91影视

To define: The absolute area between the graph function $f\left(x\right)$and x-axis on $[a,b]$.

$$\begin{gathered} \text{v-axis on an interval}[a,b]\text{, i.e.,}A\left(\text{area}\right)={鈭�}_a^{b}f\left(x\right)dx\text{. The function}f\left(x\right)\text{may be above or below the}x\text{-axis,} \\ \text{although the area is always a positive quantity, it can bear a sign '}+\text{' or '-'according to} \\ \left(i\right).iff\left(x\right)鈮�0\text{on all the interval}[a,b]\text{then}{A}_1\text{(area)}={鈭�}_a^{b}f\left(x\right)dx鈮�0\text{, i.e.}{A}_1\text{is positive.} \\ \left(ii\right).iff\left(x\right)鈮�0\text{on all the interval}[b,c]\text{then}{A}_2\text{(area)}={鈭�}_b^c鈥�f\left(x\right)dx鈮�0\text{, i.e.}{A}_2\text{is negative.} \end{gathered}$$

The signed area (positive and negative) are shown in figure below:

$$\begin{gathered} \text{The magnitude of the area of the function}f\left(x\right)\text{below x-axis}{A}_2=鈭�{鈭�}_b^c鈥�f\left(x\right)dx\text{is called the absolute area of} \\ \text{the function}f\left(x\right)\text{on the interval}[b,c]\text{. This is the area without the sign.} \\ \text{Since, the area A between curve and}x\text{-axis can have positive and negative values, however negative are in} \\ \text{actual calculations has no meaning or sometimes may be absurd, e.g. Area of square is}鈭�49\text{sq.cm then its} \\ \text{side will be}\sqrt{鈭�49}=卤7i\mathrm{cm}\text{an imaginary value. Therefore, to avoid such an absurdity the computed are is} \\ \mathrm{taken}鈦�A_2=\left|{鈭�}_b^c鈥�f\left(x\right)dx\right| \end{gathered}$$