Let `p(X)=x^(5)+2x+2019` and `q=p^(-1)` denote the inverse function of p. The value of q'(2019) is

Let g be a real-valued differentiable function on R such that g(x)=3e^(x-2)+4int_(2)^(x)sqrt(2t^(2)+6t+5)dt AA x in R and let g^(-1) be the inverse function of g. If (g^(-1))'(3) is equal to (p)/(q) where p and q are relatively prime,then find (p+q)

Let f(x)=(2x-pi)^(3)+2x-cos x .If the value of (d)/(dx)(f^(-1) (x)) at x=pi can be expressed in the form of (p)/(q) ( where p and q are natural numbers in their lowest form), then the value of (p+q) is

If range of the function f(x)=sin ^(-1) x+2 tan ^(-1) x+x^2+4 x +1 is [p, q] then find the value of (p+q) .

int_(p)^(q)[x]dx+int_(p)^(q)[-x]dx where [] denotes greatestinteger function is equal to-

Let P(x) and Q(x) be two quadratic polynomials such that minimum value of P(x) is equal to twice of maximum value of Q(x) and Q(x)>0AA x in(1, 3) and Q (x)<0AA x in(-oo, 1)uu(3, oo) . If sum of the roots of the equation P(x)=0 is 8 and P(3)-P(4)=1 and distance between the vertex of y=P(x) and vertex of y=Q(x) is 2sqrt(2) The polynomial P(x) is:

let f(x)=5 , -oo 1) f(g(x))=5 then find the value of 2p+q

If p inR and q = log_(x) (p+sqrt(p^(2)+1)) , then find the value of p in terms of x and q.