It is well known that the height profile of a critical conditioned Galton-Watson tree with finite offspring variance converges, after a suitable normalisation, to the local time of a standard Brownian excursion. In this work, we study the distance profile, defined as the profile of all distances between pairs of vertices. We show that after a proper rescaling the distance profile converges to a continuous random function that can be described as the density of distances between random points in the Brownian continuum random tree. We show that this limiting function a.s. is Holder continuous of any order alpha < 1, and that it is a.e. differentiable. We note that it cannot be differentiable at 0, but leave as open questions whether it is ...