Inequalities with Absolute Value
Math ⇒ Algebra
Inequalities with Absolute Value starts at 8 and continues till grade 12.
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See sample questions for grade 10
If |2x + 3| > 7, what is the solution set for x?
If |x - 1| < 0, what is the solution set for x?
If |x - 2| < 5, what is the solution set for x?
If |x - 6| ≤ 0, what is the solution set for x?
If |x + 1| > 7, what is the solution set for x?
If |x + 4| ≥ 9, what is the solution set for x?
If |x| ≤ 0, what is the solution set for x?
If |x| ≥ 0, what is the solution set for x?
Solve for x: |2x - 1| < 3.
Solve for x: |5x + 1| < 11.
Solve for x: |x + 7| ≥ 10.
Solve for x: |x/2| ≤ 6.
Solve the inequality |3x + 2| ≤ 8.
Solve the inequality |4 - x| ≥ 6.
Solve the inequality |x/3 - 2| > 1.
Solve the inequality |x/4| ≤ 2.
Solve the inequality |x| < 5.
A number x satisfies the inequality |x - 2| + |x + 2| < 6. Find the range of possible values for x.
If |2x - 5| ≤ x + 1, what is the solution set for x?
Solve for all real values of x: |4x + 1| ≥ 2x + 7.
