There exists examples of different  point configurations in $R^2$ having the same  the set (but different matrices   of!) 
 distanced. The simplest example contains 4 points and could be found in the paper of Boutin and Kemper, see    http://arxiv.org/pdf/math/0304192v1.pdf  -- scroll to the page 5 to see the picture. 

It is shown though (also Kemper, I believe) that for most configurations the set of distances determine the configuration (which is probably intuitively expected). 

The example I have mentioned answers you question, but actually it would be natural if in your question you also require that the distances come with their multiplicities.