Page:Calculus Made Easy.pdf/237

such elementary zones from centre to margin, that is, integrated from ${\displaystyle r=0}$ to ${\displaystyle r=R}$.

We have therefore to find an expression for the elementary area ${\displaystyle dA}$ of the narrow zone. Think of it as a strip of breadth ${\displaystyle dr}$, and of a length that is the periphery of the circle of radius ${\displaystyle r}$, that is, a length of ${\displaystyle 2\pi r}$. Then we have, as the area of the narrow zone,

${\displaystyle dA=2\pi r\,dr}$.

Hence the area of the whole circle will be:

${\displaystyle dA=2\pi r\,dr}$.

Now, the general integral of ${\displaystyle r\cdot dr}$ is ${\displaystyle {\tfrac {1}{2}}r^{2}}$. Therefore,

${\displaystyle {\begin{aligned}A&=2\pi {\bigl [}{\tfrac {1}{2}}r^{2}{\bigr ]}_{r=0}^{r=R};\\or\quad \quad \quad \quad A&=2\pi {\bigl [}{\tfrac {1}{2}}R^{2}-{\tfrac {1}{2}}(0)^{2}{\bigr ]};\\whence\quad \quad \quad \quad A&=\pi R^{2}.\end{aligned}}}$.

Another Exercise.

Let us find the mean ordinate of the positive part of the curve ${\displaystyle y=x-x^{2}}$, which is shown in Fig. 60.

Fig. 60.

To find the mean ordinate, we shall have to find the area of the piece ${\displaystyle OMN}$, and then divide it by the