theorem Th2: :: BROUWER3:2

for n being Nat
for Sp, Sn being Subset of (TOP-REAL n) st Sp = { s where s is Point of (TOP-REAL n) : ( s . n >= 0 & |.s.| = 1 ) } & Sn = { t where t is Point of (TOP-REAL n) : ( t . n <= 0 & |.t.| = 1 ) } holds
( Sp is closed & Sn is closed )