Let `A_(n)` be the area enclosed by the nth orbit in a hydrogen atom.The grpah of 1n `((A_(n))/(A_1))` 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_(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)) against ln(n)

The figure shows a graph between 1n |(A_(n))/(A_(1))| and 1n|n| , where A_(n) is the area enclosed by the n^(th) orbit in a hydrogen like atom. The correct curve is

The figure shows a graph between 1n |(A_(n))/(A_(1))| and 1n|n| , where A_(n) is the area enclosed by the n^(th) orbit in a hydrogen like atom. The correct curve is

If, in a hydrogen atom, radius of nth Bohr orbit is r_(n) frequency of revolution of electron in nth orbit is f_(n) and area enclosed by the nth orbit is A_(n) , then which of the pollowing graphs are correct?

Let A_(1), A_(2), A_(3),….., A_(n) be squares such that for each n ge 1 the length of a side of A _(n) equals the length of a diagonal of A _(n+1). If the side of A_(1) be 20 units then the smallest value of 'n' for which area of A_(n) is less than 1.

Let a_(n) = (1+1/n)^(n) . Then for each n in N

If A_(n) is the area bounded by y=x and y=x^(n), n in N, then A_(2).A_(3)…A_(n)=

Let a_(1), a_(2) ...be positive real numbers in geometric progression. For n, if A_(n), G_(n), H_(n) are respectively the arithmetic mean, geometric mean and harmonic mean of a_(1), a_(2),..., a_(n) . Then, find an expression for the geometric mean of G_(1), G_(2),...,G_(n) in terms of A_(1), A_(2),...,A_(n), H_(1), H_(2),..., H_(n)