Regarding your question (1): Note that there are several possible definitions of what a group is which are all "essentially the same" but differ in the formal presentation. For example, a group could ...

Here is a proof for the third theorem: \forall x \neg \phi(x) \rightarrow \neg \forall x \phi(x): \forall x \neg \phi(x) \rightarrow \neg \phi(a) Axiom 4 \forall x \phi(x) \rightarrow \phi(a) ...

\gamma spends sometimes in X is equivalent to saying that there exists c>0 such that for every t\in (-c,c), \gamma(t)\in X. This is equivalent to say that F(\gamma(t))=0 for t\in (-c,c). ...

Like How to expand \cos nx with \cos x? , we can prove for positive integer N: \cos Nx=2^{N-1}\cos^Nx+\cdots If N=2n+1 and \cos(2n+1)x=1, (2n+1)x=2m\pi where m is any integer x=\dfrac{2m\pi}{2n+1} ...

It seems that those questions (124, and 125) are from A. Shen's "Basic Set Theory", which I've encountered recently. You proofs help me about clarity in my approach, but I think the proof should be ...

If 1 \leq h \leq g then x \leq h(x) \leq g(x) for all x \in S by definition of the lattice order on A(S). Taking x=\alpha we get \alpha \leq h(\alpha) \leq \alpha, as was to be shown (G_a ...