\displaystyle{16.5} Explanation: Let's take apart the integral. \displaystyle\int{\left({x}^{{2}}+{x}+{1}\right)}{\left.{d}{x}\right.}=\int{x}^{{2}}{\left.{d}{x}\right.}+\int{x}{\left.{d}{x}\right.}+\int{1}{\left.{d}{x}\right.} ...

\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}}} ...

Gió Jan 27, 2015 I would use the integral of a sum \displaystyle\int{f{{\left({x}\right)}}}+{g{{\left({x}\right)}}}{\left.{d}{x}\right.}=\int{f{{\left({x}\right)}}}{\left.{d}{x}\right.}+\int{g{{\left({x}\right)}}}{\left.{d}{x}\right.} ...

You have a typo, antiderivative should be 1/3x^3 + x^2 - 4x

This is a kind of restricted Gauss-Legendre quadrature, where one of the nodes (and its weight) are prescribed to you. This node and its weight are not what you would choose yourself, of course. But ...

Think of J(u + h) - J(u) = F(u) \cdot h + o(h), where u\cdot v in this context means \int_0^1 u(s) v(s) \, ds. So \begin{split} J(u + h) -J(u) &= \int_0^1 \left(\int_0^{t^3} u(s)+h(s) \, ds \right)^2 \, dt - \int_0^1 \left(\int_0^{t^3} u(s)\, ds \right)^2 \, dt\\ &= \int_0^1 2 \left(\int_0^{t^3} u(s)\, ds \right) \left(\int_0^{t^3} h(s)\, ds \right) \, dt + o(h) \\ &= 2 \int_0^1 \int_0^{t^3} \int_0^{t^3} u(s) h(r) \, ds \, dr \, dt + o(h) . \end{split} ...