Yes. Let A represent T in the basis e_1,e_2,\ldots,e_n. Since A and B are similar, there is an invertible matrix P such that A=PBP^{-1}. Then P^{-1}(e_1),P^{-1}(e_2),\ldots,P^{-1}(e_n) ...

If a-b\in \ker f then a,b define the same cosets, which means you started with the same elements, which is what injectivity tells you should happen!

Let G be a group containing an element g of the center of G. Let us define a law on the set K = \mathbb{Z}/2\mathbb{Z} \times G by setting \begin{align} (0,x)(0,y) &= (0,xy) \\ (0,x)(1,y) &= ...

This might not be the answer you are looking for, but I guess it will give you some insight. First of all we must have that [E:\mathbb{Q}] = 6, as otherwise we can't get a basis of 6 elements. This ...

The distance of (x,y,z) to the origin is d = \sqrt{(x-0)^2 + (y-0)^2 + (z-0)^2} = \sqrt{x^2 + y^2 + z^2 } = \sqrt{(a\sin(\alpha)\cos(\beta))^2 + (a\sin(\alpha)\sin(\beta))^2 + (\sqrt{3}a\sin(\alpha)^2} ...

Assuming \sf ZF we can prove Hartogs theorem. Namely, for every set X there exists a set A and a well-ordering of A such that there is no injection from A into X. The proof does not use ...