0
How do you determine if you are given a set of ordered pairs that is not a function?
To determine if a set of ordered pairs is not a function, check if any input (x-value) is associated with more than one output (y-value). If you find at least one x-value that corresponds to multiple y-values, then the set is not a function. Additionally, you can visualize the pairs on a graph; if any vertical line intersects the graph at more than one point, it indicates that the relation is not a function.
What else can I help you with?
Which ordered pairs is a solution of the given system of linear equations?
That would depend on the given system of linear equations which have not been given in the question
What is graphing ordered pairs?
Ordered pairs are represented as functions themselves or they compose a function. They are written as (x, y) as coordinates for their respective function. For example, for the function y=2x, it contains the ordered pairs (0, 0), (1, 2), and so on by plugging in the coordinates for x and y. Where x=0, y=0 because y=2(0). Where x=1, y=2 because y=2(1). To graph ordered pairs, you must be given their respective function(s). From there, it is possible to make a chart of the x and y coordinates in that function, and plot them accordingly.
Do the ordered pairs below represent a relation a function both a relation and a function or neither a relation nor a function (-11) (3-7) (4-9) (8-17)?
The ordered pairs (-11), (3-7), (4-9), and (8-17) do not represent a function because they are not properly formatted as ordered pairs (they lack a second element). If we assume they were meant to be (x, y) pairs like (-11, y1), (3, -7), (4, -9), and (8, -17), we would need to check if any x-values repeat with different y-values to determine if it’s a function. As given, they are neither a relation nor a function due to the lack of a clear second element for each pair.
Which pairs of ordered pair could you remove from the relation -1013222331 so that it become a function?
To determine which pairs of ordered pairs can be removed from the relation -1013222331 to make it a function, we need to identify any duplicate first elements. A relation is a function if each input (first element) is associated with exactly one output (second element). If there are any pairs with the same first element but different second elements, one of those pairs must be removed to ensure the relation meets the definition of a function.
What is the term use to to describe any set of ordered pairs?
A relation is defined as a set of ordered pairs. A function is a special kind of relation ...
How can you determine that a set of ordered pairs are a graph table diagram equation a function or mere relation?
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.
If a set of ordered pairs is not a relation can the set still be a function?
If a set of ordered pairs is not a relation, the set can still be a function.
Which ordered pairs is a solution of the given system of linear equations?
That would depend on the given system of linear equations which have not been given in the question
What is graphing ordered pairs?
Ordered pairs are represented as functions themselves or they compose a function. They are written as (x, y) as coordinates for their respective function. For example, for the function y=2x, it contains the ordered pairs (0, 0), (1, 2), and so on by plugging in the coordinates for x and y. Where x=0, y=0 because y=2(0). Where x=1, y=2 because y=2(1). To graph ordered pairs, you must be given their respective function(s). From there, it is possible to make a chart of the x and y coordinates in that function, and plot them accordingly.
Do the ordered pairs below represent a relation a function both a relation and a function or neither a relation nor a function (-11) (3-7) (4-9) (8-17)?
The ordered pairs (-11), (3-7), (4-9), and (8-17) do not represent a function because they are not properly formatted as ordered pairs (they lack a second element). If we assume they were meant to be (x, y) pairs like (-11, y1), (3, -7), (4, -9), and (8, -17), we would need to check if any x-values repeat with different y-values to determine if it’s a function. As given, they are neither a relation nor a function due to the lack of a clear second element for each pair.
What is a rule for the function identified by this set of ordered pairs?
You didn't show the Ordered Pairs so there is no way this question could be answered.
Relationship can also be represented by a set of ordered pairs called a?
Relationship can also be represented by a set of ordered pairs called a function.
Which pairs of ordered pair could you remove from the relation -1013222331 so that it become a function?
To determine which pairs of ordered pairs can be removed from the relation -1013222331 to make it a function, we need to identify any duplicate first elements. A relation is a function if each input (first element) is associated with exactly one output (second element). If there are any pairs with the same first element but different second elements, one of those pairs must be removed to ensure the relation meets the definition of a function.
What is the function in algebra of ordered pairs?
The function in algebra of ordered pairs is function notation. For example, it would be written out like: f(x)=3x/4 if you wanted to know three fourths of a number.
What is a table of ordered pairs that represent solutions of a function?
Use this cordinate ,find the other cordinate that makes the ordered pair a solution of the given equation: x+4y=7,(_,3)
What is the term use to to describe any set of ordered pairs?
A relation is defined as a set of ordered pairs. A function is a special kind of relation ...
What is the answer of the three pairs of numbers 3y equals 4x plus 2 determine which ordered pairs satisfy the given equation 2and 1 1 and 2 0 and two thirds?
it is 7yx978
