Page:Calculus Made Easy.pdf/168

whence, since the differential of ${\displaystyle \epsilon ^{y}}$ with regard to ${\displaystyle y}$ is the original function unchanged (see p. 143),

${\displaystyle {\frac {dx}{dy}}=\epsilon ^{y}}$,

and, reverting from the inverse to the original function,

${\displaystyle {\frac {dy}{dx}}={\frac {1}{\ {\dfrac {dx}{dy}}\ }}={\frac {1}{\epsilon ^{y}}}={\frac {1}{x}}}$.

Now this is a very curious result. It may be written

${\displaystyle {\frac {d(\log _{\epsilon }x)}{dx}}=x^{-1}}$.

Note that ${\displaystyle x^{-1}}$ is a result that we could never have got by the rule for differentiating powers. That rule (page 25) is to multiply by the power, and reduce the power by ${\displaystyle 1}$. Thus, differentiating ${\displaystyle x^{3}}$ gave us ${\displaystyle 3x^{2}}$; and differentiating ${\displaystyle x^{2}}$ gave ${\displaystyle 2x^{1}}$. But differentiating ${\displaystyle x^{0}}$ does not give us ${\displaystyle x^{-1}}$ or ${\displaystyle 0\times x^{-1}}$, because ${\displaystyle x^{0}}$ is itself ${\displaystyle =1}$, and is a constant. We shall have to come back to this curious fact that differentiating ${\displaystyle \log _{\epsilon }x}$ gives us ${\displaystyle {\dfrac {1}{x}}}$ when we reach the chapter on integrating.

 

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Now, try to differentiate

${\displaystyle y=\log _{\epsilon }(x+a)}$,

that is

${\displaystyle \epsilon ^{y}=x+a}$;

we have ${\displaystyle {\dfrac {d(x+a)}{dy}}=\epsilon ^{y}}$, since the differential of ${\displaystyle \epsilon ^{y}}$ remains ${\displaystyle \epsilon ^{y}}$.