Summary: If \(X\) and \(Y\) are complex Banach spaces, then for \(A\in{\mathcal L}(X)\), \(B\in{\mathcal L}(Y)\) and \(C\in{\mathcal L}(Y, X)\) we denote by \(M_C\) the operator defined on \(X\oplus Y\) by \[ M_C= \begin{pmatrix} A & C\\ 0 & B\end{pmatrix}. \] When \(B\) has SVEP, we show that \(\sigma(M_C)= \sigma(A)\cup \sigma(B)\) for all \(C\in{\mathcal L}(Y, X)\). And in the Hilbert space setting, this result gives a partial positive answer to the question 3 posed in [Hong-Ke Du and Jin Pan, Proc. Am. Math. Soc. 121, No. 3, 761-766 (1994; Zbl 0814.47016)].