Given, mass of a neutron `=1 .00866u,` mass of a proton `= 1.00727u,` mass of `{:(16), (8):}O = 15. 99053u.` Then, the energy required to separate `{:(16),(8):}O` into its constituents is

Calculte the binding energy per nucleon for ._(10)^(20)Ne,._(26)^(56)Fe and ._(98)^(238)U . Given that mass of neutron is 1.008665 am u , mass of proton is 1.007825 am u , mass of ._(10)^(20)Ne is 19.9924 am u , mass of ._(26)^(56)Fe is 55.93492 am u and mass of ._(92)^(238)U is 238.050783 am u .

If mass of proton =1.007825 u, mass of neutron =1.008665 u, and mass of ._(3)Li^(7) is 7.01599u, and 1a.m.u. =931MeV, what is BE/nucleon of ._(3)Li^(7) .

From the given data, the amount of energy required to break the nucleus of aluminium ""_(13)^(27) Al is "_______ "x xx 10^(-3)J. Mass of neutron = 1.00866 u Mass of proton = 1.00726 u Mass of Aluminium nucleus = 27.18846 u (Assume 1 u corresponds to x J of energy) (Round off to the nearest integer)

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.

Making use of the table of atomic masses given above find the energy required for the separation of an ._(8)^(16)O nucleus into 4 identical particle

The atomic mass of ._(7)N^(15) is 15.000108 "amu" and that of ._(8)O^(16) is 15.994915 "amu" . The minimum energy required to remove the least tightly bound proton is ( mass of proton is 1.007825 "amu" )

If the mass of proton= 1.008 a.m.u. and mass of neutron=1.009a.m.u. then binding energy per nucleon for ._(4)Be^9 (mass=9.012 amu) would be-

If the mass of a proton, m_(p)=1.008u mass of a neutron m_(n)=1.009u ,then the binding energy of an alpha -particle of mass 4.003 u will be (Mev) (take 1a.m.u=931MeV)

calculate the mass defect of Helium [""._(2)He^(4)] mass of proton =1.007276 u, Mass of neutron =1.008665u, Mass of ""._(2) He^(4)= 1.001506 u,