let G be Group; for a, b being Element of G holds {a} |^ {b} = {(a |^ b)}
let a, b be Element of G; {a} |^ {b} = {(a |^ b)}
A1: (({b} ") * {a}) * {b} =
({(b ")} * {a}) * {b}
by GROUP_2:3
.=
{((b ") * a)} * {b}
by GROUP_2:18
.=
{(a |^ b)}
by GROUP_2:18
;
( {a} |^ {b} c= (({b} ") * {a}) * {b} & {a} |^ {b} <> {} )
by Th32, Th33;
hence
{a} |^ {b} = {(a |^ b)}
by A1, ZFMISC_1:33; verum