Let A_(n) be the area enclined by the n th orbit in a hydrogen atom .The graph ofb ln `(A_(n) //A_(1))` againest 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 angular speed of the electron in the n^(th) Bohr orbit of the hydrogen atom is proportional to......

The value of lim_(n->oo) sum_(k=1)^n log(1+k/n)^(1/n) ,is

If a_(1), a_(2), a_(3).,,,,,,,,a_(n) are in A.P and their common difference is d. The value of the series sin d_(1) [sec a_(1).sec a_(2) + sec a_(2).sec a_(3)+ ….+ sec a_(n-1).sec a_(n)] is……..

If A_(1),A_(2),A_(3),…,A_(n) are n points in a plane whose coordinates are (x_(1),y_(1)),(x_(2),y_(2)),(x_(3),y_(3)),…,(x_(n),y_(n)) respectively. A_(1)A_(2) is bisected in the point G_(1) : G_(1)A_(3) is divided at G_(2) in the ratio 1 : 2, G_(2)A_(4) at G_(3) in the1 : 3 and so on untill all the points are exhausted. Show that the coordinates of the final point so obtained are (x_(1)+x_(2)+.....+ x_(n))/(n) and (y_(1)+y_(2)+.....+ y_(n))/(n)

Write the first five terms of each of the sequences whose n^(th) terms are as following a_(n)= n^(th) prime number

The nth term of a series is given by t_(n)=(n^(5)+n^(3))/(n^(4)+n^(2)+1) and if sum of its n terms can be expressed as S_(n)=a_(n)^(2)+a+(1)/(b_(n)^(2)+b) where a_(n) and b_(n) are the nth terms of some arithmetic progressions and a, b are some constants, prove that (b_(n))/(a_(n)) is a costant.

A person is to count 4500 currency notes. Let a_(n) denotes the number of notes he counts in the nth minute. If a_(1)=a_(2)="........"=a_(10)=150" and "a_(10),a_(11),"......", are in AP with common difference -2 , then the time taken by him to count all notes is

Find the indicated terms in each of the sequences whose n^(th) term is given: a_(n)= (n-1) (n+2)(n-3), a_(10)