Number, NAP 38-2025

Question

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Worked Solution

{{{workedSolution}}}

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

Variant 0

DifficultyLevel

373

Question

What fraction of the stars are shaded?

Worked Solution

There are 10 stars altogether.


Fraction shaded	= $\dfrac{5}{10}$
	= $\dfrac{5}{10}$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	What fraction of the stars are shaded? sm_img https://teacher.smartermaths.com.au/wp-content/uploads/2025/12/Number_NAP-38-2025_v0_1.svg 240 indent1 vpad
workedSolution	sm_nogap There are 10 stars altogether. \|\|\| \|-:\|-\| \|Fraction shaded\|= $\dfrac{5}{10}$\| \|\|= {{{correctAnswer}}} \|
correctAnswer	$\dfrac{5}{10}$

Answers

Is Correct?	Answer
x	$\dfrac{2}{10}$
✓	$\dfrac{5}{10}$
x	$\dfrac{3}{5}$
x	5

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

Variant 1

DifficultyLevel

375

Question

What fraction of the iguanas are shaded?

Worked Solution

There are 8 iguanas altogether.


Fraction shaded	= $\dfrac{5}{8}$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	What fraction of the iguanas are shaded? sm_img https://teacher.smartermaths.com.au/wp-content/uploads/2025/12/Number_NAP-38-2025_v1.svg 240 indent1 vpad
workedSolution	sm_nogap There are 8 iguanas altogether. \|\|\| \|-:\|-\| \|Fraction shaded\|= {{{correctAnswer}}} \|
correctAnswer	$\dfrac{5}{8}$

Answers

Is Correct?	Answer
✓	$\dfrac{5}{8}$
x	$\dfrac{8}{5}$
x	$\dfrac{3}{5}$
x	$\dfrac{5}{3}$

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

Variant 2

DifficultyLevel

377

Question

What fraction of the forks are shaded?

Worked Solution

There are 16 forks altogether.


Fraction shaded	= $\dfrac{4}{16}$
	= $\dfrac{1}{4}$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	What fraction of the forks are shaded? sm_img https://teacher.smartermaths.com.au/wp-content/uploads/2025/12/Number_NAP-38-2025_v2.svg 340 indent1 vpad
workedSolution	sm_nogap There are 16 forks altogether. \|\|\| \|-:\|-\| \|Fraction shaded\|= $\dfrac{4}{16}$\| \| \|= {{{correctAnswer}}} \|
correctAnswer	$\dfrac{1}{4}$

Answers

Is Correct?	Answer
✓	$\dfrac{1}{4}$
x	$\dfrac{4}{8}$
x	$\dfrac{2}{16}$
x	4

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

Variant 3

DifficultyLevel

379

Question

What fraction of these dogs are unshaded?

Worked Solution

There are 14 dogs altogether.


Fraction unshaded	= $\dfrac{8}{14}$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	What fraction of these dogs are unshaded? sm_img https://teacher.smartermaths.com.au/wp-content/uploads/2025/12/Number_NAP-38-2025_v3.svg 300 indent1 vpad
workedSolution	sm_nogap There are 14 dogs altogether. \|\|\| \|-:\|-\| \|Fraction unshaded\|= {{{correctAnswer}}} \|
correctAnswer	$\dfrac{8}{14}$

Answers

Is Correct?	Answer
x	$\dfrac{14}{8}$
x	$\dfrac{14}{6}$
✓	$\dfrac{8}{14}$
x	$\dfrac{6}{14}$

Number, NAP 38-2025

Question

Worked Solution

Variant 0

DifficultyLevel

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Variables

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Variant 1

DifficultyLevel

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Variables

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Variant 2

DifficultyLevel

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Variables

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Variant 3

DifficultyLevel

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Worked Solution

Question Type

Variables

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