Assuming that I understand you correctly, I would say that a first step would be to make a scatterplot and to examine it for patterns.
Y is the second number in a set of ordered pairs.
A relation is defined as a set of ordered pairs. A function is a special kind of relation ...
(2, 5.3) is one example.
it denotes the set of ordered pairs with elements of A and b in the format (a,b)
circle
Y is the second number in a set of ordered pairs.
You didn't show the Ordered Pairs so there is no way this question could be answered.
Describe how to find the domain and range of a relation given by a set of ordered pairs.
If a set of ordered pairs is not a relation, the set can still be a function.
Coordinates
Relationship can also be represented by a set of ordered pairs called a function.
A relation is defined as a set of ordered pairs. A function is a special kind of relation ...
Cartesian product is the name that refers to the set of the ordered pairs. The Cartesian product of two sets A and B is AB.
The rule for a set of ordered pairs is the statement that states the relationship of of a certain value to another value.For example:given the set of ordered pair { (1,2) , (3,4) , (5,6) , (7,8) }we notice that the value of y is increased by 1 as the value of x varies.For instance, in the first ordered pair which is (1,2) where 1 is x and 2 is y such that (x,y), 1 increased by 1. In other words, x is increased by 1.So we say that the rule of the ordered pair is:{(x,y) | y = x + 1 }read as "The set of ordered pairs such that y is equal to x plus one"
In general you cannot. Any set of ordered pairs can be a graph, a table, a diagram or relation. Any set of ordered pairs that is one-to-one or many-to-one can be an equation, function.
coordinates
set of ordered pairs