If `b gt 1, x gt 0` and `(2x)^(log_(b) 2)-(3x)^(log_(b) 3)=0`, then x is

If log_2 log_3 log_4 (x+1) =0, then x is :-

If a gt 0 and a ne 1, 2 log_(x)a +log_(ax)a +3 log_(a^(2)x) a = 0 , then x =

Solve the equation 2x^(log_(4)^(3))+3^(log_(4)^(x)=27

If log_(2)(log_(4)(x))) = 0, log_(3)(log_(4)(log_(2)(y))) = 0 and log_(4)(log_(2)(log_(3)(z))) = 0 then the sum of x,y and z is-

If log_(sqrt(2)) sqrt(x) +log_(2)x + log_(4) (x^(2)) + log_(8)(x^(3)) + log_(16)(x^(4)) = 40 then x is equal to-

Solve the equation x^(log_(x)(x+3)^(2))=16 .

If equation x^2 tan^2 theta - (2 tan theta ) x+1=0 and ((1)/(1+log_(b)ac))x^(2)+((1)/(a+log_(c)ab))x+((1)/(1+log_(a)bc)-1)=0 (where a,b,c , gt 1 ) have a common root and than 2nd equation has equal roots , then number of possible value of theta in (0,pi) is

Find the domain f(x)=(log_(2x)3)/(cos^(- 1)(2x-1)

If log_(9)x +log_(4)y = (7)/(2) and log_(9) x - log_(8)y =- (3)/(2) , then x +y equals

Statement I Common value(s) of 'x' satisfying the equation . log_(sinx )( sec x +8) gt o and log_(sinx) cos x + log_(cos x ) sin x =2 in (0, 4pi) does not exist. Statement II On solving above trigonometric equations we have to take intersection of trigonometric chains given by sec x gt 1 and x = n pi +(pi)/(4), n in I