The list of alternating knots with n=11 crossings, ordered according to the Knotscape tables and followed by the Conway notation and symmetry type, can be found in Table of knot invariants by C. Livingston and J.C. Cha (2005). Among 376 alternating knots there are 123 non-invertible knots (denoted in Table of knot invariants as "chiral"). Two knots, 11a₅₃ .2 1.4 0, and 11a₂₆₂ .4 1.2 0, are the members of the family 2), and the knots 11a₆₈ .2 1.4, and 11a₂₆₅ .4 1.2, are the members of the family 3). The following four knots generate three-parameter families of non-invertible knots with the additional conditions:

          11a₂₀₁ 4 1,3,2 1 generates the family of non-invertible knots (2p) 1,(2q+1),(2r) 1 for p ¹ r (p,q,r ³ 1);

          11a₂₉₉ .4.2.2 generates the family of non-invertible knots .(2p).(2q).(2r) for p ¹ r (p,q,r ³ 1);

          11a₃₂₃ .4.2 0.2 generates the family of non-invertible knots .(2p).(2q) 0.(2r) for p ¹ r (p,q,r ³ 1);

          11a₃₄₅ 4:2:2 0 generates the family of non-invertible knots .(2p):(2q):(2r) 0 for p ¹ q (p,q,r ³ 1).

The remaining non-invertible knots with n=11 crossings are the origin of the corresponding families without restrictions on parameters, in the same way as it was done for knots with n=9, or n=10 crossings. In certain families, among derived knots occur some repeated knots (e.g., 10₈₂ .4.2 = .2.4, obtained in the family .(2p).(2q) for p=2 and q=1, and for p=1 and q=2, respectively).