To find the Maximum Flow in a graph,why doesn't it suffice to only saturate all augmenting paths with the minimum edge capacity in that path without considering the back-edges? I mean,what is the point calling it a back-edge if we assume flow from it ?
Back edges are necessary when doing the Ford-Fulkerson algorithm in case the path that you choose ends up not being a part of the overall flow.
As an example where back edges are necessary, consider this flow network:
Assume that all edges point down and that all edges have capacity 1 and that you want to find a flow from s to t. Suppose on the first iteration of Ford-Fulkerson that you take the path s -> b -> c -> t. At this point, you've pushed one unit of flow from s to t. If you don't add in any back edges, you're left with this:
There are no more s-t paths, but that doesn't mean you have a max flow. You can push two units of flow from s to t by sending one along the path s -> a -> c -> t and the other along the path s -> b -> d -> t. Without any back edges in the residual flow network, you would never discover this other path.
Hope this helps!