Each function graphed is of the form y = c + cos x, y = c + sin x, y = cos(x - d), or y = sin(x - d), where d is the least possible positive value. Determine an equation of the graph.


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Trigonometric functions, such as sine and cosine, describe the relationship between angles and sides in right triangles. They are periodic functions, meaning they repeat their values in regular intervals. Understanding their basic properties, including amplitude, period, and phase shift, is essential for analyzing and graphing these functions.

Phase shift refers to the horizontal displacement of a trigonometric graph. For functions like y = sin(x - d) or y = cos(x - d), the value 'd' indicates how much the graph is shifted to the right or left. This concept is crucial for determining the position of the graph on the x-axis and affects the overall shape and location of the function.

Vertical shift involves moving the entire graph of a function up or down along the y-axis. In equations of the form y = c + sin(x) or y = c + cos(x), the constant 'c' represents this shift. Understanding vertical shifts is important for accurately positioning the graph relative to the x-axis and interpreting the function's range.