We investigate the phenomenon of distance synchrony in a system of coupled conservative axially symmetric chaotic oscillators using master–slave type coupling. Our study reveals that the variables of the coupled oscillators achieve synchronization at a constant difference that depends on the coupling strength. This distance synchrony is explored and confirmed with two coupled as well as different types of network topologies. Our findings provide insight into the dynamics of coupled chaotic systems and contribute to the understanding of synchronization patterns in axially symmetric chaotic systems. We also provide analytical support for the numerical findings, along with achieving the same with experiments. This research has potential applications in various fields, including secure communications, neural networks, and other complex systems exhibiting chaotic behavior.