Do a "u" substitute Explanation: Given: \displaystyle{\int_{{-{{1}}}}^{{1}}}{x}{\left({1}+{x}\right)}^{{3}}{\left.{d}{x}\right.} let \displaystyle{u}={x}+{1} , then \displaystyle{d}{u}={\left.{d}{x}\right.}{\quad\text{and}\quad}{x}={u}-{1} ...

Legendre polynomials given an orthogonal base of L^2(-1,1) with respect to the standard inner product. Assuming f(x)\stackrel{L^2}{=}\sum_{n\geq 0}c_n P_n(x) \tag{1} the given constraints can ...

\displaystyle\frac{{14}}{{3}} Explanation:

\displaystyle\int{x}^{{2}}{\left({x}^{{3}}+{5}\right)}^{{4}}{\left.{d}{x}\right.}=\frac{{\left({x}^{{3}}+{5}\right)}^{{5}}}{{15}}+{C} Explanation: We want to find \displaystyle{I}=\int{x}^{{2}}{\left({x}^{{3}}+{5}\right)}^{{4}}{\left.{d}{x}\right.} ...

Going into details of Rene Schipperus' comment: \int_{a}^b x^3 dx = \frac {x^4}4|_{a}^b = \frac {b^4 - a^4}4. So \int_{-\infty}^{\infty}x^3 dx = \lim\limits_{a\to -\infty,b\to \infty}\frac {b^4 - a^4}4 ...

We denote with I= \int_{-1}^1\!dx\,g(x)x^3 the value of the integral. The constraints, we include via Lagrange multipliers. So we would like to maximize the integral J= I + \lambda \int_{-1}^1\!dx\,g(x) + \mu \int_{-1}^1\!dx\,g(x) x^2 + \nu \int_{-1}^1\!dx\,g(x)^2. ...