The result is indeed 2 and probably there's a typo in the book. Your solution is correct. As you can see from the graph of f(x) = 5x^4 - 4x^3 there is no way the integral can be 0: \hspace{11em}

\displaystyle{124.5} Explanation: \displaystyle{\int_{{1}}^{{4}}}{\left({2}{x}^{{3}}-{2}{x}+{4}\right)}{\left.{d}{x}\right.} = \displaystyle{\left[{\left(\frac{{{2}{x}^{{4}}}}{{4}}\right)}-{\left(\frac{{{2}{x}^{{2}}}}{{2}}\right)}+{4}{x}\right]} ...

If you change variables, your integral will look like \int_0^1 f(x) (d x/(2 \sqrt{x})). This is an integral with respect to a finite measure, so is bounded. To find the norm, use Holder's ...

Suppose that you want to find the area of the gray part in the following figure : \qquad\qquad\qquad Then, your attempt is not true. The area is given by \int_{-3}^{-1}\left(\frac 23x+2\right)dx+\int_{-1}^{1}\left(\left(\frac 23x+2\right)-\left(\frac 13x^2+\frac 43x+1\right)\right)dx

Notice, your method is correct but you have made a mistake while subtracting in the last \left(\frac{-27}{3}+\frac{45}{2}-18\right)-\left(\frac{-8}{3}+10-12\right) =\left(\frac{-9}{2}\right)-\left(\frac{-14}{3}\right) ...

See this \int_{-2}^{1}|x|d|x| = \int_{-2}^{0}(-x)d(-x) + \int_{0}^{1}(x)\,d(x) = \int_{-2}^{0}x\,dx + \int_{0}^{1}x\,d x = \int_{-2}^{1} x \,dx = \dots\,.