What defines a conditional inequality?

A conditional inequality is defined as one that only applies under certain conditions or for specific values of the variable involved. This concept highlights that the inequality isn't universally applicable to every possible value, but instead, there are particular instances where it is valid.

For example, consider the inequality ( x > 3 ). This statement is only true when ( x ) takes on values such as 4, 5, or any other number greater than 3. Hence, it demonstrates the essence of being conditional – depending on the specific values of ( x ), the inequality may hold true or not. This understanding is crucial for students as it lays the groundwork for more complex algebraic concepts where inequalities could change based on variable conditions.

The other options represent definitions that do not align with the notion of a conditional inequality: one that is true for all values does not reflect the limited applicability of a conditional statement, while a constant treatment of the variable suggests no flexibility in its values, thereby not fitting the definition of conditionality. Additionally, an inequality that is always false contradicts the idea of a conditional statement since it lacks the possibility of being true under any circumstances.