A graphGis uniquelyk-colourable if the chromatic number ofGiskandGhas only onek-colouring up to permutation of the colours. Aksionov [On uniquely 3-colorable planar graphs, Discrete Math. 20 (1977), pp. 209–216] conjectured that every uniquely 3-colourable planar graph with at least four vertices has two adjacent triangles. However, in the same year, Melnikov and Steinberg [L.S. Mel'nikov and R. Steinberg,One counterexample for two conjectures on three coloring, Discrete Math. 20 (1977), pp. 203–206.] disproved the conjecture by constructing a counterexample. In this paper, we prove that if a uniquely 3-colourable planar graphGhas at most 4 triangles thenGhas two adjacent triangles. Furthermore, for any, we construct a uniquely 3-colourable planar graph withktriangles and without adjacent triangles. [ABSTRACT FROM PUBLISHER]