" is what the student would need to type in to the box to get the answer correct.)
For example:
correctAnswer: 123.40
And optionally, specify the following, but only if you need something different to the defaults: 'width' defaults to 5 if not present, and valid values are 3 to 10; 'prefix' and 'suffix' default to nothing if not present.
prefix: $
suffix: mm$^2$
width: 5
| correctAnswerN | correctAnswerValue | Answer |
| correctAnswer0 | 242 | |