(c)Calculate the surface temperature of sun and moon given that \( \lambda_m = 4753 \, \text{Å} \) and 14 \(\mu \text{m}\) respectively, \( \lambda_m \) being wavelength at the maximum intensity of emission.
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JU-PHY2nd YearFinalThermal PhysicsRadiationStefan-Boltzmann law; Wien's displacement law. (Topic Practice)JU-PHY - ⚡ অনলাইন প্রশ্নব্যাংক দেখুন 💥
Another Explanation (5): Using Wien's Displacement Law, \( \lambda_m T = b \), where \( b = 2.898 \times 10^{-3} \, \text{mK} \).
For the Sun:
\( T_{sun} = \frac{b}{\lambda_m} = \frac{2.898 \times 10^{-3} \, \text{mK}}{4753 \times 10^{-10} \, \text{m}} \approx 6100 \, \text{K} \)
For the Moon:
\( T_{moon} = \frac{b}{\lambda_m} = \frac{2.898 \times 10^{-3} \, \text{mK}}{14 \times 10^{-6} \, \text{m}} \approx 207 \, \text{K} \)
Related Questions (Any University/Year)
- (a) What is the temperature of its emitting surface?
- b) Derive Wien's law of energy distribution.
- f) If a blackbody at temperature 6174 K emits 4700 Å with maximum energy, calculate the temperature at which it will emit a wavelength of \(1.4 \times 10^{-3}\) m with maximum energy.
- (c) A black body at temperature 4980 K emits radiation of wavelength 4000 Å with maximum energy. Calculate the temperature at which it will emit a wavelength of \(1.45 \times 10^{-5} \, \text{cm}\) with maximum energy.
- (c) What is the wavelength of maximum intensity radiation radiated from a source at temperature \(3000^\circ \text{C}\)? (Wien's constant \(b = 0.288 \, \text{cm} \cdot \text{K}\)).
- (h) Calculate the energy radiated per minute from the filament of an incandescent Lamp at 1500 K if the surface area is \(4.5 \times 10^{-5} \, \text{m}^2\) and its relative emittance is \(0.65 \, (\sigma = 5.672 \times 10^{-8} \, \text{W/m}^2\text{K}^4)\).
- (d) If a black body at temperature \(6174 \, \text{K}\) emits \(4700 \, \text{Å}\) with maximum energy. Calculate the temperature at which it emits a wavelength of \(1.4 \times 10^{-3} \, \text{m}\) with maximum energy.
- (g) If a black body at temperature 6174 K emits 4700 \text{\AA} with maximum energy; Calculate the temperature at which it will emit a wavelength of \( 1.4 \times 10^{-5} \text{m} \) with maximum energy.
- (j) State Wien’s displacement law.
- (g) A black sphere of diameter 4 cm is heated to 400 K when the surrounding temperature is 300 K. What is the rate at which energy is radiated? Given \( \sigma = 6 \times 10^{-8} \, \text{Wm}^{-2} \, \text{K}^{-4} \).
- (xiii) State Stefan-Boltzmann law.
- (d) Calculate the maximum amount of heat which may be lost per second by radiation from a sphere of 5 cm in diameter at a temperature of 600 K when is placed in an encloser at a temperature of 300 K. Given that \(\sigma = 5.7 \times 10^{-12} \, \text{watts/cm}^{-2} / (\circ C)^{-4}\).
- (b) What is the energy density of the Sun's radiation?
- (b) State and explain Stefan-Boltzmann's law.
- (b)State and explain Wein's displacement law.
- (f) Calculate the surface temperature of sun and moon given that \( \lambda_m = 4753 \text{\AA} \) and \( 14 \mu \text{m} \) respectively, \( \lambda_m \) being wavelength of maximum intensity of emission.
- (k)What is Stefan-Boltzmann law? State Wein's displacement law.
- g) What is Stefan-Boltzmann law?
- (5) Two large closely spaced concentric spheres (both are black body radiators) are maintained at temperatures of 200 K and 300 K respectively. The space in between the two spheres is evacuated. Calculate the net rate of energy transfer between the two spheres. [Given: \(\sigma = 5.672 \times 10^{-8} \, \text{W/m}^2\text{K}^4\)]
- (4) The spectral energy curve of sunlight has a maximum at a wavelength of \(4.84 \times 10^{-7} \, \text{m}\). Assuming the Sun to be a black body,