Mathematics
Grade10
Easy
Question
The two inequalities form a ______________.
- Combined inequality
- Compound inequality
- Mixed inequality
- Double inequality
The correct answer is: Compound inequality
The two inequalities form a compound inequality.
Hence, option(b) is the correct option.
Related Questions to study
Mathematics
Solve the inequality:
0.6x ≤ 3
Inequality reversed, if we multiply both side by -1
Solve the inequality:
0.6x ≤ 3
MathematicsGrade10
Inequality reversed, if we multiply both side by -1
Mathematics
Identify the inequality that matches the picture.
![](data:image/png;base64,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)
Identify the inequality that matches the picture.
![](data:image/png;base64,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)
MathematicsGrade10
Mathematics
Find the statement that best describes the inequality - 6 > - 12
Find the statement that best describes the inequality - 6 > - 12
MathematicsGrade10
10th-Grade-Math---USA
Solve the absolute value inequality 3|2x| + 1 > 25.
Solve the absolute value inequality 3|2x| + 1 > 25.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the absolute value equation 2|x + 3| = 5.
Solve the absolute value equation 2|x + 3| = 5.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the absolute value equation |2x + 3| - 5 = 4.
Solve the absolute value equation |2x + 3| - 5 = 4.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the inequality
.
Solve the inequality
.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the inequality
.
Solve the inequality
.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the compound inequality
.
Solve the compound inequality
.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the equation
.
Solve the equation
.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the equation
.
Solve the equation
.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
If the sum of three consecutive even numbers is 60, then the largest of all is
If the sum of three consecutive even numbers is 60, then the largest of all is
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Identify the super set of {a, e, i, o, u}.
Identify the super set of {a, e, i, o, u}.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the absolute value inequality
.
Solve the absolute value inequality
.
10th-Grade-Math---USAAlgebra
10th-Grade-Math---USA
Solve the absolute value equation 3|x – 2| - 8 = 7.
Solve the absolute value equation 3|x – 2| - 8 = 7.
10th-Grade-Math---USAAlgebra