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, are periodic functions that describe relationships between angles and sides in right triangles. They oscillate between -1 and 1, and their graphs exhibit a wave-like pattern. Understanding these functions is crucial for analyzing their transformations and shifts, which are central to the question.

Vertical and horizontal shifts refer to the transformations applied to the basic sine and cosine functions. A vertical shift occurs when a constant is added or subtracted from the function, moving it up or down. A horizontal shift, indicated by the parameter 'd' in the equations, moves the graph left or right, affecting the starting point of the wave.

Phase shift is the horizontal displacement of a periodic function, determined by the value of 'd' in the equations y = cos(x - d) or y = sin(x - d). It indicates how much the graph is shifted along the x-axis. Understanding phase shifts is essential for accurately determining the equation of the graph based on its position relative to the standard sine and cosine functions.