Consider the sequence `u_n=sum_(r=1)^n r/2^r , n >= 1` then the `limit_(n->oo) u_n`

sum_(r=1)^n r (n-r +1) is equal to :

Find the sum of sum_(r=1)^n(r^n C_r)/(^n C_(r-1) .

sum_(r=1)^n r(n-r) is equal to :

Find the sum sum_(r=1)^n r/((r+1)!) where n!= 1xx2xx3....n .

In a geometric series, the first term is a and common ratio is rdot If S_n denotes the sum of the terms and U_n=sum_(n=1)^n S_n ,then r S_n+(1-r)U_n equals (a) 0 b. n c. n a d. n a r

If sum_(r=1)^n T_r=(3^n-1), then find the sum of sum_(r=1)^n1/(T_r) .

lim_(n to oo) sum_(r=1)^(n) (1)/(n)e^(r//n) is

If S_n=sum_(r=0)^n 1/(nC_r) and t_n=sum_(r=0)^n r/(nC_r), then t_n/S_n=

If sum_(r=1)^n T_r=n(2n^2+9n+13), then find the sum sum_(r=1)^nsqrt(T_r)dot

For a sequence {a_(n)}, a_(1) = 2 and (a_(n+1))/(a_(n)) = 1/3 , Then sum_(r=1)^(oo) a_(r) is