let s be Nat; :: thesis: ( s >= 1 implies 0 |^ s = 0 )
defpred S1[ Nat] means 0 |^ $1 = 0 ;
A1: now
let n be Nat; :: thesis: ( n >= 1 & S1[n] implies S1[n + 1] )
assume ( n >= 1 & S1[n] ) ; :: thesis: S1[n + 1]
0 |^ (n + 1) = (0 |^ n) * 0 by Th11
.= 0 ;
hence S1[n + 1] ; :: thesis: verum
end;
A2: S1[1] by Th10;
for n being Nat st n >= 1 holds
S1[n] from NAT_1:sch 8(A2, A1);
 hence ( s >= 1 implies 0 |^ s = 0 ) ; :: thesis: verum