246 CHAPTER 5 Series and Differential Equations
|f(x)−L|< .
Notice that in the above definition we stipulate 0<|x−a|< δrather
than just saying|x−a|< δbecause we really don’t care what happens
whenx=a.
In defining limits involving∞only slight modifications are necessary.
Definition.
Limits at∞. Letf be a function defined for allx > N. We say that
We say that thelimitoff(x)isLasxapproaches∞, and write
xlim→∞f(x) = L,
if for any real number > 0 , there is another real number K
(which in general depends on) such that wheneverx > K then
|f(x)−L|< .
In an entirely similarly way, we may definex→−∞lim f(x) = L.
Limits of∞. Letfbe a function defined in a neighborhood of the real
numbera. We say that thelimitoff(x)isLasxapproaches∞,
and write
xlim→af(x) = ∞,
if for any real numberN, there is another real numberδ > 0 (which
in general depends onN) such that whenever 0 <|x−a|< δthen
|f(x)|> N.
Similarly, one defines
xlim→af(x) = −∞, xlim→∞f(x) = ∞,
and so on.
Occasionally, we need to considerone-sided limits, defined as fol-
lows.