Let `T_(r )` be the rth term of an A.P. for r = 1,2,3,`"………."`. If for some positive integers m,n we have `:`
`T_(m) = ( 1)/( n) ` and `T_(n) = ( 1)/(m)` , then `T_(mn )` equals `:`

Let T_(r ) be the rth term of an A.P. whose first term is a and common difference is d. If for some positive integers, m,n,mcancel(=)n, T_(n) = ( 1)/( n ) and T_(n) = ( 1)/( m) , then a -d equals :

If n is any positive integer then the value of (i^(4 n+1)-i^(4 m-1))/(2)=

For a positive integer n, let a(n)=1+(1)/(2)+(1)/(3)+(1)/(4)+ . . .+(1)/(2^(n)-1) Then:

In a sequence, if T_(n+1)=4n+5 , then T_n is:

If sum_(r=1)^(infty) tan ^(-1)((1)/(2 r^(2)))=t then tan t is equal to

If t_(n) denotes the nth term of the series : 2+3+6+11+18+"………." , then t_(50) is :

IF m^(th) term of an A.P. is n and n^(th) term is m, then find p^(th) term?

If I(m,n) = int_0^1 t^m (1 + t)^n dt , m, n in R , then I(m, n) is :

If the pth, qth and rth terms of a G.P. are , l,m,n respectively , then l^(q-r)m^(r-p)n^(p-q) is :

If mth term of an AP is 1/n and its nth term is 1/m , then show that its (mn)th term is 1