JEE Main 2013 (Offline) | Atoms and Nuclei Question 212 | Physics

In a hydrogen like atom electron make transition from an energy level with quantum number $$n$$ to another with quantum number $$\left( {n - 1} \right)$$. If $$n > > 1,$$ the frequency of radiation emitted is proportional to :

$${1 \over n}$$

$${1 \over {{n^2}}}$$

$${1 \over {{n^{{3 \over 2}}}}}$$

$${1 \over {{n^3}}}$$

AIEEE 2012

MCQ (Single Correct Answer)

-1

Hydrogen atom is excited from ground state to another state with principal quantum number equal to $$4.$$ Then the number of spectral lines in the emission spectra will be :

$$2$$

$$3$$

$$5$$

$$6$$

AIEEE 2012

MCQ (Single Correct Answer)

-1

Assume that a neutron breaks into a proton and an electron. The energy released during this process is : (mass of neutron $$ = 1.6725 \times {10^{ - 27}}kg,$$ mass of proton $$ = 1.6725 \times {10^{ - 27}}\,kg,$$ mass of electron $$ = 9 \times {10^{ - 31}}\,kg$$ ).

$$0.51$$ $$MeV$$

$$7.10\,MeV$$

$$6.30\,MeV$$

$$5.4\,MeV$$

AIEEE 2012

MCQ (Single Correct Answer)

-1

A diatomic molecule is made of two masses $${m_1}$$ and $${m_2}$$ 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)

$${{{{\left( {{m_1} + {m_2}} \right)}^2}{n^2}{h^2}} \over {2m_1^2m_2^2{r^2}}}$$

$${{{n^2}{h^2}} \over {2\left( {{m_1} + {m_2}} \right){r^2}}}$$

$${{2{n^2}{h^2}} \over {\left( {{m_1} + {m_2}} \right){r^2}}}$$

$${{\left( {{m_1} + {m_2}} \right){n^2}{h^2}} \over {2{m_1}{m_2}{r^2}}}$$

PREVIOUS NEXT

Questions Asked from Atoms and Nuclei (MCQ (Single Correct Answer))

Number in Brackets after Paper Indicates No. of Questions