Use each graph to obtain the graph of the corresponding reciprocal function, cosecant or secant. Give the equation of the function for the graph that you obtain.


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Reciprocal functions are derived from basic trigonometric functions by taking their reciprocals. For example, the cosecant function (csc) is the reciprocal of the sine function (sin), and the secant function (sec) is the reciprocal of the cosine function (cos). Understanding how these functions relate to their original counterparts is crucial for graphing and analyzing their behavior.

Graphing trigonometric functions involves plotting the values of the function over a specified interval. Key features to consider include the amplitude, period, and asymptotes. For reciprocal functions like cosecant and secant, the graphs will exhibit vertical asymptotes where the original functions are zero, and the overall shape will reflect the behavior of the sine and cosine functions.

Asymptotes are lines that a graph approaches but never touches. In the context of reciprocal trigonometric functions, vertical asymptotes occur at the points where the original function equals zero. For instance, the cosecant function has vertical asymptotes at the zeros of the sine function, while the secant function has them at the zeros of the cosine function, which is essential for accurately sketching their graphs.