**The Bound of worthlinks** is the bound of a worhthlink when its worth is reaching some ahonely tallies, if the bound of a worthlink **f(x)** at **x = c** is **L**, the one writes $ \lim_{x \to c} f(x) = L $, if f(c) = L and says that "f(x) is ongoing at c".

The bound of worthlinks is the ground of flowreckoning.

## The e-d Setting-out for the bound of a worthlinkEdit

The e-d Setting-out for the bound of a worthlink is a widely brooked Setting-out for the bound of worthlinks, below is the e-d Setting-out of the bound of worthlinks:

if the bound of a worthlink **f(x)** at **x = c** is **L**, which means $ \lim_{x \to c} f(x) = L $, then for every given $ e > 0 $, there is a $ d > 0 $ such that $ |f(x) - L| < e $ whenever $ |x-c| < d $

## See alsoEdit

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