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What else can I help you with?
How can you graph the inverse of a function without finding the ordered pairs first?
To graph the inverse of a function without finding ordered pairs, you can reflect the original graph across the line ( y = x ). This is because the coordinates of the inverse function are the swapped coordinates of the original function. Thus, for every point ( (a, b) ) on the original graph, the point ( (b, a) ) will be on the graph of its inverse. Ensure that the original function is one-to-one for the inverse to be valid.
What are the coordinates on a graph called?
If you are talking about the things in the perentheses, (5,-9), they are called ordered pairs. Ordered pairs help you find a location on a coordinate graph.
Why you can draw a continuous linear function if you only know two ordered pairs?
A continuous linear function produces a straight line graph that can be extended indefinitely in either direction. If the two ordered pairs are plotted on a graph then a straight line can be drawn joining these points. If that line is extended beyond both ends then there are no set limits and the function becomes continuous.
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 quadrant contains no point for the linear function that includes the ordered pairs Zero comma four and One comma negative one?
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
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.
How can you graph the inverse of a function without finding the ordered pairs first?
To graph the inverse of a function without finding ordered pairs, you can reflect the original graph across the line ( y = x ). This is because the coordinates of the inverse function are the swapped coordinates of the original function. Thus, for every point ( (a, b) ) on the original graph, the point ( (b, a) ) will be on the graph of its inverse. Ensure that the original function is one-to-one for the inverse to be valid.
Ordered pairs are used to?
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
A graph of the set of ordered pairs that are solutions of the equation?
Graph of an equation.
What are the coordinates on a graph called?
If you are talking about the things in the perentheses, (5,-9), they are called ordered pairs. Ordered pairs help you find a location on a coordinate graph.
Graph ordered pairs in the cartesian plane?
Yes.
Which ordered pairs are part of the graph of the function y equals 3 - x?
You can easily test any ordered pair that someone may offer you, to determinewhether the pair is part of the graph of the function [ y = 3 - x ].Simply check to see whether the sum of the two members of the ordered pair is 3.If yes, and only if yes, then the pair is part of the graph of the function.
Why you can draw a continuous linear function if you only know two ordered pairs?
A continuous linear function produces a straight line graph that can be extended indefinitely in either direction. If the two ordered pairs are plotted on a graph then a straight line can be drawn joining these points. If that line is extended beyond both ends then there are no set limits and the function becomes continuous.
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.
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.
How do you graph a line using slope intercept form of a linear equation?
you create ordered pairs or a serious of (x,y) points on the graph which you can plot and connect with a straight line
What quadrant contains no point for the linear function that includes the ordered pairs Zero comma four and One comma negative one?
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
