Let `P = x^3 - 1/x^3, Q = x - 1/x` and `a` is the minimum value of `P/Q^2.` Then the value of `[a]` is (where `[x]` is greatest integer `lt= x.`)

P=x^3-1/x^3, Q=x-1/x x in (1,oo) then minimum value of P/(sqrt(3)Q^2)

P=x^(3)-(1)/(x^(3)),Q=x-(1)/(x)x in(1,oo) then minimum value of (P)/(sqrt(3)Q^(2))

Consider P(x) to be a polynomial of degree 5 having extremum at x=-1,1, and ("lim")_((xvec) 0) ((p(x))/(x^3)-2)=4 . Then the value of [P(1)] is (where [.] represents greatest integer function)___

Consider P(x) to be a polynomial of degree 5 having extremum at x=-1,1, and ("lim")_(xvec0)((p(x))/(x^3)-2)=4 . Then the value of [P(1)] is (where [.] represents greatest integer function)___

Consider P(x) to be a polynomial of degree 5 having extremum at x=-1,1, and ("lim")_(xvec0)((p(x))/(x^3)-2)=4 . Then the value of [P(1)] is (where [.] represents greatest integer function)___

The value of lim_(xrarr0^(+))(x)/(p)[(q)/(x)] , where [*] denotes greatest integer function is

" Q."5" The value of int_(1)^(a)[x]f'(x)dx,a>1 ,where "[x]" denotes the greatest integer not exceeding is "

If p(x) = x^3+3 and q(x)= x-3 then find the value of p(x).q(x)

Let P={1,2,3} , Q={a, b} Find P x Q and Q x P

If g:[-2,2] rarr R , where g(x)=x^(3)+tan x [(x^(2)+1)/(P)] is an odd function, then the value of parametric P, where [.] denotes the greatest integer function, is