Let N(a+bi\sqrt 3) := a^2+3b^2. Then you can check that N(zz')=N(z)N(z') for any z,z' \in A. This is just because N(z)=|z|^2. Since uv=5 + 2i\sqrt{3}, you get N(uv)=N(u)N(v)=N(5 + 2i\sqrt{3})=5^2+4\cdot 3=37 ...

The reason is that (2,1) in this basis represents 2 (2,1) + 1(1,1) and not the (2,1) you originally worked with. If you instead did A \cdot (1,0), you would get (7, -2, 2) which represents ...

Reminder: a sum S+T is direct if (by definition) S\cap T=\{0\}. Equivalently, S+T is direct if and only if \dim(S+T)=\dim(S)+\dim(T). For the first case, S and T are of dimension 2 , ...

The other answers address your first question; let me tackle the second. Note that if \alpha is countable, so is \alpha+1 (Hilbert's hotel). So \omega_1 (this is the standard notation for the ...

In a rectangle, opposite sides must be congruent. Thus, we must cut the line segment of length p into two segments of length l and two segments of length w. That is, p = 2l + 2w \tag{1} ...

I'm not sure if the teacher's comment was for specifically this question, but you're right. The solution to this system lies on a line and not a plane as the teacher's comment suggests. To check that ...