Approaching Studying Topology

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I'm writing this question to briefly inquire how to go about studying Topology based on my experience of having studied a bit of it. I have studied the first half of James Munkres' Topology, except for some units on the countability axioms.

A basic search shows that Topology is the studying of classifying spaces that are homeomorphic, or spaces that are identical to other under (continuous) deformations. I feel as if the the first half of the course on point-set topology was a bit of a let down in this regard. Nowhere did such issues arise; all what we did was defined various toplogical concepts and see the implications and relations between certain toplogical concepts on the toplogy defined on a space.

My questions are:

1. How is topology pedalogically taught?

2. After learning point-set topology, when/how can one go about learning toplogy with the focus I mentioned above? Does one have to venture into the study of Algebraic Topology?

On the whole, I am looking for responses that explain how is the subject taught pedalogically and how should one go about studying it?

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