In this work, we study a q-differential inclusion with doubled integral boundary conditions under the Caputo derivative. To achieve the desired result, we use the endpoint property introduced by Amini-Harandi and quantum calculus. Integral boundary conditions were considered on time scale $\mathcal{T}_{t_{0}}=\{t_{0},t_{0}q,t_{0}q^{2}, \ldots\}\cup \{0\}$
T
t
0
=
{
t
0
,
t
0
q
,
t
0
q
2
,
…
}
∪
{
0
}
. To better evaluate the validity of our results, we provided an example, some graphs, and tables.