import logic data.num open tactic inhabited namespace foo inductive sum (A : Type) (B : Type) : Type := inl : A → sum A B, inr : B → sum A B theorem inl_inhabited {A : Type} (B : Type) (H : inhabited A) : inhabited (sum A B) := inhabited.destruct H (λ a, inhabited.mk (sum.inl B a)) theorem inr_inhabited (A : Type) {B : Type} (H : inhabited B) : inhabited (sum A B) := inhabited.destruct H (λ b, inhabited.mk (sum.inr A b)) definition my_tac := fixpoint (λ t, [ apply @inl_inhabited; t | apply @inr_inhabited; t | apply @num.is_inhabited ]) tactic_hint my_tac theorem T : inhabited (sum false num) end foo