To construct more homogeneous operators, B. Bagchi and G. Misra in \cite{d} introduced the operator $\left(\begin{smallmatrix} T_0 & T_0-T_1 \\ 0 & T_1\\ \end{smallmatrix}\right)$ and proved that when $T_0$ and $T_1$ are homogeneous operators with the same unitary representation $U(g)$, it is homogeneous with associated representation $U(g)\oplus U(g)$. At the same time, they asked an open question, is the constructed operator irreducible? A. Kor$\acute{a}$nyi in \cite{e} showed that when the (1,2)-entry of the matrix is $\alpha(T_0-T_1)$, $\alpha\in\mathbb{C}$ the above result is also valid, and their unitary equivalence class depends only on $|\alpha|$. In this case, he and S. Hazra \cite{f} gave a large class of irreducible homogeneous bilateral $2\times2$ block shifts, respectively, which are mutually unitarily inequivalent for $\alpha>0$. In this note, we generalize the construction to $T=\left(\begin{smallmatrix} T_0 & XT_1-T_0X \\ 0 & T_1\\ \end{smallmatrix}\right)$ and provide some sufficient conditions for its irreducibility. We also find that for the above-mentioned $T_0,T_1$ and non-scalar operator $X$, $T$ is weakly homogeneous rather than homogeneous. So the weak homogeneity problem related to $T$ is investigated.