let n be Nat; ( Triangle n is triangular & Triangle n is square implies ( Triangle ((4 * n) * (n + 1)) is triangular & Triangle ((4 * n) * (n + 1)) is square ) )
assume
( Triangle n is triangular & Triangle n is square )
; ( Triangle ((4 * n) * (n + 1)) is triangular & Triangle ((4 * n) * (n + 1)) is square )
then
( (n * (n + 1)) / 2 is triangular & (n * (n + 1)) / 2 is square )
by Th19;
then consider k being Nat such that
A1:
(n * (n + 1)) / 2 = k ^2
by PYTHTRIP:def 3;
Triangle ((4 * n) * (n + 1)) =
((8 * (k ^2)) * ((8 * (k ^2)) + 1)) / 2
by Th19, A1
.=
(4 * (k ^2)) * (((4 * n) * (n + 1)) + 1)
by A1
.=
((2 * k) * ((2 * n) + 1)) ^2
;
hence
( Triangle ((4 * n) * (n + 1)) is triangular & Triangle ((4 * n) * (n + 1)) is square )
; verum