`log_x2. log_(2x)2 log_2 (4x)> 1`

53, Solution set of log_(x)2.log_(2x)2=log_(4x)2 is

Solve the inequality: log_(x)2.log_(2x)2. log_(2)4x gt 1

Let I_(1) : (log_(x)2) (log_(2x)2) (log_(2)4x)gt1 I_(2) : x^((log_(10)x)^(2)-3(log_(10)x)+1) gt 1000 and solution of inequality I_(1) is ((1)/(a^(sqrt(a))),(1)/(b))cup(c, a^(sqrt(a))) and solution of inequality I_(2) is (d, oo) then answer the following Both root of equation dx^(2) - bx + k = 0, (k in R) are positive then k can not be

Let I_(1) : (log_(x)2) (log_(2x)2) (log_(2)4x)gt1 I_(2) : x^((log_(10)x)^(2)-3(log_(10)x)+1) gt 1000 and solution of inequality I_(1) is ((1)/(a^(sqrt(a))),(1)/(b))cup(c, a^(sqrt(a))) and solution of inequality I_(2) is (d, oo) then answer the following Sum of 'd' term of a GP whose common ratio is (1)/(a) and first term is c is more than

Solve log_(x)2log_(2x)2=log_(4x)2

Largest integral value satisfying log_(x)2log_(2x)2log_(2)4x>1 is (A)4(B)3(C)2 (D) None of these

(log_x2)(log_(2x)2)=log_(4x)2 n(logx 2)(log2x 2) = log4x2 is

If log_(4)(log_(2)x) + log_(2) (log_(4) x) = 2 , then find log_(x)4 .

The solution set of the equation "log"_(x)2 xx "log"_(2x)2 = "log"_(4x) 2, is

The value of x :satisfying the equation log_(4)(2log_(2)x)+log_(2)(2log_(4)x)=2 is