thats where it comes from, its called geometry 😉

if R is that then all Horizons must be no more than 1.225 times the square root of observer height

one foot obseerver height put the horizon where>? Draw in crayon again, yellow this time, thanks 🙂

I'll do so I gtg now tho

ok

@Goldstation hi man

we

hi

a

Dimensional analysis tells me your formula is wrong

Or at least that 1.225 must have a unit

Ah yes, units.

They are a communist judeo-masonic conspiracy.

You heard it here first.

Ilks youre wrong

you offer nothing as a correction I see so move along

Youre saying that a distance is equal to the square root of a distance

This is meaningless

I got to reading about Electronic polarization and wow

@Logrian was your formula for the distance of the geometric horizon?

Tell me whats the formuli then?

distance square root of height

I think the exact formula is D = √ (2hR + h²)

So for a small height D ≈ √ (2hR)=√(2R) √h

The distance is proportionnal to the square root of the height but as i said the constant have a unit

so now answer the question, at one foot whats the distance of the physical geometric horizon supposed to be?

Idk it must be less than 6.21 miles as you ask

So if that is the case why do we see the horizon at ten miles plus at one foot height?

Because we dont see the geometrical horizon

we know, we been telling globers that for fives years an more 😄

So why is it at ten miles?

You know, refraction

which type?

Atmospheric refraction

well no, but okay

we'll go with that

so how can a non-physical horizon refract

Can i dm you an image

you can post here if you like, you now have perms 🙂

Thanks