derive an expression for energy o an electro in hydrogen atom
Answers
Answer:
Therefore, En∝1n2. Hence the expression for total energy of electron in nth Bohr orbit is −mZ2e48ε02h2n2J.
Explanation:
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Answer:
Consider a hydrogen like atom having only one electron. ... The force acting on the electron will be given by Coulomb's Law. F=(Ze)(−e)4πε0r=−Ze24πε0r. Since it is a circular motion, this force will be the force required to keep the electron in circular motion and hence will be equal to the centripetal force.
Answer:
Consider a hydrogen like atom having only one electron. ... The force acting on the electron will be given by Coulomb's Law. F=(Ze)(−e)4πε0r=−Ze24πε0r. Since it is a circular motion, this force will be the force required to keep the electron in circular motion and hence will be equal to the centripetal force.