A diatomic molecule is made of two masses which are separated by a distance r. If we calculate its rotational energy by applying Bohr's rule of angular momentum quantization, its energy will be given by (n is an integer):
1.
2.
3.
4.
In a hydrogen atom, which of the following electronic transitions would involve the maximum energy change?
1. From \(n = 2\) to \(n = 1\)
2. From \(n = 3\) to \(n = 1\)
3. From \(n = 4\) to \(n = 2\)
4. From \(n = 3\) to \(n = 2\)
The Bohr model of the atom:
1. Assumes that the angular momentum of electrons is quantized
2. Uses Einstein's photoelectric equation
3. Predicts continuous emission spectra for atoms
4. Predicts the same emission spectra for all types of atoms
When a hydrogen atom is raised from the ground state to excited state
1. both KE and PE increase
2. both KE and PE decrease
3. PE increases and KE decreases
4. PE decreases and KE increases
The extreme wavelengths of Paschen series are
1. 0.365 and 0.565
2. 0.818 and 0.189
3. 1.45 and 4.04
4. 2.27 and 7.43
A hydrogen atom is in an excited state of principal quantum number \((n)\). It emits a photon of wavelength \((\lambda)\) when it returns to the ground state. The value of \(n\) is:
1. \(\sqrt{\frac{\lambda R}{\lambda R-1}}\)
2. \(\sqrt{\frac{(\lambda R-1)}{\lambda R}}\)
3. \(\sqrt{\lambda(R-1)}\)
4. None of these
Consider an electron in the \(n^\mathrm{th}\) orbit of a hydrogen atom in the Bohr model. The circumference of the orbit can be expressed in terms of the de-Broglie wavelength \(\lambda\) of that electron as:
1. \((0.529)n\lambda\)
2. \(\sqrt{n\lambda}\)
3. \((13.6)n\lambda\)
4. \(n\lambda\)
In the Bohr's model of a hydrogen atom, the centripetal force is furnished by the Coulomb attraction between the proton and the electron. If is the radius of the ground state orbit, m is the mass and e is the charge on the electron, is the vaccum permittivity, the speed of the electron is [1998]
1. zero
2.
3.
4.
The ground state energy of H-atom is 13.6 eV. The energy needed to ionise H-atom from its second excited state [1991]
1. 1.51 eV
2. 3.4 eV
3. 13.6 eV
4. 12.1 eV
1. \(\frac{\lambda}{3}\)
2. \(\frac{3\lambda}{4}\)
3. \(\frac{4\lambda}{3}\)
4. \(3\lambda\)