Let `f (x) =(2 |x| -1)/(x-3)`
Range of the values of 'k' for which `f (x) = k` has exactly two distinct solutions:

Let f (x)= sin ^(-1) x-cos ^(-1), x, then the set of values of k for which of |f (x)|=k has exactly two distinct solutions is :

Let f (x) is a real valued function defined on R such that f(x) = sqrt(4+sqrt(16x^2 - 8x^3 +x^4)) . The number of integral values of 'k' for which f(x) =k has exactly 2 distinct solutions for k in [0,5] is

Let f : R to R be defined by f(x) = |2-x| - |x+1| The number of integral values of a for which f(x) =a has exactly one solution is:

Minimum integral value of k for which the equation e^(x)=kx^(2) has exactly three real distinct solution,

Number of integral values of k for which the equation 4cos^(-1)(-|x|)=k has exactly two solutions,is:

Let f(x)=(x^(2))/(9-x^(2)) and l= number of integers in the domain of f(x) where f(x) is increasing m= number of solutions of f(x)=sin xn= least positive integral value of k for which f(x)=k posses exactly 3 different solutions then

If |x-1|+|x-2|+|x-3|=k, x epsilon R then value of k for which given equation has exactly one solution.

Q. 1 The value of k for which f(x)=x^(3)-2kx+k^(2)-5 has a factor x-2 is

Let f(x)=x + 2|x+1|+2| x-1| . Find the values of k if f(x)=k (i) has exactly one real solution, (ii) has two negative solutions, (iii) has two solutions of opposite sign.

The complete set of values of k for which the equation |x² - 6x +sgn (1+| sin x |)– 8 |= k^2 has exactly 4 distinct solutions is [Note: sgn (k) denotes signum function of k.]