Select the relations that are functions.
{(a, 1), (6, 1), (C, 1)}
{(a, a),(a, b),(a, c)}
{(1, a),(2, a),(3, a)
{(a, a),(b, b), (c, c)

The first choice [tex]\left\lbrace(a, 1),\, (6, 1), \, (C, 1)\right\rbrace[/tex],
The third choice [tex]\left\lbrace(1, a),\, (2, a), \, (3, a)\right\rbrace[/tex]
The fourth choice [tex]\left\lbrace(a, a),\, (b, b), \, (c, c)\right\rbrace[/tex]

might be functions.

Step-by-step explanation:

A function between two sets (domain and range) should

be defined for all elements in the domain, and
map each element from the domain to exactly one element in the range.

The second choice can't be a function since the element [tex]a[/tex] from the domain is mapped to more than one element in the range.

Keep in mind that a function should be defined for all elements in its domain. For the first relation to be a function, its domain needs to be [tex]\lbrace a,\, 6, \, C\rbrace[/tex]. Similarly, the domain for the third and fourth relations should be [tex]\lbrace 1,\, 2, \, 3\rbrace[/tex] and [tex]\lbrace a,\, b, \, c\rbrace[/tex]

Select the relations that are functions. {(a, 1), (6, 1), (C, 1)} {(a, a),(a, b),(a, c)} {(1, a),(2, a),(3, a) {(a, a),(b, b), (c, c)

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Otras preguntas

Select the relations that are functions.
{(a, 1), (6, 1), (C, 1)}
{(a, a),(a, b),(a, c)}
{(1, a),(2, a),(3, a)
{(a, a),(b, b), (c, c)