The solution set, all real numbers greater than or equal to one, proves which of the following inequality statements to be true? - 5x ≥ 6x - 11 - 5x ≤ 6x - 11 5x ≤ 6x + 11 - 5x ≤ 6x + 11

-5x ≤ 6x - 11

Step-by-step explanation:

Solving inequalities involves the same steps as equations with the exception that when multiplying or dividing by a negative coefficient of the variable, the inequality sign will flip. The solution to one of the inequalities given must be x ≥ 1. Given this answer, you can solve each to find the matching inequality:

-5x ≥ 6x - 11 or - 11x ≥ - 11 or x ≤ 1 (flip the sign due to negative coefficient)

-5x ≤ 6x - 11 or - 11x ≤ - 11 or x ≥ 1 (flip the sign)

5x ≤ 6x + 11 or - x ≤ 11 or x ≥ - 1

-5x ≤ 6x + 11 or - 11x ≤ 11 or x ≥ - 1