In the nuclear raction `._1H^2 +._1H^2 rarr ._2He^3 +._0n^1` if the mass of the deuterium atom `=2.014741 am u`, mass of `._2He^3` atom `=3.016977 am u`, and mass of neutron `=1.008987 am u`, then the `Q` value of the reaction is nearly .

In the nuclear reaction ._92 U^238 rarr ._z Th^A + ._2He^4 , the values of A and Z are.

The source of energy of stars is nuclear fusion. Fusion reaction occurs at very high temperature, about 10^(7) . Energy released in the process of fusion is due to mass defect. It is also called Q -value. Q = Delta mc^(2), Delta m = mass defect. In a nuclear reaction ._(1)H^(2) + ._(1)H^(2) rarr ._(2)He^(3) + ._(0)n^(1) If the masses of ._(1)H^(2) and ._(2)He^(3) are 2.014741 and 3.016977 amu, respectively. then the Q -value of the reaction is nearly.

In the nuclear raction given by ._2He^4 +._7N^(14) rarr ._1H^1 +X the nucleus X is

In the nuclear raction given by ._2He^4 +._7N^(14) rarr ._1H^1 +X the nucleus X is

The nuclear reaction .^2H+.^2H rarr .^4 He (mass of deuteron = 2.0141 a.m.u and mass of He = 4.0024 a.m.u ) is

The reaction ._(1)D^(2) + ._(1)T^(3) rarr ._(1)He^(2) + ._(0)n^(1) is an example of

If mass of U^(235)=235.12142 a.m.u. , mass of U^(236) =236.1205 amu , and mass of neutron =1.008665 am u , then the energy required to remove one neutron from the nucleus of U^(236) is nearly about.

Consider the reaction _1^2H+_1^2H=_2^4He+Q . Mass of the deuterium atom =2.0141u . Mass of helium atom =4.0024u . This is a nuclear………reaction in which the energy Q released is…………MeV.

(a) (i) In the following nuclear reaction, calculate the energy released in MeV : ._(1)^(2)H+._(1)^(2)H to ._(2)^(3)He+._(0)^(1)n Given that : Mass of =2.015mu Mass of ._(2)^(3)He=3.017mu Mass of ._(0)^(1)n =1.009mu (ii) What is the name of this reaction ? (b) From Bohr.s energy quantisation formula, determine the target wavelength in the Balmer sereis of hydrogen atom spectrum.

Calculate the energy released in the following: ._(1)H^(2) + ._(1)H^(3) rarr ._(2)He^(4) + ._(0)n^(1) (Given masses : H^(2) = 2.014, H^(3) = 3.016, He = 4.003, n = 1.009 m_(u))