Select all the true statements about the relation. {(0,0),(1,3),(1,-4),(2,5),(3,4)} The relation is not a function. The range of the relation is {0,1,2,3}. The range of the relation is {-4,0,3,4,5}. The domain of the relation is {-4,0,3,4,5}. The domain of the relation is {0,1,2,3}.

Identify Domain: Identify the relation's domain by listing the first elements of each ordered pair. Check Function: Check if the relation is a function by ensuring each input (first element of each pair) maps to exactly one output. Identify Range: Identify the relation's range by listing the second elements of each ordered pair. Compare with Statements: Compare the identified domain and range with the statements given.

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Select all the true statements about the relation.

{(0,0),(1,3),(1,-4),(2,5),(3,4)}
The relation is not a function.
The range of the relation is
{0,1,2,3}.
The range of the relation is
{-4,0,3,4,5}.
The domain of the relation is
{-4,0,3,4,5}.
The domain of the relation is
{0,1,2,3}.

$3$ . Select all the true statements about the relation. $\newline$ $\{(0,0),(1,3),(1,-4),(2,5),(3,4)\}$ $\newline$ The relation is not a function. $\newline$ The range of the relation is $\{0,1,2,3\}$ . $\newline$ The range of the relation is $\{-4,0,3,4,5\}$ . $\newline$ The domain of the relation is $\{-4,0,3,4,5\}$ . $\newline$ The domain of the relation is $\{0,1,2,3\}$ .

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Algebra 1

Power rule with rational exponents

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3

. Select all the true statements about the relation.

\newline

\{(0,0),(1,3),(1,-4),(2,5),(3,4)\}

\newline

The relation is not a function.

\newline

The range of the relation is

\{0,1,2,3\}

\newline

The range of the relation is

\{-4,0,3,4,5\}

\newline

The domain of the relation is

\{-4,0,3,4,5\}

\newline

The domain of the relation is

\{0,1,2,3\}

Identify Domain: Identify the relation's domain by listing the first elements of each ordered pair.
Check Function: Check if the relation is a function by ensuring each input (first element of each pair) maps to exactly one output.
Identify Range: Identify the relation's range by listing the second elements of each ordered pair.
Compare with Statements: Compare the identified domain and range with the statements given.