Every text book I've ever read about Category Theory gives the definition of natural transformation as a collection of morphisms which make the well known diagrams commute.
There is another possible definition of natural transformation, which appears to be a categorification of homotopy:

> given two functors $\mathcal F,\mathcal G \colon \mathcal C \to \mathcal D$ a natural transformation is a functor $\varphi \colon \mathcal C \times 2 \to \mathcal D$, where $2$ is the arrow category $0 \to 1$, such that $\varphi(-,0)=\mathcal F$ and $\varphi(-,1)=\mathcal G$.

My question is:
> why doesn't anybody use this definition of natural transformation which seems to be more "natural" (at least for me)?  

(Edit:) It seems that many people use this definition of natural transformation. This arises the following question: 

> Is there any introductory **textbook (or lecture)** on category theory that introduces natural transformation in this "homotopical" way rather then the classical one? 

(Edit:) I belive that "The power of a question is all the ideas or other things you find out trying to answering it", this question gave to me a lot of ideas, I think I'll try to obtain just one last.
After the various answers and comments I belive it's know the time to make this last question:

> Would it be a good idea presenting the concept of natural transformation in the homotopical way rather then the classical one in a  introductory textbook to category theory?

I'd like to see pros and cons.