A nucleus `._(Z)^(A)X` has mass represented by `m(A, Z)`. If `m_(p)` and `m_(n)` denote the mass of proton and neutron respectively and `BE` the blinding energy (in MeV), then

m_(P) and m_(n) are masses of proton and neutron respectively. An element of mass m has Z protons and N neutrons, then

If M_(o) is the mass of an oxygen isotope ._(8)O^(17), M_(p) and M_(N) are the masses of a proton and neutron respectively, the nuclear binding energy of the isotope is:

If m,m_n and m_p are masses of ._Z X^A nucleus, neutron and proton respectively.

If m,m_n and m_p are masses of ._Z X^A nucleus, neutron and proton respectively.

Let M_(1) and M_(2) be the masses of the nuclei ""_(1)H^(2) and ""_(2)H^(4) respectively. Aslo let m_(p) and m_(n) be the masses of proton and neutron respectively.

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)

Nucleus ._(3)A^(7) has binding energy per nucleon of 10 MeV . It absorbs a proton and its mass increases by (90)/(100) times the mass of proton. Find the new binding energy of the nucleus so formed. [Take energy equivalent of proton = 930 MeV ]

(a) What is a.m.u ? Express 1 a.m.u. in MeV. (b) Write the approximate mass of a proton, neutron and electron in a.m.u.

If M, m_n and m_p are masses (in kg) of nucleus X_z^A , neutron and proton respectively, then mass defect (Deltam) is equal to

An element of mass M has Z protons and Nneutrons. Masses of proton and neutron are m_(p) and m_(n) respectively. Choose the correct relation among following options.