Blackbody Radiation: 100K to 1000K Energy Increase

AI Thread Summary
The discussion focuses on calculating the increase in radiated energy when a blackbody's temperature rises from 100K to 1000K. The correct answer is identified as a factor of 10,000, based on the Stefan-Boltzmann law, which states that power is proportional to the fourth power of temperature (P ∝ T^4). Participants express confusion over the distinction between energy and power in the context of the problem, highlighting that the question does not explicitly mention power. The relationship between temperature and energy is clarified through the equations provided, emphasizing the importance of understanding the underlying physics. Ultimately, the consensus is that the energy increase is substantial due to the fourth power relationship.
CaneAA
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Homework Statement



By what factor does the radiated energy increase when a blackbody changes temperatures from 100K to 1000K

a) 100
b) 6600
c) 1 x 10^ 4 <--- marked as the correct answer on the key.
d) 5.7 x 10^4
e) 1 x 10^6

Homework Equations



1) f(peak) = 5.88x10^10*T
2) E = hf

The Attempt at a Solution



By inspection, I see that if T increases by a factor of 10, the frequency will increase by a factor of 10 and so will the energy. So I'm getting that the answer is a factor of 10. I even plugged in numbers and I still get 10. I don't understand how they got that answer.
 
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I see, thank you. But how do you know they're referring to power and not energy? They don't mention power or rate of energy radiated.
 
If I told you that a mass was increased, then you would assume the gravitational force on it was also increased. It's a similar idea with energy and power.
 

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