s the following relation a function?
two ovals, one labeled x and the other labeled y. The negative 2 in the x oval is pointing to the 3 in the y oval, the 0 in x i
To determine whether the given relation is a function, we need to see if each x-value is associated with only one y-value.
In this case, if the negative 2 in the x oval is pointing to the 3 in the y oval, and there is no other connection from the negative 2 to any other y-value, then we can say that the negative 2 is associated with only one y-value, which is 3.
To determine if there are any other x-values and their corresponding y-values, we need additional information.
If there is no other connection from any other x-values to any y-values, then the given relation is a function because each x-value is associated with only one y-value.
However, if there are other connections between different x-values and y-values, then the relation would not be a function because it violates the requirement of each x-value having only one y-value.
In summary, to determine if the given relation is a function, we need to identify all the connections between x and y values. If each x-value is associated with only one y-value, then it is a function.