Final answer:
Without the context of the specific relation, the true/false nature of the statement cannot be determined. To be a function, each input must have exactly one output, and this is tested through the Vertical Line Test in graphical representations.
Step-by-step explanation:
The question is asking whether a given relation represents a function. To determine if a relation is a function, we must assess if each input has exactly one output. Unfortunately, the specific relation in question is not provided so we cannot answer true or false to this particular question without that context. However, we can discuss the general concept using an example. For instance, if for every x-value there is only one y-value in a set of ordered pairs, this set defines a function. Conversely, if any x-value is associated with more than one y-value, then it is not a function. This concept is reinforced by the Vertical Line Test when analyzing graphs, which states that if a vertical line intersects a graph more than once, that graph does not represent a function.