The performance of a parallel and distributed system heavily depends on the effectiveness of the underlying interconnection network. Honeycomb networks are promising candidates for interconnection networks in parallel and distributed applications. This paper addresses the hamiltonicity of a hexagonal honeycomb torus (HHT) with a pair of faulty nodes lying diagonally on a cycle of length 6. We show that such a faulty HHT is hamiltonian by presenting a systematic method for constructing a fault-free hamiltonian cycle. This result reveals another appealing fault-tolerant feature of HHTs.