This was the third talk in the series on Kassel's book Quantum Groups. I recalled the Hopf algebras SL(2), SLq(2), and U(sl(2)) defined in previous talks, and showed how the algebra Uq(sl(2)) of a previous talk can be given the structure of a Hopf algebra; trying always to stress the connections between these various algebras. I then looked at the notion of duality for Hopf algebras given in Kassel: A (perfect) duality between Hopf algebras H and K is a (non-degenerate) bilinear form on H x K such that the induced maps H → K* and K → H* are both morphisms of algebras. Finally I gave a duality between SL(2) and U(sl(2)) and a duality between SLq(2) and Uq(sl(2)).