Area

Area
Suppose that $g(x) \leq f(x)$ for all $x \in [a,b]$ . Let the region be bounded by two curves and lines . Then

$\displaystyle A = \int_a^b[f(x) - g(x)]\:dx$

NOTE Partition

$\displaystyle \Delta : a = x_{0} < x_{1} < \cdots < x_{n} = b$
For each subinterval $[x_{i-1},x_{i}]$ , we take point $\xi_{i}$ . Now consider therectangle with the base $x_{i} - x_{i-1}$ and the height $f(\xi_{i}) - g(\xi_{i})$ .

$\displaystyle \sum_{i=1}^{n}\underbrace{[f(\xi_{i}) - g(\xi_{i})]}_{\rm height}\underbrace{(x_{i}-x_{i-1}) }_{\rm base}.$
Now let $\Delta$ get smaller. Then the Riemann sum converges to

$\displaystyle A = \int_{a}^{b}[f(x) - g(x)]dx$

Example 3..21 Find the area of the region bounded by $y = \frac{1}{1+x^2}$ , $y = \frac{x}{2}$ , and -axis.
SOLUTION First find the intersetin of $y = \frac{1}{1+x^2}$ and $y = \frac{x}{2}$ . Letting $\frac{1}{1+x^2} = \frac{x}{2}$ , simplifying , . , we have . Now consider the small rectangle with the base $\Delta x$ and the height $\frac{1}{1+x^2} - \frac{x}{2}$ . Therefore,

$\displaystyle A$ $\displaystyle =$ $\displaystyle \int_0^1 \big(\frac{1}{1+x^2} - \frac{x}{2}\big)dx = \left[\tan^{-1}{x} - \frac{x^2}{4}\right]_0^1$

$\displaystyle =$ $\displaystyle \tan^{-1}{1} - \frac{1}{4} = \frac{\pi}{4} - \frac{1}{4} = \frac{\pi -1}{4}.$

Exercise 3..21 Find the area of the region bounded by the following curves.

$\displaystyle x = y^{2}, y = x-2$

Find the intersection of . Then which implies . Thus and are the intersetions. Now note that for , the height of small rectangle is given by and for , the height of small rectangle is given by . Thus SOLUTION $0 \leq x \leq 1$ $\sqrt{x} - (-\sqrt{x})$ $1 \leq x \leq 4$ $\sqrt{x} - (x - 2)$

$\displaystyle A$ $\displaystyle =$ $\displaystyle \int_{0}^{1}2\sqrt{x}dx + \int_{1}^{4}[\sqrt{x} - (x - 2)] dx = \left[\frac{4}{3}x^{3/2} \right ]_{0}^{1}$

$\displaystyle +$ $\displaystyle \left[\frac{2}{3}x^{3/2} - \frac{x^2}{2} + 2x\right]_{1}^{4} = \frac{4}{3} + \frac{3}{2}[4^{3/2} - 1] -\frac{1}{2}[4^2 - 1] + 2[4-1]$

$\displaystyle =$ $\displaystyle \frac{4}{3} + \frac{14}{3} - \frac{15}{2} + 6 = \frac{9}{2}\ensuremath{\ \blacksquare}$

Find the intersection of . Since , we have . Then . Now consider horizontally long rectangle with the side length and the width . Then Alternative SOLUTION $\Delta y$

$\displaystyle A = \int_{-1}^{2}(y + 2 - y^2)dy = \left[\frac{y^2}{2} + 2y - \frac{y^3}{3} \right]_{-1}^{2} = \frac{9}{2} \ensuremath{\ \blacksquare}$

Next:Volume Up:Application of Definite Integrals Previous:Application of Definite Integrals Contents Index

$\displaystyle A$	$\displaystyle =$	$\displaystyle \int_0^1 \big(\frac{1}{1+x^2} - \frac{x}{2}\big)dx = \left[\tan^{-1}{x} - \frac{x^2}{4}\right]_0^1$
	$\displaystyle =$	$\displaystyle \tan^{-1}{1} - \frac{1}{4} = \frac{\pi}{4} - \frac{1}{4} = \frac{\pi -1}{4}.$

$\displaystyle A$	$\displaystyle =$	$\displaystyle \int_{0}^{1}2\sqrt{x}dx + \int_{1}^{4}[\sqrt{x} - (x - 2)] dx = \left[\frac{4}{3}x^{3/2} \right ]_{0}^{1}$
	$\displaystyle +$	$\displaystyle \left[\frac{2}{3}x^{3/2} - \frac{x^2}{2} + 2x\right]_{1}^{4} = \frac{4}{3} + \frac{3}{2}[4^{3/2} - 1] -\frac{1}{2}[4^2 - 1] + 2[4-1]$
	$\displaystyle =$	$\displaystyle \frac{4}{3} + \frac{14}{3} - \frac{15}{2} + 6 = \frac{9}{2}\ensuremath{\ \blacksquare}$