Limit of a function

$x$	${\frac {\sin x}{x}}$
1	0.841471...
0.1	0.998334...
0.01	0.999983...

Although the function ${\tfrac {\sin x}{x}}$ is not defined at zero, as $x$ becomes closer and closer to zero, ${\tfrac {\sin x}{x}}$ becomes arbitrarily close to 1. In other words, the limit of ${\tfrac {\sin x}{x}},$ as $x$ approaches zero, equals 1.

In mathematics, the limit of a function is a fundamental concept in calculus and analysis concerning the behavior of that function near a particular input which may or may not be in the domain of the function.

Formal definitions, first devised in the early 19th century, are given below. Informally, a function $f$ assigns an output $f (x)$ to every input $x$ . We say that the function has a limit $L$ at an input $p$ , if $f (x)$ gets closer and closer to $L$ as $x$ moves closer and closer to $p$ . More specifically, the output value can be made arbitrarily close to $L$ if the input to $f$ is taken sufficiently close to $p$ . On the other hand, if some inputs very close to $p$ are taken to outputs that stay a fixed distance apart, then we say the limit does not exist.

The notion of a limit has many applications in modern calculus. In particular, the many definitions of continuity employ the concept of limit: roughly, a function is continuous if all of its limits agree with the values of the function. The concept of limit also appears in the definition of the derivative: in the calculus of one variable, this is the limiting value of the slope of secant lines to the graph of a function.