one states that the scalar is different from 0; the third lemma (the main
one) asks to prove the equality between the two new members.
% is shown in Fig. \ref{step2} where $?_3[H;x]$ stands for
-% the still unkown scalar argument, which can have only $H$ and $x$ as
+% the still unknown scalar argument, which can have only $H$ and $x$ as
% free variables.
-The user proceeds by istantiating the scalar with the number 2. The
+The user proceeds by instantiating the scalar with the number 2. The
\texttt{Assumption} tutor now suggests to close the second goal (that
states that $2 \neq 0$) by applying the hypothesis $H$.
No useful suggestions, instead, are generated for the main goal
$2*x = 2*((x+1)*(x+1)-1-x*x)*2^{-1}$.
-To proceed in the proof the user needs to symplify the
+To proceed in the proof the user needs to simplify the
expression using the lemma $Rinv\_r\_simpl\_m$ that states that
$\forall x,y.\;y = x * y * x^{-1}$. Since we do not provide yet any tutor
-suggesting symplifications, the user must find out this symplication by
+suggesting simplifications, the user must find out this simplification by
himself. Once she founds it, the goal is reduced to proving that
$2*x = (x+1)*(x+1) - 1 - x*x$. This equality is easily solved by the
\texttt{Ring} tutor, that suggests\footnote{The \texttt{Ring} suggestion is
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