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Q: A relation is a special type of function?

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No. A relation is not a special type of function.

A function is always a relation. On the other hand, not all relations are functions. You can consider a function to be a special type of relation (a relation, with additional restrictions or properties).

A function is a special type of relation. So first let's see what a relation is. A relation is a diagram, equation, or list that defines a specific relationship between groups of elements. Now a function is a relation whose every input corresponds with a single output.

A relation has pairs of numbers. A function is a special relation where for each input there is one and only one output.

Functions are special types of relations.

Not every relation is a function. A function is type of relation in which every element of its domain maps to only one element in the range. However, every function is a relation.

Function is a special case of relation. It means function is a relation but all relations are not functions. Therefore all functions are 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.

A function is a specific type of relation. Both a function and a relation have input and output. A function is limited to only one output for each input, though. A relation has no limit on how many outputs each input can have.

Not every relation is a function. But every function is a relation. Function is just a part of relation.

No, a function must be a relation although a relation need not be a functions.

A relation is defined as a set of ordered pairs. A function is a special kind of relation ...

what is the difference between function and relation?

yes.

A function is a relation whose mapping is a bijection.

Does the graph above show a relation, a function, both a relation and a function, or neither a relation nor a function?

It is called a function.

It's a type of function

That's how "function" is defined. If you have two points with the same x-coordinates, you have a "relation", but not a "function". A function is a special type of relation. The idea of a function is that, for every value of the independent variable (for example, "x"), the dependent variable (for example, "y") is uniquely defined. In other words, you can consider a function as a rule that assigns a y-value uniquely to every x-value.

A relation is a function if every input has a distinct output.

The opposite of a relation is a function

relation and function are number that combine with number and neqative number to .

A relation is simply a collection of ordered pairs. That is, a relation is a pairing of an element from one set with an element from another set.A function is a special type of relation. In a function, each element from the first set (or domain) is paired with exactly one element from the second set (or range). That is, no domain element is used more than once.I will solve all your math problems. Check my profile for more info.

No.

No

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