`log_(2)log_(3)log_(4)(x-1)>0`

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

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

The domain of f(x)=log_(a1)log_(a2)log_(a3)log_(a4)(x)(a_(i)>0) is

If log_(2)log_(3)log_(4)log_(5)A=x , then the value of A is

The domain of f(x)=log_(2)log_(3)log_((4)/(pi))(cot^(-1)x)^(-1) is

Find the domain of f(x)=log_(4)log_(3)log_(2)(|x]-1|-2)

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

The expression: (((x^(2)+3x+2)/(x+2))+3x-(x(x^(3)+1))/((x+1)(x^(2)+1))-log_(2)8)/((x-1)(log_(2)3)(log_(3)4)(log_(4)5)(log_(5)2)) reduces to

If log_(2)[log_(3)(log_(2)x)]=1 , then x is equal to

Find positive no.x which satisfy the equation log_(3)x*log_(4)x(log_(5)x-1)=log_(5)x*(log_(4)x+log_(3)x)