Answer
Verified114.9k+ views
Hint: The above problem is based on Wien's displacement law. This law explains the relationship between the maximum light wavelengths that a source can emit. The Wien's constant is the constant that results from multiplying the light's wavelength by its temperature.
Formula used:
The expression of Wien’s displacement law is,
${\lambda _{\max }}T = \text{Constant}$
Here, $\lambda _{\max }$ is the maximum value of the wavelength and $T$ is the temperature.
Complete step by step solution:
In the question the temperature of the sun is $T = 6000\,K$, maximum wavelength of radiation emitted $\lambda = 0.5\mu m$ and the sun cools to a temperature where it emits $81\% $ of present power. Let’s assume the temperature after cooling be $T'$ and the maximum wavelength emitted after cooling be $\lambda '$. As we know the energy emitted per unit time or power emitted by any body $\mu = e\sigma A{T'^4}$.
To find the temperature after cooling, compare the given information with the energy emitted per unit time, then we have:
$\dfrac{{0.81{\mu _1}}}{{{\mu _1}}} = \dfrac{{e\sigma A{{T'}^4}}}{{e\sigma A{{(6000)}^4}}} \\$
$\Rightarrow 0.81 \times {(6000)^4} = {{T'}^4} \\$
$\Rightarrow T' = \sqrt[4]{{1.0497 \times {{10}^{15}}}}K \\$
$\Rightarrow T' = 5692.099 \approx 5692.1\,K \\$
Apply the Wien’s displacement law to calculate the formula for temperature of the sun ${\lambda _{\max }}T = \text{Constant}$
We have the constant as $\lambda T = \lambda 'T'$ then substitute the given values, we obtain:
$0.5\mu m \times 6000\,K = \lambda ' \times 5692.1\,K \\$
$\Rightarrow \lambda ' = \dfrac{{0.5\mu m \times 6000\,K}}{{5692.1\,K}} \\$
$\Rightarrow \lambda ' = 0.527\mu m \\$
$\therefore \lambda ' \approx 0.53\mu m \\$
Therefore, the maximum wavelength emitted after cooling is approximately $0.53\mu m$.
Additional information: When a body is heated up, its thermal radiation becomes apparent. For shorter wavelengths, the radiation's maximum temperature can be observed. The relationship between the body's temperature and the thermal radiation's wavelength is inverse. The overall emissive power of the body is determined by the area under the curve between its wavelength and temperature.
Note: Before using the Wien's displacement law, it is necessary to convert the wavelength in metres and the temperature in Kelvin from degrees Celsius. For a shorter wavelength of light, the body emits the higher thermal radiation.
Formula used:
The expression of Wien’s displacement law is,
${\lambda _{\max }}T = \text{Constant}$
Here, $\lambda _{\max }$ is the maximum value of the wavelength and $T$ is the temperature.
Complete step by step solution:
In the question the temperature of the sun is $T = 6000\,K$, maximum wavelength of radiation emitted $\lambda = 0.5\mu m$ and the sun cools to a temperature where it emits $81\% $ of present power. Let’s assume the temperature after cooling be $T'$ and the maximum wavelength emitted after cooling be $\lambda '$. As we know the energy emitted per unit time or power emitted by any body $\mu = e\sigma A{T'^4}$.
To find the temperature after cooling, compare the given information with the energy emitted per unit time, then we have:
$\dfrac{{0.81{\mu _1}}}{{{\mu _1}}} = \dfrac{{e\sigma A{{T'}^4}}}{{e\sigma A{{(6000)}^4}}} \\$
$\Rightarrow 0.81 \times {(6000)^4} = {{T'}^4} \\$
$\Rightarrow T' = \sqrt[4]{{1.0497 \times {{10}^{15}}}}K \\$
$\Rightarrow T' = 5692.099 \approx 5692.1\,K \\$
Apply the Wien’s displacement law to calculate the formula for temperature of the sun ${\lambda _{\max }}T = \text{Constant}$
We have the constant as $\lambda T = \lambda 'T'$ then substitute the given values, we obtain:
$0.5\mu m \times 6000\,K = \lambda ' \times 5692.1\,K \\$
$\Rightarrow \lambda ' = \dfrac{{0.5\mu m \times 6000\,K}}{{5692.1\,K}} \\$
$\Rightarrow \lambda ' = 0.527\mu m \\$
$\therefore \lambda ' \approx 0.53\mu m \\$
Therefore, the maximum wavelength emitted after cooling is approximately $0.53\mu m$.
Additional information: When a body is heated up, its thermal radiation becomes apparent. For shorter wavelengths, the radiation's maximum temperature can be observed. The relationship between the body's temperature and the thermal radiation's wavelength is inverse. The overall emissive power of the body is determined by the area under the curve between its wavelength and temperature.
Note: Before using the Wien's displacement law, it is necessary to convert the wavelength in metres and the temperature in Kelvin from degrees Celsius. For a shorter wavelength of light, the body emits the higher thermal radiation.
Recently Updated Pages
JEE Main 2023 January 25 Shift 1 Question Paper with Answer Key
Geostationary Satellites and Geosynchronous Satellites for JEE
Complex Numbers - Important Concepts and Tips for JEE
JEE Main 2023 (February 1st Shift 2) Maths Question Paper with Answer Key
JEE Main 2022 (July 25th Shift 2) Physics Question Paper with Answer Key
Inertial and Non-Inertial Frame of Reference for JEE
Trending doubts
JEE Main 2025: Application Form (Out), Exam Dates (Released), Eligibility & More
JEE Main Chemistry Question Paper with Answer Keys and Solutions
Class 11 JEE Main Physics Mock Test 2025
Angle of Deviation in Prism - Important Formula with Solved Problems for JEE
JEE Main Login 2045: Step-by-Step Instructions and Details
Average and RMS Value for JEE Main
Other Pages
NCERT Solutions for Class 11 Physics Chapter 7 Gravitation
NCERT Solutions for Class 11 Physics Chapter 9 Mechanical Properties of Fluids
Units and Measurements Class 11 Notes - CBSE Physics Chapter 1
NCERT Solutions for Class 11 Physics Chapter 1 Units and Measurements
NCERT Solutions for Class 11 Physics Chapter 2 Motion In A Straight Line
NCERT Solutions for Class 11 Physics Chapter 8 Mechanical Properties of Solids