Final answer:
The correct interpretation of the expression is that any absolute value is greater than a negative number, which is always true. However, if the inequality was meant to be |13x| > 5, then the corresponding answer would be Option A, stating that the absolute value of 13x is greater than 5.
Step-by-step explanation:
The student's original question seems to involve the absolute value of an expression and inequalities. The notation |13x| > -5 means that we are looking for the range of values for x where the absolute value of 13x is greater than -5. Given that the absolute value of any number is non-negative, this inequality is always true, as the absolute value of any real number would always be greater than any negative number.
However, the options given in the question do not precisely match the condition stated. Nevertheless, if we consider |13x| > 5 (which seems to be what the question is indicating), the corresponding inequality would indeed be Option A: |13x| > 5, since this properly reads as 'the absolute value of 13x is greater than 5'.