let n be Nat; :: thesis: ( not 4 divides n iff ex k being Nat st
( n = (4 * k) + 1 or n = (4 * k) + 2 or n = (4 * k) + 3 ) )
consider K being Nat such that
A1: ( n = 4 * K or n = (4 * K) + 1 or n = (4 * K) + 2 or n = (4 * K) + 3 ) by Th24;
thus ( not 4 divides n implies ex k being Nat st
( n = (4 * k) + 1 or n = (4 * k) + 2 or n = (4 * k) + 3 ) ) by A1; :: thesis: ( ex k being Nat st
( n = (4 * k) + 1 or n = (4 * k) + 2 or n = (4 * k) + 3 ) implies not 4 divides n )
given k being Nat such that A2: ( n = (4 * k) + 1 or n = (4 * k) + 2 or n = (4 * k) + 3 ) ; :: thesis: not 4 divides n
given t being Nat such that A3: n = 4 * t ; :: according to NAT_D:def 3 :: thesis: contradiction