Apparent brightness of the Sun at 1 AU: Visual Magnitude = -26.74 Relative Brightness Factor = 100.000000 %
There are times when we may want to know how bright the sun would appear to be if viewed from a different perspective, such as how bright our sun might appear to be if viewed from Mercury or Pluto or even from several light years away.
This program applies the following magnitude versus distance formula to the problem of computing the apparent ideal visual stellar magnitude of the sun as viewed from any given distance expressed in astronomical units, light years or parsecs.
Space is being treated as 'crystal-clear' and free of any obscuring gas or dust, which is adequate for our purposes here.
Visual Magnitude vs. Distance
The general magnitude vs. distance formula may be expressed as
m1 = Visual magnitude of an astronomical body as viewed from distance d1
m2 = Visual magnitude of the same astronomical body as viewed from distance d2
In this case, the astronomical body is the Sun, but it could be a star, the moon, a planet, an asteroid, etc. Given any three known values, using Equation 1 above, we can directly derive the remaining unknown value.
When dealing with the basic problem of apparent stellar brightness and magnitude variation versus distance, there are three general units of distance we might apply, depending upon which is most convenient for the kind of work being done. These units are astronomical units (AU), light years (LY) and parsecs (pc).
Let -26.74 = Visual magnitude of the sun at 1.0 AU (NASA) 1 AU = 149597870691 m (NASA) Light Speed = 299792458 m/s (NIST) 1 Standard (Julian) Year = 365.25 days = 31557600 seconds For light years and parsecs, we derive the following: 1 LY = (Light Speed) * (Seconds per Standard Year) = (299792458 m/s) * (31557600 s) = 9460730472580800 m From which we derive the number of AUs per light year: AU_PER_LY = (9460730472580800 m/LY) / (149597870691 m/AU) = 9460730472580800 / 149597870691 = 63241.0770880709446742 AU/LY Since 1 parsec is the distance at which the sun has a parallax shift of 1 second of arc, a parsec, expressed in AUs, equates to the number of seconds of arc in a unit radian. ARCSEC_PER_RADIAN = ARCSEC_PER_DEG * 180 / pi = 3600 * 180 / 3.1415926535897932 = 206264.8062470963551565 arcsec/rad AU_PER_PC = ARCSEC_PER_RADIAN = 206264.8062470963551565 AU/pc
Generally, we can say that for any distance units defined in terms of AUs:
m = 5 * log10(AU_PER_DISTANCE_UNIT) - 26.74 For visual magnitude of the sun at 1.0 AU: m = 5 * log10(AU_PER_AU) - 26.74 = 5 * log10(1) - 26.74 = 5 * 0 - 26.74 = -26.74 For visual magnitude of the sun at 1.0 LY: m = 5 * log10(AU_PER_LY) - 26.74 = 5 * log10(63241.077088) - 26.74 = 5 * 4.800999 - 26.74 = -2.735 For visual magnitude of the sun at 1.0 pc: m = 5 * log10(AU_PER_PC) - 26.74 = 5 * log10(206264.806247) - 26.74 = 5 * 5.314425 - 26.74 = -0.1679 So, we have now derived the constants for the three distance units and can derive equations specific to each unit of measure: -26.74 = Visual magnitude of sun at distance of 1.0 AU -2.735 = Visual magnitude of sun at distance of 1.0 light year -0.1679 = Visual magnitude of sun at distance of 1.0 parsec
The following three visual magnitude versus distance equations were formulated specifically for application to the sun and were derived from Equation 1 and the computational data given above.
For solar distance reckoned in astronomical units (AU):
For solar distance reckoned in light years (LY):
For solar distance reckoned in parsecs (pc):
Solar visual magnitude at
Speed of light (
© Jay Tanner - 2019 - v3.0