Richter Vagron (Bardtenders)
Out of the shadows and a shaded past come this set of dice created for the character Richter Vagron from the popular podcast Bardtenders. Etched with black and charcoal marbling and a hint of silver on the surface – these dice are perfect for sneaking around and hiding any dastardly deeds. Who knows what surprises and dark deeds lie in wait for the user of these dice. You can stay up to date on all of Richter’s adventures by tuning into episodes of Bardtenders and by checking out their website at www.bardtender.com
standard polyhedral
1 x D4
1 x D6
1 x D8
1 x D10
1 x D%
1 x D12
1 x D20
Out of the shadows and a shaded past come this set of dice created for the character Richter Vagron from the popular podcast Bardtenders. Etched with black and charcoal marbling and a hint of silver on the surface – these dice are perfect for sneaking around and hiding any dastardly deeds. Who knows what surprises and dark deeds lie in wait for the user of these dice. You can stay up to date on all of Richter’s adventures by tuning into episodes of Bardtenders and by checking out their website at www.bardtender.com
standard polyhedral
1 x D4
1 x D6
1 x D8
1 x D10
1 x D%
1 x D12
1 x D20
Out of the shadows and a shaded past come this set of dice created for the character Richter Vagron from the popular podcast Bardtenders. Etched with black and charcoal marbling and a hint of silver on the surface – these dice are perfect for sneaking around and hiding any dastardly deeds. Who knows what surprises and dark deeds lie in wait for the user of these dice. You can stay up to date on all of Richter’s adventures by tuning into episodes of Bardtenders and by checking out their website at www.bardtender.com
standard polyhedral
1 x D4
1 x D6
1 x D8
1 x D10
1 x D%
1 x D12
1 x D20
These dice are hand-made items. While they are designed to be beautiful and balanced, there may be evidence of the artist's hand or traces of the manufacturing process. We won't sell dice whose flaws would affect a fair roll, but any aesthetic imperfection will be noted here: