12.6.24 Attributes of Absolute Value Functions & Piecewise Revie

The domain of an absolute value function is all real numbers, represented as D: (-∞, ∞).

The range of an absolute value function that opens upwards is all real numbers greater than or equal to the minimum value, represented as R: [min, ∞).

The axis of symmetry is x = -2.

The minimum value of an absolute value function occurs at the vertex of the graph, which is the point where the function changes direction.

The general form is f(x) = a|x - h| + k, where (h, k) is the vertex.

The parameter 'a' represents the vertical stretch or compression and the direction of the opening (upward if a > 0, downward if a < 0).

Changing 'h' shifts the graph horizontally. If h is positive, the graph shifts to the right; if h is negative, it shifts to the left.

Changing 'k' shifts the graph vertically. If k is positive, the graph shifts up; if k is negative, it shifts down.

An absolute value function has a minimum value at its vertex and no maximum value, as it extends infinitely upwards.

The domain is all real numbers, represented as D: (-∞, ∞).