\displaystyle{\int_{{0}}^{{1}}}{\left({3}{x}^{{3}}+{4}{x}^{{2}}+{x}-{2}\right)}{\left.{d}{x}\right.}=\frac{{7}}{{12}} Explanation: As differential of \displaystyle{x}^{{n}} is \displaystyle{n}{x}^{{{n}-{1}}} ...

\displaystyle\frac{{1}}{{5}}{x}^{{5}}+\frac{{9}}{{4}}{x}^{{4}}-\frac{{8}}{{3}}{x}^{{3}}-\frac{{3}}{{2}}{x}^{{2}}+{5}{x}+{C} Explanation: Use the rule: \displaystyle\int{x}^{{n}}{\left.{d}{x}\right.}=\frac{{{x}^{{{n}+{1}}}}}{{{n}+{1}}}+{C} ...

\displaystyle-\frac{{8}}{{3}} Explanation: \displaystyle{\int_{{1}}^{{3}}}{\left({x}^{{3}}-{4}{x}^{{2}}+{3}{x}\right)}\cdot{\left.{d}{x}\right.} = \displaystyle{{\left[\frac{{1}}{{4}}{x}^{{4}}-\frac{{4}}{{3}}{x}^{{3}}+\frac{{3}}{{2}}{x}^{{2}}\right]}_{{1}}^{{3}}} ...

To find the intersection points of f and g, notice that f(x)-g(x)= x^3-2x^2-(a-b)x= x\left(x^2-2x+(b-a)\right) has roots at 0 and at 1\pm\sqrt{a-b+1} for a-b+1\ge0. This is three ...

As all comments say, you do not need to care about roots of the function when you compute definite integrals. What you compute is the signed surface between the curve and the horizontal axis. In ...

Let u=1-x^2. Then, \mathrm{d}u=-2x \, \mathrm{d}x, so it is now \begin {align*} \displaystyle\int_{u=1}^{u=0} -\frac {u^n}{2} \, \mathrm{d}u &= \displaystyle\int_{0}^{1} \frac {u^n}{2} \, \mathrm{d}u \\&= \frac {1}{2} \cdot \displaystyle\int_0^1 u^n \, \mathrm{d}u \\&= \frac {1}{2} \cdot \left[ \frac {u^{n+1}}{n+1} \right]_0^1 \\&= \boxed{\dfrac{1}{2(n+1)}}. \end {align*}