Mathematics for Electrical Engineering and Computing by Mary P Attenborough

L'Hopital's rule

When sketching graphs of functions in Chapter 11, we looked at graphs where the function is undefined for some values of x. The function f (x) = 1/ x, for instance, is not defined when x = 0 and tends to −∞ as x → 0 and tends to $+\infty$ as x → 0⁺. Not all functions that have undefined points tend to $\pm \infty$ near the point where they are undefined. For example, consider the function f (x) = sin (x) / x. The graph of this function is shown in Figure 12.5. The function is not defined for x = 0, which we can see by substituting x = 0 into the function ...