The set of real values of x for which `log_ 0.2((x+2)/x) ≤1` is

Let f(x)=underset(ntooo)lim(1)/(((3)/(pi)tan^(-1)2x)^(2n)+5) . Then the set of values of x for which f(x)=0 is

The number of real values of the parameter k for which (log_(16)x)^(2) - log_(16) x+ log_(16) k = 0 with real coefficients will have exactly one solution is

The set of values of k for which x^2 - kx + sin^-1 (sin 4) > 0 for all real x is

The set of all values of lambda for which the system of linear equations 2x_(1)-2x_(2)+x_(3)=lambdax_(1) 2x_(1)-3x_(2)+2x_(3)=lambdax_(2) -x_(1)+2x_(2)=lambdax_(3) has a non-trivial solution,

Let f : R to [0, pi/2) be defined by f ( x) = tan^(-1) ( x^(2) + x + a. Then set of value of a for which f(x) is onto is

The set of values of a for which the inequality, x^2 + ax + a^2 + 6a < 0 is satisfied for all x belongs (1, 2) lies in the interval:

The set of value(s) of a for which the function f(x)=(a x^3)/3+(a+2)x^2+(a-1)x+2 possesses a negative point of inflection is

Find the number of real values of x satisfying the equation. log_(2)(4^(x+1)+4)*log_(2)(4^(x)+1)=3

Number of real values of x satisfying the equation log_(x^2+6x+8)(log_(2x^2+2x+3)(x^2-2x))=0 is equal to

Find the value of x of log_(4)x = 2