Number_2026-02-650

Question

{{{question}}}

Worked Solution

{{{workedSolution}}}

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

Variant 0

DifficultyLevel

650

Question

Which of the following is equal to $4^3$ ?

Worked Solution


$4^3$	= 4 $\times$ 4 $\times$ 4 = 64
$2^6$	= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64

Therefore $2^6$ = $4^3$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $4^3$?
workedSolution	\| \| \| \| ------ \| ------------------------------------------------------------------ \| \| $4^3$ \| \= 4 $\times$ 4 $\times$ 4 = 64 \| \| $2^6$ \| \= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64 \| Therefore {{{correctAnswer}}} = $4^3$
correctAnswer	$2^6$

Answers

Is Correct?	Answer
x	$2^5$
✓	$2^6$
x	$2^9$
x	$3^4$

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

Variant 1

DifficultyLevel

651

Question

Which of the following is equal to $2^4$ ?

Worked Solution


$2^4$	= 2 $\times$ 2 $\times$ 2 $\times$ 2 = 16
$4^2$	= 4 $\times$ 4 = 16

Therefore $4^2$ = $2^4$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $2^4$?
workedSolution	\| \| \| \| ------ \| -------------------------------------------- \| \| $2^4$ \| \= 2 $\times$ 2 $\times$ 2 $\times$ 2 = 16 \| \| $4^2$ \| \= 4 $\times$ 4 = 16 \| Therefore {{{correctAnswer}}} = $2^4$
correctAnswer	$4^2$

Answers

Is Correct?	Answer
x	$4^3$
x	$8^2$
✓	$4^2$
x	$2^8$

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

Variant 2

DifficultyLevel

652

Question

Which of the following is equal to $3^4$ ?

Worked Solution


$3^4$	= 3 $\times$ 3 $\times$ 3 $\times$ 3 = 81
$9^2$	= 9 $\times$ 9 = 81

Therefore $9^2$ = $3^4$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $3^4$?
workedSolution	\| \| \| \| ------ \| -------------------------------------------- \| \| $3^4$ \| \= 3 $\times$ 3 $\times$ 3 $\times$ 3 = 81 \| \| $9^2$ \| \= 9 $\times$ 9 = 81 \| Therefore {{{correctAnswer}}} = $3^4$
correctAnswer	$9^2$

Answers

Is Correct?	Answer
x	$9^3$
x	$6^3$
✓	$9^2$
x	$12^2$

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

Variant 3

DifficultyLevel

653

Question

Which of the following is equal to $8^2$ ?

Worked Solution


$8^2$	= 8 $\times$ 8 = 64
$4^3$	= 4 $\times$ 4 $\times$ 4 = 64

Therefore $4^3$ = $8^2$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $8^2$?
workedSolution	\| \| \| \| ------ \| --------------------------------- \| \| $8^2$ \| \= 8 $\times$ 8 = 64 \| \| $4^3$ \| \= 4 $\times$ 4 $\times$ 4 = 64 \| Therefore {{{correctAnswer}}} = $8^2$
correctAnswer	$4^3$

Answers

Is Correct?	Answer
x	$2^4$
✓	$4^3$
x	$2^6$
x	$2^5$

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

Variant 4

DifficultyLevel

654

Question

Which of the following is equal to $3^3$ ?

Worked Solution


$3^3$	= 3 $\times$ 3 $\times$ 3 = 27
$27^1$	= 27

Therefore $27^1$ = $3^3$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $3^3$?
workedSolution	\| \| \| \| ------- \| ---------------------------------- \| \| $3^3$ \| \= 3 $\times$ 3 $\times$ 3 = 27 \| \| $27^1$ \| \= 27 \| Therefore {{{correctAnswer}}} = $3^3$
correctAnswer	$27^1$

Answers

Is Correct?	Answer
x	$9^2$
✓	$27^1$
x	$6^2$
x	$9^3$

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

Variant 5

DifficultyLevel

655

Question

Which of the following is equal to $2^6$ ?

Worked Solution


$2^6$	= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64
$4^3$	= 4 $\times$ 4 $\times$ 4 = 64

Therefore $4^3$ = $2^6$

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is equal to $2^6$?
workedSolution	\| \| \| \| ------ \| ------------------------------------------------------------------ \| \| $2^6$ \| \= 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 $\times$ 2 = 64 \| \| $4^3$ \| \= 4 $\times$ 4 $\times$ 4 = 64 \| Therefore {{{correctAnswer}}} = $2^6$
correctAnswer	$4^3$

Answers

Is Correct?	Answer
x	$4^2$
x	$6^2$
x	$8^3$
✓	$4^3$

Number_2026-02-650

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