We show that the predual of a JBW
∗
^*
-triple has the weak Banach-Saks property, that is, reflexive subspaces of a JBW
∗
^*
-triple predual are super-reflexive. We also prove that JBW
∗
^*
-triple preduals satisfy the Komlós property (which can be considered an abstract version of the weak law of large numbers). The results rely on two previous papers from which we infer the fact that, like in the classical case of
L
1
L^1
, a subspace of a JBW
∗
^*
-triple predual contains
ℓ
1
\ell _1
as soon as it contains uniform copies of
ℓ
1
n
\ell _1^n
.