I am building up a system which contains both Family of sets and function, and I'm facing lots of errors that goes:

```
"The term "_" has type "_" while it is expected to have type "_"."
```

Here are my codes:

```
From mathcomp
Require Import ssreflect.
Require Import Ensembles.
Require Import Classical.
Ltac RAA := apply NNPP; intro.
Ltac Subset := unfold Included; intros.
Ltac Seteq:= apply Extensionality_Ensembles; unfold Same_set;split.
Notation "x ∈ A" := (In _ A x)(at level 50, no associativity).
Notation "A ⊆ B" := (Included _ A B)(at level 100, no associativity).
Notation "A ∩ B" := (Intersection _ A B)(at level 80, no associativity).
Notation "A ∪ B" := (Union _ A B)(at level 80, no associativity).
Notation "A \ B" := (Setminus _ A B)(at level 60, no associativity).
Notation "∅":= (Empty_set _).
Notation Ω:= (Full_set _).
Section Sets.
Variable U:Type.
Definition Ensemble := U -> Prop.
Definition In (A:Ensemble) (x:U) : Prop := A x.
Inductive Singleton (x:U) : Ensemble := In_singleton : In (Singleton x) x.
End Sets.
Section Family.
Variable U:Type.
Notation set := (Ensemble U).
Variable I: Type.
Definition Fam:= I ->set.
Definition UFam (F:Fam)(X:set):Fam:=fun i:I=> X∪(F i).
Definition IFam (F:Fam)(X:set):Fam:=fun i:I=> X∩(F i).
Inductive UnionF (X:Fam):set:=
unionf_intro:forall x:U, (exists i:I,(x∈(X i)))->(x∈UnionF X).
Inductive InterF (X:Fam):set:=
interf_intro:forall x:U, (forall i:I,(x∈(X i)))->(x∈InterF X).
End Family.
Section Function.
Variables U V:Type.
Notation set := (Ensemble U).
Notation Domain := (Ensemble U).
Notation Range := (Ensemble V).
Inductive Im (X:Domain)(f:U->V) : Range :=
Im_intro : forall x:U, x∈X->(f x)∈(Im X f).
Inductive InvIm (Y:Range)(f:U->V) : Domain :=
InvIm_intro : forall x:U, (f x)∈Y->x∈(InvIm Y f).
End Function.
Section HW_9_E1.
Variables U V:Type.
Lemma E1_1:forall (X Y:Fam)(i:I)(f:U->V)(x:U)(y:V),
(Im (UnionF X) f) = Union (Im (X i) f).
```

There's an error in the Lemma:

```
Lemma E1_1:forall (X Y:Fam)(i:I)(f:U->V)(x:U)(y:V),(Im (UnionF X) f) = Union (Im (X i) f).
```

Say, for example, how can I write the Lemma:

\forall f:U->V, (X_{i}){i\in I}\subseteq U and (Y{i})_{i\in I}\subseteq Y,

f[\bigcup_{i\in I}X_{i}] = \bigcup_{i\in I} f[X_{i}]

What occurs the error and how could I solve it?

`Ensemble`

? Please add the relevant imports so that we playing along at home can figure out what is the actual error you are getting.`Ensembles`

and ` Classical` are not.`Fam`

has type ` Type -> Type -> Type` instead of ` Set`,`

Prop`, or`

Type`. Which version of Coq and mathcomp are you using?`Fam`

by something that is a reasonable type, the rest of the statement has an other error: you are using`I`

as if it was a set, but we are out of scope of the variable ` I` which you introduced in section`Family`

which is now closed.3more comments