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## Comments

I appreciated seeing -- through the course videos -- that the concept of a functor is exactly what is

neededto define the meaning of a polymorphic datatype.And similarly the concept of a natural transformation is just what the doctor ordered for describing the meaning of a polymorphic function.

`I appreciated seeing -- through the course videos -- that the concept of a functor is exactly what is _needed_ to define the meaning of a polymorphic datatype. And similarly the concept of a natural transformation is just what the doctor ordered for describing the meaning of a polymorphic function.`

I appreciate this as a meaningful application of category theory. True, it's being applied to other theory, but that's still an application. And it is useful.

Category theory describes the semantics of Haskell programs, which can do empirically useful things. The theory can be used to prove the correctness of these programs. That's empirically useful!

`I appreciate this as a meaningful application of category theory. True, it's being applied to other theory, but that's still an application. And it is useful. Category theory describes the semantics of Haskell programs, which can do empirically useful things. The theory can be used to prove the correctness of these programs. That's empirically useful!`

I had an a-ha moment when they showed the intuition of Functors from trivial categories (like 1, 2, 3) to any category C and how they describe ways of picking objects and morphisms. :)

`I had an a-ha moment when they showed the intuition of Functors from trivial categories (like 1, 2, 3) to any category C and how they describe ways of picking objects and morphisms. :)`