Page:Calculus Made Easy.pdf/258

If the condition is laid down that ${\displaystyle y=0}$ when ${\displaystyle x=0}$ we can find ${\displaystyle C}$; for then the exponential becomes ${\displaystyle =1}$; and we have

${\displaystyle 0={\frac {g}{a}}+C}$,

or

${\displaystyle C=-{\frac {g}{a}}}$.

Putting in this value, the solution becomes

${\displaystyle y={\frac {g}{a}}(1-\epsilon ^{-{\frac {a}{b}}x})}$.

But further, if ${\displaystyle x}$ grows indefinitely, ${\displaystyle y}$ will grow to a maximum; for when ${\displaystyle x=\infty }$, the exponential ${\displaystyle =0}$, giving ${\displaystyle y_{\text{max.}}={\dfrac {g}{a}}}$. Substituting this, we get finally

${\displaystyle y=y_{\text{max.}}(1-\epsilon ^{-{\frac {a}{b}}x})}$.

This result is also of importance in physical science.

 

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Example 3.
Let ${\displaystyle \quad \quad \quad \quad ay+b{\frac {dy}{dt}}=g\cdot \sin 2\pi nt}$.

We shall find this much less tractable than the preceding. First divide through by ${\displaystyle b}$.

${\displaystyle {\frac {dy}{dt}}+{\frac {a}{b}}y={\frac {g}{b}}\sin 2\pi nt}$.

Now, as it stands, the left side is not integrable. But it can be made so by the artifice–and this