2 questions that came up in a past paper.
A binary tree which is both full and complete and has h levels contains a total of 2^(h-1)
leaf nodes. Prove that this is the case for all h > 0.
Show that with h levels the number of internal nodes is 2^(h−1) − 1
proof by induction apparently...
interesting point there Jimmy, thanks for that, I'd like to know what is the theoretical limit.
Also, another question, would all elements in space be able to be detected by spectroscopy techniques?
Not really I was trying to explain but they really weren't interested in what the force is or how it works and wouldn't even let me speak to try and explain anything about it and if I did kept saying unless I observe the strong force myself I'm just listening to someone elses science and I can't...
Also as note I stated the strong force is what holds the nucleus together as fact, there is no other mystical force there that might make another proton stick that the strong force can't.
yes I mentioned the separation of the 4 forces before Planck time but according to them that was an "now you're getting it!" moment so I didn't even bother replying mainly on what does he mean getting it? why is this relevant, ugh the fustration...
Right here's a story,
All this started with someone proclaiming that energy/mass equivalance and general relativity were the same thing, the other people taking this guys side and of course, they were wrong.
So eventually we came onto other topics and I said based on the strong nuclear...