Let `S = sum_(n =1)^(99) (5^(100))/((25)^(n) + 5^(100))`. Find [S]. Where [y] denotes largest integer less than or equal to y.

Let K=sum_(r=1)^(n)(1)/(r sqrt(r+1)+(r+1)sqrt(r)) and [x] denotes greatest integer function less than or equal to x then [K]

For each positive integer n, let y_(n)=(1)/(n)((n+1)(n+2)n+n)^((1)/(n)) For x in R let [x] be the greatest integer less than or equal to x. If (lim)_(n rarr oo)y_(n)=L, then the value of [L] is

where f (n) = [(1)/(3) + (3n)/(100)] n, where [ n] denotes the greatest integer less than or equal to n. Then sum_(n=1)^(56)int (n) is equal to :

For each positive integer n, let j y_(n) =1/n ((n +1) (n +2) …(n +n) )^(1/n). For x in R, let [x] be the greatest integer less than or equal to x, If lim _( n to oo) y_(n) =L, then the value of [L] is "_________."

Let S=sum_(r=1)^(117)(1)/(2[sqrt(r)]+1) where [.) denotes the greatest integer function.The value of S is

Find the area in the 1* quadrant bounded by [x]+[y]=n, where n in N and y=k(where k in n AA k<=n+1), where [.] denotes the greatest integer less than or equal to x.