sum_(k=1)^(300)((1)/(k sqrt(k+1)+(k+1)sqrt(k)))" is the ratio of two relative prime positive integers "m" and "n." The "

sum_(k=1)^(360)((1)/(ksqrt(k+1)+(k+1)sqrt(k))) is the ratio of two relative prime positive integers m and n. The value of (m+n) is equal to

sum_(k=1)^(360)(1)/(k sqrt(k+1)+(k+1)sqrt(k)) is the ratio of two relatively prime positive integers m and n then the value of m+n is equal to

Find sum_(k=1)^(n)(1)/(k(k+1)) .

sum_(k=1)^(oo)(1)/(k sqrt(k+2)+(k+2)sqrt(k))=(2+sqrt(2))/(a) then

If sum_(k=4)^(143) (1)/(sqrt(k)+sqrt(k+1))=a-sqrt(b) then a and b respectively are

sum_(k =1)^(n) k(1 + 1/n)^(k -1) =

If sum_(k=4)^(143)(1)/(sqrt(k)+sqrt(k+1))=a-sqrt(b) then a and b are respectively

The value of sum_(k=0)^(oo)(k^(2))/(4^(k)) can be written as (m)/(n) where m and n are relatively prime positive integers.Then the value of (m+n) is