Find the solution of the inequality `2log_(1/4)(x+5)>9/4log_(1/(3sqrt(3)))(9)+log_(sqrt(x+5))(2)`

The values of x satisfying 2log_((1)/(4))(x+5)gt(9)/(4)log_((1)/(3sqrt(3)))(9)+log_(sqrt(x+5))(2)

The solution set of the inequation (1)/(log_(2)x) lt (1)/(log_(2)sqrt(x+2)) , is

The solution set of the inequation (1)/(log_(2)x) lt (1)/(log_(2)sqrt(x+2)) , is

Number of solutions of the equation (1)/(2)log_(sqrt(3))((x+1)/(x+5))+log_(9)(x+5)^(2)=1 is -

The positive integral solution of the equation log_(x)sqrt(5)+log_(x)5x=(9)/(4)+log_(x)^(2)sqrt(5) is:

The number of solutions of the equation (1)/(2) log_(sqrt(3)) ((x + 1)/(x + 5)) + log_(9) (x + 5)^(2) = 1 is

Number of integers satisfying the inequality log_((x + 3)/(x - 3))4 lt 2 [log_(1/2)(x - 3)-log_(sqrt(2)/2)sqrt(x + 3)] is greater than

Find the sum of all solutions of the equation 3^((log_(9)x)^(2)-(9)/(2)log_(9)x+5)=3sqrt(3)

Number of integers satisfying the inequality log_((x + 3)//(x - 3))4 lt 2 [log_(1//2)(x - 3)-log_(sqrt(2)//2)sqrt(x + 3)] is greater than (A) 6 (B) 5 (C) 4 (D) 3