Graph each function over a one-period interval.


y = csc (x - π/4)

The cosecant function, denoted as csc(x), is the reciprocal of the sine function. It is defined as csc(x) = 1/sin(x). The cosecant function is undefined wherever the sine function is zero, which occurs at integer multiples of π. Understanding the behavior of the sine function is crucial for graphing the cosecant function, as it directly influences its shape and asymptotes.

Phase shift refers to the horizontal translation of a trigonometric function along the x-axis. In the function y = csc(x - π/4), the term (x - π/4) indicates a phase shift of π/4 units to the right. This shift affects the position of the graph, moving all features, including asymptotes and intercepts, accordingly. Recognizing how phase shifts alter the graph is essential for accurate representation.

Graphing trigonometric functions involves plotting their values over a specified interval, typically one period. For the cosecant function, it is important to identify key points, asymptotes, and the overall shape of the graph. The period of the cosecant function is 2π, and understanding how to find and represent these features is vital for creating an accurate graph over the given interval.