While related to laptop or smartphone displays, it's lighting related!
Modern quality displays go up to about 1,000 nits outdoors. Some go even above that while displaying HDR stuff (1,200 nits - iPhone 13).
What about light sources?
Let's take an F40T12 like Philips Alto with 2,500 lumens.
It's 1.5" diameter (38.1 mm), 48" long. Let's say its lighted part is 46.5" (1181.1 mm).
Now it's getting a bit difficult. What's the apex angle? Couldn't find anything but the FT light is pretty omni-directional. Let's say 300 degrees...? (I know the emission isn't totally uniform or homogenous...)
The three-dimensional angular span for an apex angle, using Ω for the angular span (in steradian) and 2θ for the apex angle, is
(souce):
Ω = 2π(1 − cos 2θ/2) = 2π(1 − cos 150) = 11.724 sr
Candela to lumens calculation is
(source):
Φv(lm) = Iv(cd) × Ω(sr), so Iv = Φv / Ω
Our F40T12 is 2500 lm / 11.724 sr = 213.23 cd (using the number reversely in the calculator + our apex angle I get 2500 lm so it seems ok)
What about nits? These are just candela per square metre
(wikipedia).
The surface area of our cylindrical tube in metres is L = 2πrh = 2π * 0.0381/2 * 1.1811 = 0.141 m2
(Wikipedia).
213.23 cd / 0.141 m2 = 1511 nitsSo our F40T12 is 1.5x brighter than iPhone 13 at the maximum brightness outdoors, which should be 1000 nits
(source).
Now you can compare and tell if my calculations were correct.
