let a be Nat; ( (a |^ 2) + (a |^ 2) > (a + 1) |^ 2 implies a >= 3 )
L1: (a - 1) |^ 2 =
(a + (- 1)) |^ 2
.=
((a |^ 2) + ((2 * a) * (- 1))) + ((- 1) |^ 2)
by Lm10
.=
((a |^ 2) + ((2 * a) * (- 1))) + ((- 1) * (- 1))
by NEWTON:81
;
assume A1:
(a |^ 2) + (a |^ 2) > (a + 1) |^ 2
; a >= 3
then
a |^ 2 > 0
;
then
a |^ 2 > 0 |^ 2
by NEWTON:11;
then
a - 1 >= 1 - 1
by NAT_1:14, XREAL_1:9;
then A2:
a - 1 in NAT
by INT_1:3;
(a + 1) |^ 2 =
((a |^ 2) + ((2 * a) * 1)) + (1 |^ 2)
by Lm10
.=
((a |^ 2) + (2 * a)) + 1
;
then
((a |^ 2) + (a |^ 2)) - (((a |^ 2) + (2 * a)) - 1) > (((a |^ 2) + (2 * a)) + 1) - (((a |^ 2) + (2 * a)) - 1)
by A1, XREAL_1:9;
then
(a - 1) |^ 2 > 1 |^ 2
by L1, XXREAL_0:2;
then
(a - 1) + 1 > 1 + 1
by A2, Lm3a, XREAL_1:6;
then
a >= 2 + 1
by NAT_1:13;
hence
a >= 3
; verum