Derive Expression for Schrodingers wave equation in a one dimensional box
Answers
Step-by-step explanation:
Schrodinger Equation is a mathematical expression which describes the change of a physical quantity over time in which the quantum effects like wave-particle duality are significant. The Schrodinger Equation has two forms the time-dependent Schrodinger Equation and the time-independent Schrodinger Equation. The time-dependent Schrodinger Wave Equation derivation is provided here so that students can learn the concept more effectively.
Questions related to the derivation of Schrodinger Wave Equation is one of the most commonly asked questions in board exams and various competitive exams. The derivation of Schrodinger Wave Equation is given below in such a way that students understand the concept in an interesting and easy manner.
Schrodinger Wave Equation Derivation (Time-Dependent)
Considering a complex plane wave:
Derivation Of Schrodinger Wave Equation
Now the Hamiltonian of a system is
Derivation Of Schrodinger Wave Equation
Where ‘V’ is the potential energy and ‘T’ is the kinetic energy. As we already know that ‘H’ is the total energy, we can rewrite the equation as:
Derivation Of Schrodinger Wave Equation
Now taking the derivatives,
Derivation Of Schrodinger Wave Equation
We know that,
Derivation Of Schrodinger Wave Equation
where ‘λ’ is the wavelength and ‘k’ is the wavenumber.
We have
Derivation Of Schrodinger Wave Equation
Therefore,
Derivation Of Schrodinger Wave Equation
Now multiplying Ψ (x, t) to the Hamiltonian we get,
Derivation Of Schrodinger Wave Equation
The above expression can be written as:
Derivation Of Schrodinger Wave Equation
We already know that the energy wave of matter wave is written as
Derivation Of Schrodinger Wave Equation
So we can say that
Derivation Of Schrodinger Wave Equation
Now combining the right parts, we can get the Schrodinger Wave Equation.
Derivation Of Schrodinger Wave Equation
This was the Derivation Of Schrodinger Wave Equation (time-dependent). Students must learn a9ll the steps of Schrodinger Wave Equation derivation to score good marks in their examination. can check in byjues