Number_gap-2026_672
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
Variant 0
DifficultyLevel
671
Question
Jocasta knows that 480 ÷ 16 = 30.
What is 4.8 ÷ 0.16?
Worked Solution
|
|
| 4.8 ÷ 0.16 |
= 0.164.8 |
|
= 1.648 |
|
= 16480 |
|
= 30 |
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Jocasta knows that 480 ÷ 16 = 30.
What is 4.8 ÷ 0.16? |
| workedSolution |
| | |
| ------------------:| -------------------------------------------------- |
| 4.8 ÷ 0.16 | \= $\dfrac{4.8}{0.16}$ |
| | \= $\dfrac{48}{1.6}$ |
| | \= $\dfrac{480}{16}$ |
| | \= {{{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 | 30 | |
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
Variant 1
DifficultyLevel
673
Question
Casey knows that 756 ÷ 27 = 28.
What is 75.6 ÷ 2.7?
Worked Solution
|
|
| 75.6 ÷ 2.7 |
= 2.775.6 |
|
= 27756 |
|
= 28 |
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Casey knows that 756 ÷ 27 = 28.
What is 75.6 ÷ 2.7? |
| workedSolution |
| | |
| ------------------:| -------------------------------------------------- |
| 75.6 ÷ 2.7 | \= $\dfrac{75.6}{2.7}$ |
| | \= $\dfrac{756}{27}$ |
| | \= {{{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 | 28 | |
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
Variant 2
DifficultyLevel
674
Question
Jono knows that 644 ÷ 28 = 23.
What is 6.44 ÷ 0.028?
Worked Solution
|
|
| 6.44 ÷ 0.028 |
= 0.0286.44 |
|
= 0.2864.4 |
|
= 2.8644 |
|
= 286440 |
|
= 230 |
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Jono knows that 644 ÷ 28 = 23.
What is 6.44 ÷ 0.028? |
| workedSolution |
| | |
| ------------------:| -------------------------------------------------- |
| 6.44 ÷ 0.028 | \= $\dfrac{6.44}{0.028}$ |
| | \= $\dfrac{64.4}{0.28}$ |
| | \= $\dfrac{644}{2.8}$ |
| | \= $\dfrac{6440}{28}$ |
| | \= {{{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 | 230 | |
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
Variant 3
DifficultyLevel
675
Question
Paul knows that 1125 ÷ 45 = 25.
What is 11.25 ÷ 0.045?
Worked Solution
|
|
| 11.25 ÷ 0.045 |
= 0.04511.25 |
|
= 0.45112.5 |
|
= 4.51125 |
|
= 4511250 |
|
= 451125 × 10 |
|
= 25 × 10 |
|
= 250 |
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Paul knows that 1125 ÷ 45 = 25.
What is 11.25 ÷ 0.045? |
| workedSolution |
| | |
| ------------------:| -------------------------------------------------- |
| 11.25 ÷ 0.045 | \= $\dfrac{11.25}{0.045}$ |
| | \= $\dfrac{112.5}{0.45}$ |
| | \= $\dfrac{1125}{4.5}$ |
| | \= $\dfrac{11250}{45}$ |
| | \= $\dfrac{1125}{45}$ $\times$ 10 |
| | \= 25 $\times$ 10 |
| | \= {{{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 | 250 | |
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
Variant 4
DifficultyLevel
676
Question
Lena knows that 875 ÷ 25 = 35.
What is 8.75 ÷ 250?
Worked Solution
|
|
| 8.75 ÷ 250 |
= 2508.75 |
|
= 250087.5 |
|
= 25000875 |
|
= 25875÷1000 |
|
= 35÷1000 |
|
= 0.035 |
Question Type
Answer Box
Variables
| Variable name | Variable value |
| question | Lena knows that 875 ÷ 25 = 35.
What is 8.75 ÷ 250? |
| workedSolution |
| | |
| ------------------:| -------------------------------------------------- |
| 8.75 ÷ 250 | \= $\dfrac{8.75}{250}$ |
| | \= $\dfrac{87.5}{2500}$ |
| | \= $\dfrac{875}{25000}$ |
| | \= $\dfrac{875}{25} \div 1000$ |
| | \= $35 \div 1000$ |
| | \= {{{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 | 0.035 | |