Find x if `log_(2) log_(1//2) log_(3) x gt 0`

If log_(2) x xx log_(3) x = log_(2) x + log_(3) x , then find x .

Find x if 9^(1//log_(2)3) le log_(2) x le log_(8) 27

Solve for x: log_(4) log_(3) log_(2) x = 0 .

The domain of the function f(x) = log_(3/2) log_(1/2)log_pi log_(pi/4) x is

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

Find x, if : (i) log_(2) x = -2 (ii) log_(4) (x + 3) = 2 (iii) log_(x) 64 = (3)/(2)

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

If xy^(2) = 4 and log_(3) (log_(2) x) + log_(1//3) (log_(1//2) y)=1 , then x equals

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 for x: a) log_(x)2. log_(2x)2 = log_(4x)2 b) 5^(logx)+5x^(log5)=3(a gt 0), where base of log is 3.