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_(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 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

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

For a H-like species if area A_(1) is of ground state orbit and area A_(n) is of nth orbit, then, the plot of (A_(n))/(A_(1)) us n^(2) looks like:

The radius of the first (lowest) orbit of the hydrogen atom is a_(0) . The radius of the second (next higher) orbit will be

A_(0),A_(1),A_(2),A_(3),A_(4),A_(5) be a regular hexagon inscribed in a circle of unit radius,then the product of (A_(0)A_(1)*A_(0)A_(2)*A_(0)A_(4) is equal to

The magnitude of acceleration of the electron in the n^(th) orbit of hydrogen atom is a_(H) and that of singly ionized helium atom is a_(He) . The ratio a_(H):a_(He) is

Let the straight line y=k divide the area enclosed by x=(1-y)^(2) , x=0 and y=0 into two parts of areas, A_(1)(0 <= y <= k) and A_(2)(k <= y <= 1) such that (A_(1))/(A_(2))=7. Then (1)/(k) is equal to

A uniform magnetic field passes through two areas, A_(1) and A_(2) . The angles between the magnetic field and the normals of areas A_(1) and A_(2) are 30.0° and 60.0°, respectively. If the magnetic flux through the two areas is the same, what is the ratio A_(1)//A_(2) ?

Let A=[(1,1,1),(1,-1,0),(0,1,-1)], A_(1) be a matrix formed by the cofactors of the elements of the matrix A and A_(2) be a matrix formed by the cofactors of the elements of matrix A_(1) . Similarly, If A_(10) be a matrrix formed by the cofactors of the elements of matrix A_(9) , then the value of |A_(10)| is