Math  /  Algebra

QuestionSolve: 4x25|4 x-2| \geq 5 Give your answer as an interval using whole numbers, proper fractions or improper fractions. \square

Studdy Solution
Combine the solutions from the two inequalities. The solution to the inequality 4x25 |4x - 2| \geq 5 is:
x34orx74 x \leq -\frac{3}{4} \quad \text{or} \quad x \geq \frac{7}{4}
In interval notation, this is:
(,34][74,) (-\infty, -\frac{3}{4}] \cup [\frac{7}{4}, \infty)
The solution to the inequality 4x25|4x - 2| \geq 5 is:
(,34][74,) (-\infty, -\frac{3}{4}] \cup [\frac{7}{4}, \infty)

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