According to the celebrated Trisecant Lemma, a general projection of a smooth algebraic curve on a plane has only ordinary double points. In other words, the trisecant, the tangents and the stationary bisecants (they shall be explained) do not fill up the space. I intend to explain at length this classical result, hoping in particular to attract the interest of those who have never heard of it. I will then discuss secants and tangents to a smooth algebraic variety and explain how the Trisecant Lemma is a special case of a very natural and general satement. The role and importance of general tangents,
which are not clear in the case of the Trisecant Lemma will appear clearly in this new context. If time and strength are left, I will present and discuss the (higher) polar varieties (of a smooth variety) and explain how a classical result of Mather fits also in this theory.