This is an old revision of this page, as edited by Wnt(talk | contribs) at 14:38, 30 May 2016(try bigger hole to start!). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.Revision as of 14:38, 30 May 2016 by Wnt(talk | contribs)(try bigger hole to start!)
localp={}increment=1000-- 1000 meters = 1 km. Basis is meters and kilograms throughout.G=6.674E-11-- 6.674×10−11 N⋅m2/kg2M=1E26functionlocalg(r)-- black hole has gravity GM / r2returnM*G/(r*r)endfunctiondeltapressure(pressure,gravity)-- for a given global increment, return the increase in pressure in atm, pressure in gs-- density of "air" per pressure in atm is (1.225 kg/m3) / atm-- pressure of air is 101325 newton / m2 at 1 atm-- newton weight is kg * gravity-- so x atm of pressure weigh x * gravity * 1225 kg per kilometer per square meterreturnpressure*gravity*1.225*incrementendfunctionp.main(frame)-- we SHOULD start at the "exobase", which on Earth is roughly 7000 km from the center-- I am not finding decent figures for exosphere pressure-- for now let's calculate from an arbitrary (too high) 1 pascal and see from there what the dependence is-- exobase equivalent is where GM/r = same as on Earth, i.e. r = 7000 km * M / mass of Earthlocalr=7000000*M/5.97237E24-- kg, mass of Earthlocalp=1-- arbitrary 1 pascaloutput=""repeatp=p+deltapressure(p,localg(r))r=r-incrementoutput=output..p..","..r.."\n"untilr<1returnoutputendreturnp
