Example. The curve is revolving about the axis of . Find the area of the surface generated by the curve between and .
A point on the curve, the ordinate of which is , describes a circumference of length , and a narrow belt of the surface, of width , corresponding to this point, has for area . The total area is
.
![{\displaystyle {\begin{aligned}2\pi \int _{x=0}^{x=6}y\,dx&=2\pi \int _{x=0}^{x=6}(x^{2}-5)\,dx=2\pi \left[{\frac {x^{3}}{3}}-5x\right]_{0}^{6}\\&=6.28\times 42=263.76.\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/2f265914a175ed60dfbca0c9e620b92a2c42f512)
Areas in Polar Coordinates.
When the equation of the boundary of an area is given as a function of the distance of a point of it from a fixed point (see Fig. 61) called the pole, and
Fig. 61.
of the angle which makes with the positive horizontal direction , the process just explained can be applied just as easily, with a small modification. Instead of a strip of area, we consider a small triangle , the angle at being , and we find the sum
