Question
The solution of 2 < x ≤ 8 is ________.
- 9,10
- 1,2
- 2,2.5
- 3, 4, 5, 6, 7, 8
The correct answer is: 3, 4, 5, 6, 7, 8
Given: 2 < x ≤ 8
So, the numbers can be 3, 4, 5, 6, 7, 8.
Thus, the solution of 2 < x ≤ 8 is 3, 4, 5, 6, 7, 8.
Hence, option(b) is the correct option.
Related Questions to study
Write the inequality represented by the graph
![](data:image/png;base64,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)
Write the inequality represented by the graph
![](data:image/png;base64,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)
Write an inequality to represent the following:
Any number greater than 5
It is used most often to compare two numbers on the number line by their size.
Write an inequality to represent the following:
Any number greater than 5
It is used most often to compare two numbers on the number line by their size.
What is the solution of 0.2 x -4 - 2x < - 0.4 and 3x + 2.7 <3 ?
We have to follow the rules of inequalities to solve such questions. We have to swap the inequality when we divide it or multiply it by a negative number. In such questions, we find the values of the variables which makes the statement of inequalities true.
What is the solution of 0.2 x -4 - 2x < - 0.4 and 3x + 2.7 <3 ?
We have to follow the rules of inequalities to solve such questions. We have to swap the inequality when we divide it or multiply it by a negative number. In such questions, we find the values of the variables which makes the statement of inequalities true.
Find the area of the right-angled triangle if the height is 5 units and the base is x units, given that the area of the triangle lies between 10 and 35 sq. units
An inequality is a relation which makes a non-equal comparison between two numbers or other mathematical expressions
Find the area of the right-angled triangle if the height is 5 units and the base is x units, given that the area of the triangle lies between 10 and 35 sq. units
An inequality is a relation which makes a non-equal comparison between two numbers or other mathematical expressions
Solve - 8 < 2 (x + 4) or - 3x + 4 > x - 4
Inequality reverse if we multiply both side with -1
Solve - 8 < 2 (x + 4) or - 3x + 4 > x - 4
Inequality reverse if we multiply both side with -1
Write the compound inequality that represents the area A of the rectangle if 35 ≥ A ≥ 25.
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)
Write the compound inequality that represents the area A of the rectangle if 35 ≥ A ≥ 25.
![](data:image/png;base64,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)
The inequality that is represented by graph 4 is ______.
![](data:image/png;base64,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)
The inequality that is represented by graph 4 is ______.
![](data:image/png;base64,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)
The compound function that represents the graph is __________.
![](data:image/png;base64,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)
The compound function that represents the graph is __________.
![](data:image/png;base64,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)
Write a compound inequality for the given graph
![](data:image/png;base64,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)
Write a compound inequality for the given graph
![](data:image/png;base64,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)
Which inequality is the same as “pick a number between -3 and 7?”
Which inequality is the same as “pick a number between -3 and 7?”
Solve 12 < 2x < 28
Inequality reversed, if we multiply both side by -1
Solve 12 < 2x < 28
Inequality reversed, if we multiply both side by -1
A compound inequality including “and” has the solutions of ___________.
A compound inequality including “and” has the solutions of ___________.
The two inequalities form a ______________.
The two inequalities form a ______________.
Solve the inequality:
0.6x ≤ 3
Inequality reversed, if we multiply both side by -1
Solve the inequality:
0.6x ≤ 3
Inequality reversed, if we multiply both side by -1