maybe we should ask the inverse question.now that we have added the graphs what have we achieved and what purpose does this serve?

anyway,what interests me more than adding graphs is multiplying them.and i suspect that these two binary operations have something to do with drawability as well,but that's just a guess.

]]>it means just to add their polynomials to get a third polynomial and then draw a graph that is represented by that polynomial.

]]>maybe it is.but let's pretend it isn't and build up on it.

]]>i posted this so that someone could help me figure out what can be done with this.that person is now you

]]>this is somewhat new.whatever I say here from now on is just what i come up with you or what just pops into my head.

]]>Okay, so you are using a generating function with the coefficients representing the degree of each node. If you knew what you were counting with addition of two graphs then maybe we could proceed.

]]>sometimes i cannot go onto my laptop so i just go on my phone,but when i have the time i go on my laptop or desktop.

i have edited #3 so that now it includes the promised example

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