The locus of the inequality `log_(1//3) |z+ 1| gt log_(1//3) |z - 1|` is

Number of solutions of the equation log_(10) ( sqrt(5 cos^(-1) x -1 )) + 1/2 log_(10) ( 2 cos^(-1) x + 3) + log_(10)sqrt5 = 1 is

The domain of sin^-1 [log_3 (x//3)] is :

Solve the equation log_(3)(5+4log_(3)(x-1))=2

Solve the equation log_(1/3)[2(1/2)^(x)-1]=log_(1/3)[(1/4)^(x)-4]

If z_(1),z_(2),z_(3) andz_(4) are the roots of the equation z^(4)=1, the value of sum_(i=1)^(4)z_i^(3) is

Find the value of x satisfying the equation, sqrt((log_3(3x)^(1/3)+log_x(3x)^(1/3))log_3(x^3))+sqrt((log_3(x/3)^(1/3)+log_x(3/x)^(1/3))log_3(x^3))=2

Solve the inequation 3^(x+2)gt(1/9)^(1//x) .

locus of the point z satisfying the equation |iz-1|+|z-i|=2 is

Solve the inequation log_(((x^2-12x+30)/10))(log_2((2x)/5))gt0

Solve the following inequation . (vi) log_(1//2)(3x-1)^2ltlog_(1//2)(x+5)^2