Typo in etale-cohomology (3x)

Thanks to Rex
https://stacks.math.columbia.edu/tag/0DDV#comment-4602

etale-cohomology.tex

@@ -18994,7 +18994,7 @@ \section{Comparing fppf and \'etale topologies}
 
 \medskip\noindent
 Let $S$ be a scheme and let $(\Sch/S)_{fppf}$ be an fppf site.
-On the same underlying category with have a second topology,
+On the same underlying category we have a second topology,
 namely the \'etale topology, and hence a second site
 $(\Sch/S)_\etale$. The identity functor
 $(\Sch/S)_\etale \to (\Sch/S)_{fppf}$ is continuous and defines
@@ -19628,7 +19628,7 @@ \section{Comparing ph and \'etale topologies}
 
 \medskip\noindent
 Let $S$ be a scheme and let $(\Sch/S)_{ph}$ be a ph site.
-On the same underlying category with have a second topology,
+On the same underlying category we have a second topology,
 namely the \'etale topology, and hence a second site
 $(\Sch/S)_\etale$. The identity functor
 $(\Sch/S)_\etale \to (\Sch/S)_{ph}$ is continuous
@@ -20008,7 +20008,7 @@ \section{Comparing h and \'etale topologies}
 
 \medskip\noindent
 Let $S$ be a scheme and let $(\Sch/S)_h$ be an h site.
-On the same underlying category with have a second topology,
+On the same underlying category we have a second topology,
 namely the \'etale topology, and hence a second site
 $(\Sch/S)_\etale$. The identity functor
 $(\Sch/S)_\etale \to (\Sch/S)_h$ is continuous