the y-coordinate is 0.
Ordered pairs that have a negative x and a positive y are in the second quadrant.
Yes, ordered pairs identify points in a coordinate plane. If that doesn't answer your question, please restate it (say it another way).
A quadrilateral with two pairs of parallel sides.
x| -1 | 0 | 1 | 2 | 3 y| 6 | 5 | 4 | 3 | 2 what function includes all of the ordered pairs in the table ?
Parallelogram.
set of ordered pairs
graph the ordered pairs (4, -2) AND (1, -1) AND CONNECT TO FORM A line. Which quadrant contains no point for this linear function? Explain your answer
The Ordered Pairs are 1x20, 2x10, and 5x4.
It is not possible to answer the question with no information about which ordered pairs!
-1 is a one-dimensional entity. It can have no equivalent in ordered pairs.
Y is the second number in a set of ordered pairs.
3x + 4y = -4 defines a line in 2-dimensional space and the coordinates of every point on the line is an ordered pair that satisfies the equation. I have neither the time nor the inclination to list an infinite number of ordered pairs.
None of "these" pairs.
Ordered pairs that have a negative x and a positive y are in the second quadrant.
Ordered pairs are used for many things. Anytime you graph a point on a cartesian coordinate system, you have an ordered pair. In fact, all of R^2 is made up of ordered pairs. When you put a value in a function and get one out, you have an ordered pair
The equation ( y = 7x ) defines a linear relationship between ( x ) and ( y ). To find ordered pairs that satisfy this equation, you can choose any value for ( x ) and calculate the corresponding ( y ). For example, if ( x = 1 ), then ( y = 7(1) = 7 ), giving the ordered pair ( (1, 7) ). Similarly, if ( x = 0 ), then ( y = 7(0) = 0 ), resulting in the ordered pair ( (0, 0) ). Other pairs could include ( (2, 14) ) and ( (-1, -7) ).
An ordered pair can represent either a relation or a function, depending on its properties. A relation is simply a set of ordered pairs, while a function is a specific type of relation where each input (first element of the pair) is associated with exactly one output (second element of the pair). If an ordered pair is part of a set where each input corresponds to only one output, it defines a function. Otherwise, it is just a relation.