356425 The ratio of the magnitude of the kinetic energy to the potential energy of an electron in the \(5^{\text {th }}\) excited state of a hydrogen atom is

356426 The binding energy of a \(H\)-atom, considering an electron moving around a fixed nuclei (proton), is \(B = \frac{{m{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(m\)- mass of electron). If one decides to work in a frame of reference where the electron is at rest, the proton would be moving around it. By similar arguments, the binding energy would be \(B = - \frac{{M{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(M = \) proton mass). This last expression is not correct because

356427 Frequency of revolution of an electron revolving in \({n^{th}}\) orbit of \(H\) - atom is proportional to

356428 Assertion :
In a hydrogen atom energy of emitted photon corresponding to transition from \(n=2\) to \(n=1\) is much greater as compared to transition from \(n=\infty\) to \(n=2\).
Reason :
Wavelength of photon is directly proportional to the energy of emitted photon.

356429 According to Bohr’s theory, the expressions for the kinetic and potential energy of an electron revolving in an orbit is given respectively by

356425 The ratio of the magnitude of the kinetic energy to the potential energy of an electron in the \(5^{\text {th }}\) excited state of a hydrogen atom is

356426 The binding energy of a \(H\)-atom, considering an electron moving around a fixed nuclei (proton), is \(B = \frac{{m{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(m\)- mass of electron). If one decides to work in a frame of reference where the electron is at rest, the proton would be moving around it. By similar arguments, the binding energy would be \(B = - \frac{{M{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(M = \) proton mass). This last expression is not correct because

356427 Frequency of revolution of an electron revolving in \({n^{th}}\) orbit of \(H\) - atom is proportional to

356428 Assertion :
In a hydrogen atom energy of emitted photon corresponding to transition from \(n=2\) to \(n=1\) is much greater as compared to transition from \(n=\infty\) to \(n=2\).
Reason :
Wavelength of photon is directly proportional to the energy of emitted photon.

356429 According to Bohr’s theory, the expressions for the kinetic and potential energy of an electron revolving in an orbit is given respectively by

356425 The ratio of the magnitude of the kinetic energy to the potential energy of an electron in the \(5^{\text {th }}\) excited state of a hydrogen atom is

356426 The binding energy of a \(H\)-atom, considering an electron moving around a fixed nuclei (proton), is \(B = \frac{{m{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(m\)- mass of electron). If one decides to work in a frame of reference where the electron is at rest, the proton would be moving around it. By similar arguments, the binding energy would be \(B = - \frac{{M{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(M = \) proton mass). This last expression is not correct because

356427 Frequency of revolution of an electron revolving in \({n^{th}}\) orbit of \(H\) - atom is proportional to

356428 Assertion :
In a hydrogen atom energy of emitted photon corresponding to transition from \(n=2\) to \(n=1\) is much greater as compared to transition from \(n=\infty\) to \(n=2\).
Reason :
Wavelength of photon is directly proportional to the energy of emitted photon.

356429 According to Bohr’s theory, the expressions for the kinetic and potential energy of an electron revolving in an orbit is given respectively by

356425 The ratio of the magnitude of the kinetic energy to the potential energy of an electron in the \(5^{\text {th }}\) excited state of a hydrogen atom is

356426 The binding energy of a \(H\)-atom, considering an electron moving around a fixed nuclei (proton), is \(B = \frac{{m{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(m\)- mass of electron). If one decides to work in a frame of reference where the electron is at rest, the proton would be moving around it. By similar arguments, the binding energy would be \(B = - \frac{{M{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(M = \) proton mass). This last expression is not correct because

356427 Frequency of revolution of an electron revolving in \({n^{th}}\) orbit of \(H\) - atom is proportional to

356428 Assertion :
In a hydrogen atom energy of emitted photon corresponding to transition from \(n=2\) to \(n=1\) is much greater as compared to transition from \(n=\infty\) to \(n=2\).
Reason :
Wavelength of photon is directly proportional to the energy of emitted photon.

356429 According to Bohr’s theory, the expressions for the kinetic and potential energy of an electron revolving in an orbit is given respectively by

356425 The ratio of the magnitude of the kinetic energy to the potential energy of an electron in the \(5^{\text {th }}\) excited state of a hydrogen atom is

356426 The binding energy of a \(H\)-atom, considering an electron moving around a fixed nuclei (proton), is \(B = \frac{{m{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(m\)- mass of electron). If one decides to work in a frame of reference where the electron is at rest, the proton would be moving around it. By similar arguments, the binding energy would be \(B = - \frac{{M{e^4}}}{{8{n^2}\varepsilon _0^2{h^2}}} \cdot \) (\(M = \) proton mass). This last expression is not correct because

356427 Frequency of revolution of an electron revolving in \({n^{th}}\) orbit of \(H\) - atom is proportional to

356428 Assertion :
In a hydrogen atom energy of emitted photon corresponding to transition from \(n=2\) to \(n=1\) is much greater as compared to transition from \(n=\infty\) to \(n=2\).
Reason :
Wavelength of photon is directly proportional to the energy of emitted photon.

356429 According to Bohr’s theory, the expressions for the kinetic and potential energy of an electron revolving in an orbit is given respectively by