Two radio active nuclei X and Y decay into stable nucleus Z
`X to Z + 2alpha+ beta^-`
`Y to Z + alpha + 2 beta^+`
if `Z_1` and `Z_2` are atomic numbers of X and Y then

If x = sin alpha, y = sin beta, z = sin (alpha + beta) then cos (alpha + beta) =

Consider the system of equations : x + y + z = 0 alpha x + beta y + gamma z = 0 alpha^(2) x + beta^(2) y + gamma^(2) z = 0 then the system of equations has

A nucleus with atomic number Z (Z = 92) emits the following particles in a sequence alpha, beta^(-), alpha, alpha, beta^(-), beta^(+), alpha, beta^(-), alpha, beta^(+) . The atomic number of the resulting nucleus is

If the line (x-2)/3 =(y-1)/-5 =(z+2)/2 lies in the plane x+3y - alphaz + beta=0 , then: (alpha, beta)-=

An ordered pair (alpha, beta) for which the system of linear equations (1 + alpha) x beta y +z = 2 alphax + (1+beta)y+z = 3 alphax + beta y + 2z = 2 has a unique solution, is

When a nucleus with atomic number Z and mass number A undergoes a radioactive decay process, (i) Both Z and A will decrease, if the process is alpha decay (ii) Z will decrease but A will not change, if the process is beta^(+)- decay (iii) Z will increase but A will not change, if the process is beta- decay (iv) Z and a will remain uncharged, if the prices is gamma decay

If x=r sin alpha cos beta, y= r sin alpha sin beta and z= r cos alpha , prove that x^(2)+y^(2) + z^(2) = r^(2).