  Assumed: f
  Assumed: N
  Assumed: n1
  Assumed: n2
  Set option: lean::pp::implicit
f::explicit N n1 n2
f::explicit ((N [33m→[0m N) [33m→[0m N [33m→[0m N) ([33mλ[0m x : N [33m→[0m N, x) ([33mλ[0m y : N [33m→[0m N, y)
  Assumed: EqNice
  Set option: pp::colors
EqNice::explicit N n1 n2
N
Π (A : Type u) (B : A → Type u) (f g : Π x : A, B x) (a b : A) (H1 : f = g) (H2 : a = b), (f a) = (g b)
f::explicit N n1 n2
  Assumed: a
  Assumed: b
  Assumed: c
  Assumed: g
  Assumed: H1
  Proved: Pr
Axiom H1 : a = b ∧ b = c
Theorem Pr : (g a) = (g c) :=
    let κ::1 := Trans::explicit
                     N
                     a
                     b
                     c
                     (Conjunct1::explicit (a = b) (b = c) H1)
                     (Conjunct2::explicit (a = b) (b = c) H1)
    in Congr::explicit N (λ x : N, N) g g a c (Refl::explicit (N → N) g) κ::1