$${\mathtt{\,-\,}}\left({\frac{{\mathtt{22}}}{{\mathtt{35}}}}{\mathtt{\,\times\,}}\left(-{\mathtt{35}}\right)\right) = {\mathtt{22}}$$
Or this: $${\mathtt{\,-\,}}\left({\frac{{\mathtt{22}}}{{\mathtt{35}}}}{\mathtt{\,\times\,}}{\mathtt{x}}\right) = {\mathtt{35}}$$ => $${\mathtt{x}} = {\mathtt{\,-\,}}{\frac{{\mathtt{35}}{\mathtt{\,\times\,}}{\mathtt{35}}}{{\mathtt{22}}}}$$
x = $${\mathtt{\,-\,}}{\frac{{\mathtt{35}}{\mathtt{\,\times\,}}{\mathtt{35}}}{{\mathtt{22}}}} = {\mathtt{\,-\,}}{\frac{{\mathtt{1\,225}}}{{\mathtt{22}}}} = -{\mathtt{55.681\: \!818\: \!181\: \!818\: \!181\: \!8}}$$
.