Graph each function over a two-period interval.
y = tan(2x - π)

Trigonometric functions, such as tangent, are periodic, meaning they repeat their values in regular intervals. The period of the tangent function is typically π. However, when the function is transformed, such as by multiplying the variable by a coefficient, the period changes. For the function y = tan(2x - π), the period is π/2, which is derived from dividing the standard period by the coefficient of x.

Phase shift refers to the horizontal shift of a trigonometric function along the x-axis. In the function y = tan(2x - π), the term -π indicates a phase shift. To find the phase shift, we set the inside of the function equal to zero, which gives us the shift value. This shift affects where the function starts on the graph, moving it to the right by π/2.

Graphing tangent functions involves understanding their asymptotes and behavior. The tangent function has vertical asymptotes where the function is undefined, occurring at odd multiples of π/2. For y = tan(2x - π), the asymptotes will be located at x = π/4 + n(π/2), where n is an integer. This knowledge is crucial for accurately sketching the graph over the specified interval.