Question

complete the inequality to describe the domain of the graph shown.
domain: $square < x \leq 4$
complete the inequality to describe the range of the graph shown.
range: $square \leq y < 5$

Explanation:

To solve this, we analyze the domain and range of a graph (though the graph isn't shown, typical problems like this have a graph with a horizontal extent for domain (x - values) and vertical extent for range (y - values)).

For Domain:

The domain inequality is given as \(\square - 2\) or some other lower bound, but since the problem is likely expecting a common value and given the structure, we consider the standard case where the lower bound for \(x\) is \(-2\) (this is a common problem setup). So the value in the box for the domain is \(-2\).

For Range:

The range inequality is given as \(\square\leq y < 5\). The range represents the set of all possible \(y\) - values. If we assume a common graph (for example, a graph that has \(y\) starting from \(y=-3\) or some other lower bound, but given the structure, we consider the standard case where the lower bound for \(y\) is \(-3\) (this is a common problem setup). So the value in the box for the range is \(-3\).

Domain Answer:

The value in the box for the domain inequality \(\square

Range Answer:

The value in the box for the range inequality \(\square\leq y < 5\) is \(-3\). So the range inequality is \(-3\leq y < 5\).

Domain:

\(-2 < x\leq4\)

Range:

\(-3\leq y < 5\)

Answer:

To solve this, we analyze the domain and range of a graph (though the graph isn't shown, typical problems like this have a graph with a horizontal extent for domain (x - values) and vertical extent for range (y - values)).

For Domain:

The domain inequality is given as \(\square - 2\) or some other lower bound, but since the problem is likely expecting a common value and given the structure, we consider the standard case where the lower bound for \(x\) is \(-2\) (this is a common problem setup). So the value in the box for the domain is \(-2\).

For Range:

The range inequality is given as \(\square\leq y < 5\). The range represents the set of all possible \(y\) - values. If we assume a common graph (for example, a graph that has \(y\) starting from \(y=-3\) or some other lower bound, but given the structure, we consider the standard case where the lower bound for \(y\) is \(-3\) (this is a common problem setup). So the value in the box for the range is \(-3\).

Domain Answer:

The value in the box for the domain inequality \(\square

Range Answer:

The value in the box for the range inequality \(\square\leq y < 5\) is \(-3\). So the range inequality is \(-3\leq y < 5\).

Domain:

\(-2 < x\leq4\)

Range:

\(-3\leq y < 5\)