Page:Elements of the Differential and Integral Calculus - Granville - Revised.djvu/157

We have	${\displaystyle {\frac {\alpha }{\beta }}}$	${\displaystyle ={\frac {\alpha '}{\beta '}}\cdot {\frac {alpha}{\alpha '}}\cdot {\frac {\beta '}{\beta }}}$ identically,
and	${\displaystyle \lim {\frac {\alpha }{\beta }}}$	${\displaystyle =\lim {\frac {\alpha '}{\beta '}}\cdot \lim {\frac {\alpha }{\alpha '}}\cdot \lim {\frac {\beta '}{\beta }}}$	Th. II, §20
		${\displaystyle =\lim {\alpha '}{\beta '}\cdot 1\cdot 1}$.	By (C)
(D)	∴ ${\displaystyle \lim {\frac {\alpha }{\beta }}}$	${\displaystyle =\lim {\frac {\alpha '}{\beta '}}}$	Q.E.D

Now let us apply this theorem to the two following important limits.

For the independent variable x, we know from the previous section that ${\displaystyle \Delta x}$ and dx are identical.

Hence their ratio is unity, and also limit ${\displaystyle {\tfrac {\Delta x}{dx}}=1}$. That is, by the above theorem,

(E)	In the limit of the ratio of ${\displaystyle \Delta x}$ and a second infinitesimal, ${\displaystyle \Delta x}$ may be replaced by dx.

On the contrary it was shown that, for the dependent variable y, ${\displaystyle \Delta y}$ and dy are in general unequal. But we shall now show, however, that in this case also

${\displaystyle \lim {\frac {\Delta y}{dy}}=1}$.

Since ${\displaystyle \lim _{\Delta x=0}{\tfrac {\Delta y}{\Delta x}}=f'(x)}$ we may write

${\displaystyle {\frac {\Delta y}{\Delta x}}=f'(x)+\epsilon }$,

where ${\displaystyle \epsilon }$ is an infinitesimal which approaches zero when ${\displaystyle \Delta x{\dot {=}}0}$.

Clearing of fractions, remembering that ${\displaystyle \Delta x{\dot {=}}dx}$,

	${\displaystyle \Delta y}$	${\displaystyle =f'(x)dx+\epsilon \cdot \Delta x}$,
or	${\displaystyle \Delta y}$	${\displaystyle =dy+\epsilon \cdot \Delta x}$,	(B), §89

Dividing both sides by ${\displaystyle \Delta y}$,

	${\displaystyle 1}$	${\displaystyle ={\frac {dy}{\Delta y}}+\epsilon \cdot {\frac {\Delta x}{\Delta y}}}$,
or	${\displaystyle {\frac {dy}{\Delta y}}}$	${\displaystyle =1-\epsilon \cdot {\frac {\Delta x}{\Delta y}}}$.
		∴ ${\displaystyle \lim _{\Delta x\to 0}{\frac {dy}{\Delta y}}=1}$,

and hence ${\displaystyle \lim _{\Delta x\to 0}{\tfrac {\Delta y}{dy}}=1}$. That is, by the above theorem,

(F)	In the limit of the ratio of ${\displaystyle \Delta y}$ and a second infinitesimal, ${\displaystyle \Delta y}$ may be replaced by dy.