Hint . One may perform a change of variable, u=x^2-1, du=2xdx, giving \int_1^2 xf(x^2-1)dx=\frac12\int_1^2 2xf(x^2-1)dx=\frac12\int_0^3 f(u)du=8 then one may write \int_0^2 f(x)dx=\int_0^3 f(x)dx+\int_3^2 f(x)dx=\int_0^3 f(x)dx-\int_2^3 f(x)dx ...

For each value of n, the sum is finite, so it is legal to split it. In other words, you are taking sums before taking limits...

CJ Sep 7, 2014 There are a couple of ways, but the usual way to do this is by using the change-of-variable rule: let \displaystyle{u}={1}+{5}{x}\Rightarrow\frac{{{d}{u}}}{{\left.{d}{x}\right.}}={5} ...

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 ...

The curves need to be thought of as with respect to the line y=1 . What's the distance between the point (x,\sqrt{x}) and the line y=1? What's the distance between (x,x) and y=1? Now ...

Legendre polynomials have the parity of their index. This means that polynomials with even index are even functions, and with odd index (as in your case) are odd functions. An odd function times an ...