Your second from the last equality is wrong. You should have: \begin{align*} c(\vec x \ +' \vec y) &= c((x_1, x_2) \ +' \ (y_1, y_2)) \\ &= c(x_1 +2y_1, 3x_2 - y_2) \\ &= (c(x_1 + 2y_1) , \ c(3x_2 ...

Those are not derivatives, they are just new names for the expressions. To make it clearer, let's use completely new names. Here, x and y are fixed real numbers; let a=\exp(x), and b=\exp(y). ...

These three properties are famous under the name Hilbert-Bernays provability conditions . The middle one is the easiest. You need to have done a lot of fiddlywork proving things about how Gödel ...

\newcommand{\e}{\operatorname{E}} \newcommand{\v}{\operatorname{var}} First let us recall that m\mapsto \e((W-m)^2) is minimized by m=\e(W), thus: \begin{align} \e((W-m)^2) = {} & \e(W^2) - ...

If X is countably infinite, let \varphi:X\to\mathbb{Z} be any bijection. Then \sigma:X\to X:x\mapsto \varphi^{-1}(\varphi(x)+1) does the trick. More generally, let X be any infinite set. ...

The two following matrices M and M' do the job: M=\left[\matrix{3&9\cr1&6\cr}\right]\>,\qquad M'=\left[\matrix{6&1\cr9&3\cr}\right]\ . Then \det M=\det M'=9>0,\qquad\det(M+M')=\det\left[\matrix{9&10\cr10&9\cr}\right]=-19<0\ , ...