If the mass defet of `""_(4)^(9)X` is 0.090 amu, their binding energy per nucleon is (1 amu = 931.5 MeV)

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 0.099 a.m.u. , then binding energy per nucelon is (1 a.m.u, 931.5 MeV)

The mass defect of He_(2)^(4) He is 0.03 u. The binding energy per nucleon of helium (in MeV) is

As the mass number increase binding energy per nucleon :

Binding energy per nucleon relation with mass number

The mass defect in a nucleus is 3.5 "amu" . Then the binding energy of the nucelus is

The mass defect for the nucleus of helium is 0.0303 a.m.u. What is the binding energy per nucleon for helium in MeV ?

The masses of neutron and proton are 1.0087 a.m.u. and 1.0073 a.m.u. respectively. If the neutrons and protons combine to form a helium nucleus (alpha particle) of mass 4.0015 a.m.u. The binding energy of the helium nucleus will be (1 a.m.u. = 931 MeV) .

Estimate the atomic mass of ._(30)^(64)Zn from the fact to be the binding energy per nucleon for it is about 8.7 MeV.