If 1 lies between the roots of equation `y^? - my +1 = 0` and [x] denotes the integral part of x, then `[((4|x|)/(x^2+16))]`where `x in R` is equal to

If 1 lies between the roots of equation y^2 - my +1 = 0 and [x] denotes the integral part of x, then [((4|x|)/(x^2+16))^m] where x in R is equal to

If both roots of the equation x^2-2ax+a^2-1=0 lie between -3 and 4 and [a] denotes the integral part of a, then [a] cannot be

If 2 lies between the roots 'of x^(2)+(a+1) x-a-2=0 then a in

If 2 lies between the roots of the equation t ^(2) - mt +2 =0,(m in R) then the value of [((2 |x|)/(9+x ^(2)))^(m)] is: (where [.] denotes greatest integer function)

If 2 lies between the roots of the equation t ^(2) - mt +2 =0,(m in R) then the value of [((2 |x|)/(9+x ^(2)))^(m)] is: (where [.] denotes greatest integer function)

If 2 lies between the roots of the equation t ^(2) - mt +2 =0,(m in R) then the value of [((2 |x|)/(9+x ^(2)))^(m)] is: (where [.] denotes greatest integer function)

Show that: int_0^[x] (x-[x])dx=[x]/2 , where [x] denotes the integral part of x .

Show that: int_0^[[x]] (x-[x])dx=[[x]]/2 , where [x] denotes the integral part of x .

If a=sin\ pi/18 sin\ (5pi)/18 sin\ (7pi)/18, and x is the solution of the equation y=2[x]+2 and y=3[x-2], where [x] denotes the integral part of x then a= (A) [x] (B) 1/[x] (C) 2[x] (D) [x]^2

Points of discontinuities of the function f(x)=4x+7[x]+2log(1+x) , where [x] denotes the integral part of x, is