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The energy of the conduction band at which the probability of the conduction electrons state will occupied by
election is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV]
(Round off to two decimal places)
election is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV]
(Round off to two decimal places)
Correct answer is between '5.40,5.44'. Can you explain this answer?
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Verified Answer
The energy of the conduction band at which the probability of the cond...
.......(i)Now T = 800 K, now solving equation (i) for ΔE, we get ΔE = 5.42 eV
We get, ΔE = 5.42eV
Most Upvoted Answer
The energy of the conduction band at which the probability of the cond...
To determine the energy of the conduction band at which the probability of the conduction electron state will be occupied by election, we can use the Fermi-Dirac distribution function. The Fermi-Dirac distribution function gives the probability of occupation of a state at a given energy level in a system at a specific temperature.
The Fermi-Dirac distribution function is given by:
f(E) = 1 / (1 + exp((E-EF)/(k*T)))
where:
f(E) is the probability of occupation of a state at energy E,
EF is the Fermi energy level,
k is the Boltzmann constant,
T is the temperature.
Given that the probability of occupation is 90% (0.9) and the temperature is 800K, we can rearrange the Fermi-Dirac distribution function to solve for the energy E:
0.9 = 1 / (1 + exp((E-EF)/(k*T)))
To solve this equation, we need to know the value of the Fermi energy level (EF). Given that EF = 5.52eV, we can substitute this value into the equation:
0.9 = 1 / (1 + exp((E-5.52)/(k*800)))
Now we can solve this equation numerically to find the value of E. By iterating through different values of E, we can determine the energy at which the probability of occupation is 90%. The correct answer lies between 5.40eV and 5.44eV.
Therefore, the energy of the conduction band at which the probability of the conduction electron state will be occupied by election is between 5.40eV and 5.44eV.
The Fermi-Dirac distribution function is given by:
f(E) = 1 / (1 + exp((E-EF)/(k*T)))
where:
f(E) is the probability of occupation of a state at energy E,
EF is the Fermi energy level,
k is the Boltzmann constant,
T is the temperature.
Given that the probability of occupation is 90% (0.9) and the temperature is 800K, we can rearrange the Fermi-Dirac distribution function to solve for the energy E:
0.9 = 1 / (1 + exp((E-EF)/(k*T)))
To solve this equation, we need to know the value of the Fermi energy level (EF). Given that EF = 5.52eV, we can substitute this value into the equation:
0.9 = 1 / (1 + exp((E-5.52)/(k*800)))
Now we can solve this equation numerically to find the value of E. By iterating through different values of E, we can determine the energy at which the probability of occupation is 90%. The correct answer lies between 5.40eV and 5.44eV.
Therefore, the energy of the conduction band at which the probability of the conduction electron state will be occupied by election is between 5.40eV and 5.44eV.
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The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer?
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The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer? for GATE 2024 is part of GATE preparation. The Question and answers have been prepared according to the GATE exam syllabus. Information about The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer? covers all topics & solutions for GATE 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer?.
The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer? for GATE 2024 is part of GATE preparation. The Question and answers have been prepared according to the GATE exam syllabus. Information about The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer? covers all topics & solutions for GATE 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for The energy of the conduction band at which the probability of the conduction electrons state will occupied byelection is 90% at T = 800K. is__________(eV). [Given: EF =5.52eV](Round off to two decimal places)Correct answer is between '5.40,5.44'. Can you explain this answer?.
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