In hydrogen atom, the area enclosed by `n^(th)` orbit is `A_(n)`. The graph between log `(A_(n)/A_(1))` log will be

In hydrogen atom, the radius of n^(th) Bohr orbit is V_(n) . The graph Beetween log .(r_(n)/r_(1)) will be

In a hydrogen atom, the radius of n^(th) bohr orbit is r_n . The graph between log (r_n//r_1) and logn will be

In a hydrogen atom the radius of n^(th) Bohr orbit is 'r_(n)' . The graph between log (r_(n) //r_(1)) taken on y-axis and log(n) on x-axis will be

Let A_(n) be the area enclosed by n^(th) orbit in the H-atoms. The graph ln ((A_(n))/(A_(l))) against ln(n)

Let A_(n) be the area enclosed by the n^(th) orbit in a hydrogen atom. The graph of l n (A_(n)//A_(t)) against In (n)

Let A_(n) be the area enclosed by the n^(th) orbit in a hydrogen atom. The graph of l n (A_(n)//A_(t)) against In (n)

The frequency of revolution of electron in n^("th") Bohr orbit is v_(n) .The graph between log n and log(v_(n)/v_(1)) may be

Let A_(0) be the area enclosed by the orbit in a hydrogen atom .The graph of ln (A_(0) //A_(1)) against ln(n)

Let A_(0) be the area enclined by the orbit in a hydrogen atom .The graph of in (A_(0) //A_(1)) againest in(pi)

Let A_(0) be the area enclined by the orbit in a hydrogen atom .The graph of in (A_(0) //A_(1)) againest in(pi)