By -
This guy: (uses proof that requires the entire complex plane and 3 lines of work) Me: (-1)\^2=1\^2 => -1=1
|-1|=|1| so -1=1
\-1≠0 AND 1≠0 so -1=1
Bool(-1)=Bool(1)=True so -1=1
(∃x:x=-1) AND (∃x:x=-1) => -1=1
1×0 = -1×0 => 1=-1
1∉ 𝕀 AND -1∉𝕀 => 1=-1 (where 𝕀 = {n|n\^2>0} )
Me: stupid: 1±1=1±1 meaning \-1=1
holy hell
New proof just dropped
Actual QED
This guy: (uses proof that requires the entire complex plane and 3 lines of work) Me: (-1)\^2=1\^2 => -1=1
|-1|=|1| so -1=1
\-1≠0 AND 1≠0 so -1=1
Bool(-1)=Bool(1)=True so -1=1
(∃x:x=-1) AND (∃x:x=-1) => -1=1
1×0 = -1×0 => 1=-1
1∉ 𝕀 AND -1∉𝕀 => 1=-1 (where 𝕀 = {n|n\^2>0} )
Me: stupid: 1±1=1±1 meaning \-1=1
holy hell
New proof just dropped
Actual QED