Let `f(x)=int e^(x^(2))(x-2)(x-3)(x-4)dx` then `f` increases on `(k,k+1)` then `k` is

Let f(x) = inte^(x^(2))(x-2)(x-3)(x-4)dx then f increases on

Let f(x)=min{e^(x), (3)/(2), 1+e^(-x)} if f(x)=k has at least 2 solutions then k can not be

Let f(x)=(e^(x))/(x^(2))x in R-{0}. If f(x)=k has two distinct real roots,then the range of k, is

f(x)=int(5x^8+7x^6)/(x^2+1+2x^7)^2dx , if f(0)=0 then find f(1)=1/k. Then k is

Let f(x) = {((x^(2) -2x -3)/(x + 1)","," when " x != -1),(" k,"," when " x = -1):} If f(x) is continuous at x = -1 then k = ?

Let f(x)=x^(3)+kx^(2)+5x+4sin^(2)x be an increasing function on x in R. Then domain of k is

Let f(x)=(kx)/(x+1) then the value of k such that f(x) is

Let F(x)=int e^(sin^(-1)x)(1-(x)/(sqrt(1-x^(2))))dx and F(0)=1, If F((1)/(2))=(k sqrt(3)e^((pi)/(6)))/(pi), then the value of k is