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What are different shapes of functions and relations?
A relation is just a set of ordered pairs. They are in no special order. Therefore there is no particular shape assigned to a relation. A function is a special kind of relation. A relation becomes a function when the x value only has one y value.
What are the different ways of presenting relation and function?
A function is a relation where one variable specifies a single value of another variable. Presenting relation and function can be done different ways including verbal, numerical, algebraic, and graphical.
The difference between a relation and function?
Very good question. The different between relation and function is a relation is simply that : any x-value to create y-value while a function, however cannot be defined for multiple values of x
How are functions different from relations that are not functions?
In mathematics the difference between a function and a relation is that each X-value in a function only has a single Y-value.
How do you determine if a relation given in a table is a function?
To determine if a relation given in a table is a function, check if each input (or x-value) corresponds to exactly one output (or y-value). This means that no x-value should appear more than once in the table with different y-values. If any x-value is paired with multiple y-values, the relation is not a function.
When is the value of a relation for a body at rest?
The answer depends on what sort of relation.
Is every relation a function?
No, not every relation is a function. In order for a relation to be a function, each input value must map to exactly one output value. If any input value maps to multiple output values, the relation is not a function.
Is a relation of function if it's graph intersects the Y axis twice?
No, a relation is not a function if its graph intersects the Y-axis twice. A function is defined as a relation in which each input (x-value) has exactly one output (y-value). If a graph intersects the Y-axis at two points, it means there are two different y-values for the same x-value, violating the definition of a function.
Why would removing this ordered pair make the relation a function?
Removing the ordered pair would ensure that each input (or "x" value) in the relation corresponds to exactly one output (or "y" value). A function is defined as a relation where no two ordered pairs have the same first component with different second components. Therefore, eliminating the pair that violates this condition would make the relation a valid function.
What is The relation is the set of output values for the relation?
A relation doesn't have an "output value", in the sense that a function does. A set of values is either part of the relation, or it isn't.
A relation in which every x-value has a unique y-value?
A Function
A relation where there is only one y-value for every x-value?
A function
