let a, b, k be Real; ( k > 0 implies ( |.(a + b).| to_power k <= (|.a.| + |.b.|) to_power k & (|.a.| + |.b.|) to_power k <= (2 * (max (|.a.|,|.b.|))) to_power k & |.(a + b).| to_power k <= (2 * (max (|.a.|,|.b.|))) to_power k ) )
assume A1:
k > 0
; ( |.(a + b).| to_power k <= (|.a.| + |.b.|) to_power k & (|.a.| + |.b.|) to_power k <= (2 * (max (|.a.|,|.b.|))) to_power k & |.(a + b).| to_power k <= (2 * (max (|.a.|,|.b.|))) to_power k )
A2:
|.(a + b).| <= |.a.| + |.b.|
by ABSVALUE:9;
( |.a.| <= max (|.a.|,|.b.|) & |.b.| <= max (|.a.|,|.b.|) )
by XXREAL_0:25;
then A3:
|.a.| + |.b.| <= (max (|.a.|,|.b.|)) + (max (|.a.|,|.b.|))
by XREAL_1:7;
then A4:
|.(a + b).| <= 2 * (max (|.a.|,|.b.|))
by A2, XXREAL_0:2;
0 <= |.(a + b).|
by COMPLEX1:46;
hence
( |.(a + b).| to_power k <= (|.a.| + |.b.|) to_power k & (|.a.| + |.b.|) to_power k <= (2 * (max (|.a.|,|.b.|))) to_power k & |.(a + b).| to_power k <= (2 * (max (|.a.|,|.b.|))) to_power k )
by A1, A2, A3, A4, HOLDER_1:3; verum