Which set of ordered pairs in the from of (x,y) does not represent a function of x?
{(1,1.5), (2,1.5), (3,1.5) (4,1.5)}(my guess)
{(0,1.5), (3,2.5), (1,3.3), (1, 4.5)}
{(1,1.5), (-1,1.5), (2,2.5), (-2,2.5)}
{(1,1.5), (-1,-1.5),(2,2.5),(-2,-2.5)}
The second set/line of ordered pairs is not a function.
Specifically the pairs: (1, 3.3) and (1, 4.5).
This is because they are two different pairs with 1 as their x value but 2 different numbers as their y value. And this is a problem because: For every x value of a true function, there is only one y value.
Think of it like this: f(x)= x is a simple fiction with with which whatever you input, you get out (F(x) is a fancy way of saying that whatever number is in place of x in f(x) is what you replace all the X's in the equation with).
An example: f(3) =3 So, you couldn't take that same function and get f(3)= 5 That is what it means when I say that a function can only have one y value (y value is just another way of saying the number the function equals) for every x value (x value is another way of saying the number that you plug into the function).
