The atomic mass of `F^(19)` is 18.9984 `m_(u)`. If the masses of proton and neutron are `1.0078 m_(u)` and `.0087 m_(u)`. Respectively, calculate the binding energy per nucleon (ignore the mass of electrons). `(1 m_(u) = 931) MeV)`

The masses of a proton and a neutron are 1.0073 u and 1.0087 u , respectively. If the mass of an O^16 nucleus is 15.990525 u, then find out its binding energy per nuclear .

The mass of deutron (_1h^2) nucleus is 2.0135553 a.m.u.If the masses of proton and neutron are 1.007275 a.m.u. and 1.008665 a.m.u. respectrively.Calculate the mass defect,the packing fraction,binding energy and binding energy per nculeon.

Calculate the binding energy per nucleon of ._36^86Kr whose atomic mass is 83.913 u.(Mass of neutron is 1.0078u).

Calculate the binding energy per nucleon for C^(12) Masses of proton and neutron are 1.0078 and 1.0087, respectively. (m_(u)=931MeV)

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 defect of ""_(4)^(9)X is 0.09 a.m.u. then the binding energy per nucleon is (1 a.m.u= 931.5 MeV)

If the mass defect of ""_(4)^(9)X is a.m.u., then binding energy per nucleon is (1 a.m.u. = 931.5 MeV):

The mass of proton is 1.0073 u and that of neutron is 1.0087 u ( u= atomic mass unit). The binding energy of ._(2)He^(4) is (mass of helium nucleus =4.0015 u )

The mass of proton is 1.0073 u and that of neutron is 1.0087 u ( u= atomic mass unit). The binding energy of ._(2)He^(4) is (mass of helium nucleus =4.0015 u )