`log (log_(ab) a +(1)/(log_(b)ab))` is (where `ab ne 1)`

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

Prove log_(b)b = 1

If log_(a)b+log_(b)c+log_(c)a vanishes where a, b and c are positive reals different than unity then the value of (log_(a)b)^(3) + (log_(b)c)^(3) + (log_(c)a)^(3) is

Prove log_(b) 1=0

If (log)_b a(log)_c a+(log)_a b(log)_c b+(log)_a c(log)_bc=3 (where a , b , c are different positive real numbers !=1), then find the value of a b c .

If ((log)_a N)/((log)_c N)=((log)_a N-(log)_b N)/((log)_b N-(log)_c N), where N >0 and N!=1, a , b , c >0,!=1 , then prove that b^2=a c

If a, b, c, are positive real numbers and log_(4) a=log_(6)b=log_(9) (a+b) , then b/a equals

Let log_(c)ab = x, log_(a)bc = y and log_(b) ca = z . Find the value of (xyz - x - y - z) .

f(x)=log_(e)abs(log_(e)x) . Find the domain of f(x) .

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