Number_2026_02_290

Question

{{{question}}}

Worked Solution

{{{workedSolution}}}

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

Variant 0

DifficultyLevel

291

Question

Which of these is not equal to 24?

Worked Solution

Checking options:

30 − 4 − 2 = 24

4 $\times$ 5 + 4 = 24

3 $\times$ 10 − 8 = 22

3 $\times$ 8 + 0 = 24

Therefore 3 $\times$ 10 − 8 is not equal to 24.


30 − 4 − 2	= 24
4 $\times$ 5 + 4	= 24
3 $\times$ 10 − 8	= 22
3 $\times$ 8 + 0	= 24

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of these is not equal to 24?
workedSolution	Checking options: >>\| \| \| \| ---------------- \| ------ \| \|30 − 4 − 2 \| = 24 \| \|4 $\times$ 5 + 4 \| = 24 \| \|3 $\times$ 10 − 8 \| = 22 \| \|3 $\times$ 8 + 0 \| = 24 \| Therefore 3 $\times$ 10 − 8 is not equal to 24.
correctAnswer	3 $\times$ 10 − 8

Answers

Is Correct?	Answer
x	30 − 4 − 2
x	4 $\times$ 5 + 4
✓	3 $\times$ 10 − 8
x	3 $\times$ 8 + 0

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

Variant 1

DifficultyLevel

293

Question

Which of the following is not equal to 20?

Worked Solution

Checking options:

5 $\times$ 4 = 20

30 − 6 − 4 = 20

3 $\times$ 5 + 4 = 19

4 $\times$ 4 + 4 = 20

Therefore 3 $\times$ 5 + 4 is not equal to 20.


5 $\times$ 4	= 20
30 − 6 − 4	= 20
3 $\times$ 5 + 4	= 19
4 $\times$ 4 + 4	= 20

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is not equal to 20?
workedSolution	Checking options: >>\| \| \| \| --------------------- \| ------ \| \| 5 $\times$ 4 \| = 20 \| \| 30 − 6 − 4 \| = 20 \| \| 3 $\times$ 5 + 4 \| = 19 \| \| 4 $\times$ 4 + 4 \| = 20 \| Therefore 3 $\times$ 5 + 4 is not equal to 20.
correctAnswer	3 $\times$ 5 + 4

Answers

Is Correct?	Answer
x	5 $\times$ 4
x	30 − 6 − 4
✓	3 $\times$ 5 + 4
x	4 $\times$ 4 + 4

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

Variant 2

DifficultyLevel

295

Question

Which of the following is not equal to 36?

Worked Solution

Checking options:

6 $\times$ 6 = 36

40 − 2 − 2 = 36

5 $\times$ 8 − 6 = 34

4 $\times$ 9 + 2 $\times$ 0 = 36

Therefore 5 $\times$ 8 − 6 is not equal to 36.


6 $\times$ 6	= 36
40 − 2 − 2	= 36
5 $\times$ 8 − 6	= 34
4 $\times$ 9 + 2 $\times$ 0	= 36

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is not equal to 36?
workedSolution	Checking options: >>\| \| \| \| --------------------- \| ------ \| \| 6 $\times$ 6 \| = 36 \| \| 40 − 2 − 2 \| = 36 \| \| 5 $\times$ 8 − 6 \| = 34 \| \| 4 $\times$ 9 + 2 $\times$ 0 \| = 36 \| Therefore 5 $\times$ 8 − 6 is not equal to 36.
correctAnswer	5 $\times$ 8 − 6

Answers

Is Correct?	Answer
x	6 $\times$ 6
x	40 − 2 − 2
✓	5 $\times$ 8 − 6
x	4 $\times$ 9 + 2 $\times$ 0

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

Variant 3

DifficultyLevel

297

Question

Which of the following is not equal to 12?

Worked Solution

Checking options:

3 $\times$ 2 + 4 $\times$ 1 + 2 = 12

20 − 4 + 6 − 10 = 12

5 $\times$ 3 − 4 = 11

24 $\div$ 3 + 2 $\times$ 2 = 12

Therefore 3 $\times$ 3 + 2 is not equal to 12.


3 $\times$ 2 + 4 $\times$ 1 + 2	= 12
20 − 4 + 6 − 10	= 12
5 $\times$ 3 − 4	= 11
24 $\div$ 3 + 2 $\times$ 2	= 12

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is not equal to 12?
workedSolution	Checking options: >>\| \| \| \| --------------------- \| ------ \| \| 3 $\times$ 2 + 4 $\times$ 1 + 2 \| = 12 \| \| 20 − 4 + 6 − 10 \| = 12 \| \| 5 $\times$ 3 − 4 \| = 11 \| \| 24 $\div$ 3 + 2 $\times$ 2\| = 12 \| Therefore 3 $\times$ 3 + 2 is not equal to 12.
correctAnswer	5 $\times$ 3 − 4

Answers

Is Correct?	Answer
x	3 $\times$ 2 + 4 $\times$ 1 + 2
x	20 − 4 + 6 − 10
✓	5 $\times$ 3 − 4
x	24 $\div$ 3 + 2 $\times$ 2

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

Variant 4

DifficultyLevel

299

Question

Which of the following is NOT equal to 30?

Worked Solution

Checking options:

5 $\times$ ( 4 + 2 ) = 30

4 $\times$ 9 − 2 $\times$ 3 = 30

8 + 6 $\times$ 4 = 32

( 7 + 5 − 2 ) $\times$ 3 = 30

Therefore 6 $\times$ 4 + 8 is NOT equal to 30.


5 $\times$ ( 4 + 2 )	= 30
4 $\times$ 9 − 2 $\times$ 3	= 30
8 + 6 $\times$ 4	= 32
( 7 + 5 − 2 ) $\times$ 3	= 30

Question Type

Multiple Choice (One Answer)

Variables

Variable name	Variable value
question	Which of the following is NOT equal to 30?
workedSolution	Checking options: >>\| \| \| \| --------------------- \| ------ \| \| 5 $\times$ ( 4 + 2 ) \| = 30 \| \| 4 $\times$ 9 − 2 $\times$ 3 \| = 30 \| \| 8 + 6 $\times$ 4 \| = 32 \| \| ( 7 + 5 − 2 ) $\times$ 3 \| = 30 \| Therefore 6 $\times$ 4 + 8 is NOT equal to 30.
correctAnswer	8 + 6 $\times$ 4

Answers

Is Correct?	Answer
x	5 $\times$ ( 4 + 2 )
x	4 $\times$ 9 − 2 $\times$ 3
✓	8 + 6 $\times$ 4
x	( 7 + 5 − 2 ) $\times$ 3

Number_2026_02_290

Question

Worked Solution

Variant 0

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 1

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 2

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 3

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Variant 4

DifficultyLevel

Question

Worked Solution

Question Type

Variables

Answers

Tags