See below. Explanation: Making the change of variable \displaystyle{y}=\frac{{1}}{{z}} we have the new version \displaystyle\frac{{\left.{d}{y}\right.}}{{\left.{d}{x}\right.}}+{y}-{x}{y}^{{3}}={0}\to\frac{{{x}-{z}^{{2}}+{z}{z}'}}{{z}^{{3}}}={0} ...

Yes of course \frac{dy}{dx}=1+y^{2}\implies\frac{dy}{1+y^2}=dx\implies \arctan y=x+c

The equation is \frac{dy}{dx} = y\cdot \frac{1}{x^2-4} so it is of the type \frac{dy}{dx}=f(x)\cdot g(y) where g(y)=y and f(x)=\frac{1}{x^2-4}. Now, apply the standard method of solving ...

It should probably be \frac{\partial^2f}{\partial x\partial y}(0,0) and \frac{\partial^2f}{\partial y\partial x}(0,0). You should check your book (or other material or instructor) for notation ...

I = \int x^3 e^{\frac{x^2}{2}}dx u=x^2\implies \frac{du}{dx} = 2x I = \int x\cdot u\cdot \frac{1}{2x}\cdot e^{\frac{u}{2}} dx = \frac{1}{2}\int ue^{\frac{u}{2}}du Then we do this by parts: ...

If we let u(x)=1/y(x)^3, then u'(x)=-\frac{3}{y(x)^4}y'(x). Your equation becomes u'(x)=-\frac{3}{y(x)^4}\bigl(y(x)^4-xy(x)\bigr)=-3+3xu(x). The solution is not an elementary function, ...