MS-A0111 - Differential and Integral Calculus 1, Lecture, 13.9.2021-27.10.2021

We consider areas of plane sets bounded by closed curves. In the more general cases, the concept of area becomes theoretically very difficult.

The area of a planar set is defined by reducing to the areas of simpler sets. The area cannot be "calculated", unless we first have a definition of "area" (although this is common practice in school mathematics).

A (simple) polygon is a plane set bounded by a closed curve that consists of a finite number of line segments without self-intersections.

For a plane set $\color{red} D$ bounded by a closed curve we can construct inner polygons $\color{blue}P_i$ and outer polygons $P_o$: $\color{blue}P_i\color{black} \subset \color{red}D\color{black}\subset P_o$.

A surprise: The condition that $D$ is bounded by a closed curve (without self-intersections) does not guarantee that it has an area! Reason: The boundary curve can be so "wiggly", that it has positive "area". The first such example was constucted by [W.F. Osgood, 1903]:

Example

Derive the formula $A=\pi R^2$ for a circle with radius $R$ by choosing regular inscrided and circumscribed $n$-gons as inner and outer polygons, and let $n\to\infty$.

The solution is a voluntary exercise, where you need the limit $\lim_{x\to 0}\frac{\sin x}{x} = 1.$ Hint: Show that the inscribed and circumscribed areas are $\pi R^2\frac{\sin (2\pi/n)}{2\pi/n} \ \text{ and }\ \pi R^2\frac{\tan \pi/n}{\pi/n}.$