For a real number x let `[x]` denote the largest integer less than or equal to x and `{x}=x-[x]`. The possible integer value of n for which `int_(1)^(n)[x]{x}dx` exceeds 2013 is

For a real number x let [x] denote the largest integer less than or equal to x and {x}=x-[x] Let n be a positive integer. Then int_(0)^(n)cos(2 pi)[x]{x})dx is equal to

Let [x] denotes the greatest integer less than or equal to x and f(x)= [tan^(2)x] .Then

For a real number x let [x] denote the largest integer les than or eqaul to x and {x} =x -[x]. Let n be a positive integer. Then int_(0)^(1) cos(2pi[x]{x})dx is equal to

For a real number x let [x] denote the largest number less than or equal to x. For x in R let f (x)=[x] sin pix . Then

For any real number x, let [x] denote the largest integer less than or equal to x. If int_0^10 [sqrt((10x)/(x+1))]dx then the value of 9I is

For any real number x, Let [x] denote the largest integer less than or equal to x. The value of 9 int_0^9 [sqrt frac{10x}{x 1}] dx

for a real number x, let [x] denote the largest unteger less than or equal to x , and let {x} = x-[x] . The number of solution x to the equation [x] {x} =5 with 0 le xle 2015 is -

Let [x] denote the greatest integer less than or equal to x . Then, int_(1)^(-1)[x]dx=?