Solve the inequality |8x - 1| >= 0.

The inequality |8x - 1| >= 0 is true for all real values of x.

To solve this inequality, we first need to understand what it means. The absolute value of a number is its distance from zero on the number line. So, |8x - 1| is the distance between 8x and 1 on the number line.

Since distance is always non-negative, we know that |8x - 1| is always greater than or equal to zero. Therefore, the inequality |8x - 1| >= 0 is true for all real values of x.

This may seem like a trivial solution, but it is important to understand that not all inequalities have a solution set. In this case, the inequality is always true, so there is no need to find a specific solution set.

In summary, the inequality |8x - 1| >= 0 is true for all real values of x. This is because the absolute value of any number is always non-negative.