1.In the options given below, let EEE denote the rest mass energy of a nucleus and nnn a neutron. The correct option isa.E(236U)>E(141Ba)+E(92Kr)+2E(n)E({}^{236}\text{U}) > E({}^{141}\text{Ba}) + E({}^{92}\text{Kr}) + 2E(n)E(236U)>E(141Ba)+E(92Kr)+2E(n)b.E(236U)<E(137I)+E(Y)+2E(n)E({}^{236}\text{U}) < E({}^{137}\text{I}) + E(\text{Y}) + 2E(n)E(236U)<E(137I)+E(Y)+2E(n)c.E(236U)<E(141Ba)+E(92Kr)+2E(n)E({}^{236}\text{U}) < E({}^{141}\text{Ba}) + E({}^{92}\text{Kr}) + 2E(n)E(236U)<E(141Ba)+E(92Kr)+2E(n)d.E(236U)=E(141Ba)+E(92Kr)+2E(n)E({}^{236}\text{U}) = E({}^{141}\text{Ba}) + E({}^{92}\text{Kr}) + 2E(n)E(236U)=E(141Ba)+E(92Kr)+2E(n)Login to continueOnly logged in users canattempt or see the solution.