Respuesta :
Answer:
346.01 × 10² Lux
Explanation:
Given:
luminance of the sun at zenith at sea level, Ls = 1600 × 10 cd/m²
The diameter of the sun's photosphere = 8.64 × 10 miles = 45.62 × 10⁸ ft
or
Radius, r = [tex]\frac{45.62\times10^8\ ft}{\textup{2}}[/tex]
or
r = 22.81 × 10⁸ ft
The distance from the sun to the earth = 92.9 × 10 miles = 49.05 x 10¹⁰ ft
Now,
Lumen = Luminance × 4πr²
or
Lumen = 1600 × 10 cd/m² × 4πr² .....................(1)
also,
Illumination = [tex]\frac{\textup{Lumen}}{\textup{4}\pi\textup{Distance}^2}[/tex]
on substituting lumen from 1
Illumination = [tex]\frac{1600\times10\times4\pi r^2}{\textup{4}\pi\textup{Distance}^2}[/tex]
or
Illumination = [tex]\frac{1600\times10^6\times4\pi\times(22.81\times10^8\ ft)^2}{\textup{4}\pi\textup{49.05\times10^10 ft}^2}[/tex]
or
Illumination = 346.01 × 10² Lux
