If the answer to this equation L ∝ 4π · (r)^2 · (T)^4 would be 10 for example, would this mean that the proportional increase in luminosity would be 10 times greater than that of the Sun?
But is this correct?
Sorry no, I mean, if the answer to this equation L ∝ 4π · (r)^2 · (T)^4 is 10 for example, would this mean that the proportional increase in luminosity would be 10 times greater than that of the Sun?
I think I am confusing myself with the fact that the Sun has a luminosity figure of 1.
Thank you very much for confirming. I've edited a sentence slightly. Could you also confirm this statement?
If the value is less than 1 then it is this value times less luminous than the Sun and if the value is more than 1 then it is this value times more luminous than the Sun.
Thank you again.
I am attempting to calculate the proportional luminosity of a fictitious star using surface area and temperature in kelvin.
To what level of accuracy can I expect from the formula L ∝ AT^4?
Where L = Luminosity, A = surface area and T = Temperature
L ∝ AT^4
L ∝ 4π · (r)^2 · (T)^4
If I replace...