I have this weird integral to find. I am actually trying to find the volume that is described by these two equations.
$$x^2+y^2=4$$ and
$$x^2+z^2=4$$ for
$$x\geq0, y\geq0, z\geq0$$
It is a weird object that has the plane $z=y$ as a divider for the two cylinders. My problems is that I can't find the integration limits.
I can't even draw this thing properly.