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In impredicative type theory (System F, also known as λ2), it is possible to define inductive data types, such as natural numbers and lists. It is also possible to define coinductive data types such as streams. They work well in the sense that their (co)recursion principles obey the expected computation rules (the β-rules). Unfortunately, they do not yield a (co)induction principle [Herman Geuvers, 2001; Ivar Rummelhoff, 2004], because the necessary uniqueness principles are missing (the η-rules). Awodey, Frey, and Speight [Steve Awodey et al., 2018] used an extension of the Calculus of Constructions [Thierry Coquand and Gérard P. Huet, 1988] (λ C) with Σ-types, identity-types, and functional extensionality to define System F style inductive types with an induction principle, by encoding them as a well-chosen subtype, making them initial algebras. In this paper, we extend their results to coinductive data types, and we detail the example of the stream data type with the desired coinduction principle (also called bisimulation). To do that, we first define quotient types (with the desired η-rules) and we also need a stronger form of the definable existential types. We also show that we can use the original method by Awodey, Frey and Speight for general inductive types by defining W-types with an induction principle. The dual approach for streams can be extended to M-types, the generic notion of coinductive types, and the dual of W-types.