You don't have equality: I=(x^2,xy,xz,y^2,yz,z^2) is not of the form (x^a,y^b,z^c). One does have \sqrt I=(x,y,z) iff (x,y,z)\supseteq I\supseteq (x,y,z)^m for some m\in\Bbb N.

We want to calculate I=\int_0^1 dx\frac{\arcsin(x)\arcsin\left(\frac{x}{\sqrt{2}}\right)}{\sqrt{2-x^2}} Let us start by a substitution x=\sqrt{2}\sin(y) and integrate by parts so we can write ...

\sqrt{25-x^2} is an even function. So \boxed{\int_{-5}^5 \sqrt{25-x^2} dx=2\cdot \int_{0}^5 \sqrt{25-x^2} dx} Now proceed the way you have, by substitution with y and so on. You will get the ...

Hint: Note that xe^{-x^2/2}=-\frac{d}{dx}(e^{-x^2/2}). So \int e^{-2\pi i xy} xe^{-x^2/2}dx= -\int e^{-2\pi i xy}\left(\frac{d}{dx}e^{-x^2/2}\right)dx. Now apply integration by parts to the ...

Actually, the function x=\sqrt{y-1} is not the same as the function y=x^2+1. The function y=x^2+1 is not one-to-one. In order to define the inverse, you are restricting yourself to the region ...

Take f(x) = y = x^2 + 2. If you are given the bounds for x between 0 and 4, those bounds are not the same bounds as y, since we are not given y = x. Rather, the bounds for y are f(0)= y = 2 ...