In Exercises 104–106, express each interval in set-builder notation and graph the interval on a number line. (-2, ∞)

Interval notation is a mathematical notation used to represent a range of values on the real number line. It uses parentheses and brackets to indicate whether endpoints are included or excluded. For example, the interval (-2, ∞) includes all numbers greater than -2 but does not include -2 itself, as indicated by the parentheses.

Set-builder notation is a concise way to express a set by specifying a property that its members must satisfy. It typically takes the form {x | condition}, where 'x' represents the elements of the set and 'condition' describes the criteria for membership. For the interval (-2, ∞), the set-builder notation would be {x | x > -2}, indicating all x values greater than -2.

Graphing intervals on a number line visually represents the range of values included in the interval. Open intervals, indicated by parentheses, are represented with an open circle at the endpoint, showing that the endpoint is not included. For (-2, ∞), you would place an open circle at -2 and shade the line to the right, indicating all values greater than -2.