The function `f(x)=x^2+lambda/x` has a minimum at `x=2iflambda=16` maximum at `x=2iflambda=16` maximum for no real value of `lambda` point of inflection at `x=1iflambda=-1`

The function f(x)=x^(2)+(lambda)/(x) has a (a)minimum at x=2 if lambda=16 (b)maximum at x=2 if lambda=16 (c)maximum for no real value of lambda(d) point of inflection at x=1 if lambda=-1

The function f(x)=x^(2)e^(x) has maximum value

If the function f(x)=a/x+x^2 has a maximum at x=-3 then a=

The function f(x)=x^(2), x in R has no maximum value.

The function f(x)=2|x|+|x+2|-||x+2|-2|x|| has a local minimum or a local maximum at x equal to:

Function f(x)=cos x-2 lambda x is monotonic decreasing when (a) lambda>1/2(b)lambda 2

A cubic polynomial y=f(x) has a relative minimum at x=1& maximum at x=-2. If f(0)=1 then

The function f(x)=x^(2)+lambda x^(2)+5x+sin2x will be bijective function if lambda belongs to

Let the function f(x) be defined as below f(x)=sin^(-1)lambda+x^(2) when 0 =1.f(x) can have a minimum at x=1 then value of lambda is

The function f(x)=x^(2)+(a)/(x) cannot have a maximum at x=-3 for any real value of a. (True/false)