For each equation, (a) give a table with at least three ordered pairs that are solutions, and (b) graph the equation. See Examples 7 and 8. y=|x+4|

The absolute value function, denoted as |x|, measures the distance of a number x from zero on the number line, always yielding a non-negative result. In the equation y = |x + 4|, the expression inside the absolute value, x + 4, shifts the graph horizontally to the left by 4 units. Understanding this function is crucial for generating ordered pairs and accurately graphing the equation.

Ordered pairs are pairs of numbers used to represent points in a coordinate system, typically written as (x, y). For the equation y = |x + 4|, finding ordered pairs involves substituting different x-values into the equation to calculate corresponding y-values. This process is essential for creating a table of solutions that visually represents the relationship defined by the equation.

Graphing involves plotting points on a coordinate plane to visualize the relationship between variables. For the equation y = |x + 4|, the graph will form a 'V' shape, indicating that the function is non-linear due to the absolute value. Understanding how to graph such equations helps in interpreting their behavior and identifying key features like intercepts and vertex.