Question #af1dd

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Question #af1dd

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Answer 1 · 2017-04-05T16:28:46

See below for details.

Explanation:

When relations are defined by a set of paired values,
the first value in each pair is a Domain element
and the second value is a Range element.
We typically say that, for each pair the Domain element "maps into" the Range element.

A relation is a function if no Domain value "maps into" more than one Range value.

For the relations:
$A = {(1, 2); (2, 3); (3, 4); (2, 5)}$ $A= {(1, 2); (2, 3); (3, 4); (2, 5)}$

the pairs $(2, 3)$ $(2,3)$ and $(2, 5)$ $(2,5)$ map the same Domain value ( $2$ $2$ ) into different Domain values ( $3$ $3$ and $5$ $5$ );
therefore $A$ $A$ is not a function.

$B = {(1, 2); (1, 3); (3, 2); (4, 2)}$ $B= {(1, 2); (1, 3); (3, 2); (4, 2)}$

the pairs $(1, 2)$ $(1,2)$ and $(1, 3)$ $(1,3)$ map the Domain value ( $1$ $1$ ) into different Range values;
$B$ $B$ is not a function.

$C : {(1, 2); (2, 3); (3, 4); (1, 5)}$ $C: {(1, 2); (2, 3); (3, 4); (1, 5)}$

the pairs $(1, 2)$ $(1,2)$ and $(1, 5)$ $(1,5)$ map the Domain value ( $1$ $1$ ) into different Range values;
$C$ $C$ is not a function.

$D = {(1, 2); (2, 5); (3, 2); (4, 5)}$ $D= {(1, 2); (2, 5); (3, 2); (4, 5)}$

there are no Domain values which map into more than one Range value;
$D$ $D$ is a function.

~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

The Range of the relation ${(1, 2), (2, 4), (3, 2)}$ ${(1, 2), (2, 4), (3, 2)}$
is the set of Range values, namely ${2, 4}$ ${2,4}$ (it is not necessary to include the value $2$ $2$ in the Range set more than once).

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