# Coq : transitivity fails on list intermediate term

I'm doing this exercises from LF:

``````Example injection_ex3 : ∀ (X : Type) (x y z : X) (l j : list X),
x :: y :: l = z :: j →
j = z :: l →
x = y.
``````

My question is that why `transitivity` fails here:

``````Proof.
intros X x y z l j H I.
injection H as J.
Fail transitivity j. (* shouldn't fail imho *)
``````

The environment at this point:

``````1 subgoal

X : Type
x, y, z : X
l, j : list X
J : x = z
H : y :: l = j
I : j = z :: l

========================= (1 / 1)

x = y
``````

And the error is :

``````The command has indeed failed with message:
In environment
X : Type
x, y, z : X
l, j : list X
J : x = z
H : y :: l = j
I : j = z :: l
The term "j" has type "list X" while it is expected to have type "X".
``````

It seems quite straightforward here that `j` is the intermediate term and it should be "`list X`".
What was wrong?

• Your goal is an equality between terms of type `X`, so in order to use `transitivity` to prove the goal you must provide an intermediate term of type `X`. It seems like you want to use `transitivity` to prove `y :: l = z :: l`, so you must introduce that as an intermediate goal. Commented Jul 25 at 8:51
• I see, thanks. It wasn't obvious when first learning to use `transitivity`. Now it makes more sense that the tactics are aiming at the goal, not just infer information from the environment. The book doesn't state this and I somehow just assumed and skipped that middle step. @NaïmFavier
– Tyl
Commented Jul 25 at 9:12
• I think this is a useful information which could help others. You can write that as an answer if you wish, and I will accept it. Thanks for the help! @NaïmFavier
– Tyl
Commented Jul 25 at 9:17
• `transitivity j.` fails because that means you want to say that `x = j ` which are of different types, `x : X` and `j : list X` Commented Jul 26 at 7:59
• I got some misunderstandings from earlier exercises `trans_eq_example''` and `trans_eq_exercise`, after read your comment I reviewed and reflected, it makes more sense now. Thanks! @larsr
– Tyl
Commented Jul 26 at 16:18