Given are the Elliptic curves $E_1 : y^2 = x^3+x$ and $E_2 = y^2 = x^3+3x$. Are these isomorphic over
a) $\mathbb Q$?
b) $\mathbb F_5$?
I see they are isomorphic over $\mathbb C$, as they have the same $j$-invariant. I suppose they aren't isomorphic, but how to prove this?