Let f(x)=x^3-12x be function such that t...

Let `f(x)=x^3-12x` be function such that the equation `|f(|x|)|=n (n in N)` has exactly `6` distinct real roots then number of possible values of `n` are

Similar Questions

Explore conceptually related problems

If the function f(x)=2x^(3)+ax^(2)+bx,a,b varepsilon N. has exactly three distinct real zeros,then the minimum value of a+3b is equal to

The number of integral values of n such that the equation 2n{x}=3x+2[x]has exactly 5 solutions.

f(x)=[2+3|n|sin x],n in N,x in(0,pi) has exactly 11 points of discontinuity Then the value of n is

Let f :R to R be a function, such that |f(x)|le x ^(4n), n in N AA n in R then f (x) is:

If f(x)=x^(3)-3x+1, then the number of distinct real roots of the equation f(f(x))=0 is

The equation 3x^(2)-12x+(n-5)=0 has equal roots. Find the value of n.

The equation 3x^(2)-12x+(n-5)=0 has repeated roots. Find the value of of n.