Frequancy `=f_(1)`, Time period = T, Energy of `n^(th)` orbit `= E_(n)`, radius of `n^(th)` orbit `=r^(n)`, Atomic number = Z, Orbit number = n :
`{:(,"Column-I",,"Column-II",),((A),f,(p),n^(3),),((B),T,(q),Z^(2),),((E),E_(n),(r ),(1)/(n^(2)),),((D),(1)/(r_(n)),(s),Z,):}`

" Energy of the n^(th) orbit "-

In Bohr's model, r_(n,z)= radius of n^(th) orbit with atomic number Z u_(n,z) =P.E of electron in n^(th) orbit with atomic number Z K_(n,z) = K.E of electron in n^(th) orbit with atomic number Z V_(n,z) = velocity of electron in n^(th) orbit with atomic number Z T_(n,z)= time period of revolution in n^(th) orbit with atomic number Z {:(Column I,Column II),((A)U_(1.2),K_(1.1),(p)1:8),((B)r_(2.1),r_(1.2),(q)-8:1),((C)V_(1.3),V_(3.1),(r)9:1),((D)T_(1.2),T_(2.2),(s)8:1):}

The correct match of the following is : {:(,"Column - I",,"Column - II"),((i),""^(n)C_(r ),(a),n!),((ii),""^(n)C_(0),(b),1),((iii),""^(n)P_(r ),(c ),r!.""^(n)C_(r )),((iv),""^(n)P_(n),(d),""^(n)C_(n-r)):}

According to Bohr's theory, the radius of the n^(th) orbit of an atom of atomic number Z is proportional

Radius (r_(n)) of electron in nth orbit versus atomic number (Z) graph is

Let R_(t) represents activity of a sample at an insant and N_(t) represent number of active nuclei in the sample at the instant. T_(1//2) represents the half life. {:(,"Column I",,"Column II"),((A),t=T_(1//2),(p),R_(t)=(R_(0))/(2)),((B),t=(T_(1//2))/(ln2),(q),N_(0)-N_(t)=(N_(0))/(2)),((C),t=(3)/(2)T_(1//2),(r),(R_(t)-R_(0))/(R_(0)) = (1-e)/(e)),(,,(s),N_(t)=(N_(0))/(2sqrt(2))):}

Calculate the ratio of the radius of 1^(st) orbit of H atom to thatof 4^(th) orbit. Hint : r_(n) prop ( n)^(2)

The radius of n^th orbit r_n in the terms of Bohr radius (a_0) for a hydrogen atom is given by the relation

Time period of revolution of an electron in n^(th) orbit in a hydrogen like atom is given by T = (T_(0)n_(a))/ (Z^(b)) , Z = atomic number