We defi�ne a double affi�ne Q-dependent braid group. This group is constructed by appending to the braid group a set of operators Qi, before extending it to an affi�ne Q-dependent braid group. We show speci�fically that the elliptic braid group and the double affine Hecke algebra (DAHA) can be obtained as quotient groups. Complementing this we present a pictorial representation of the double affi�ne Q-dependent braid group based on ribbons living in a toroid. We show that in this pictorial representation we can fully describe any DAHA. Speci�fically, we graphically describe the parameter q upon which this algebra is dependent and show that in this particular representation q corresponds to a twist in the ribbon.