The difference of roots of the equation `((log)_(27)x^3)^2=(log)_(27)x^6` is .......

Solve (log)_2(3x-2)=(log)_(1/2)x

The number of roots of the equation (log)_(3sqrt("x"))x+(log)_(3x)sqrt(x)=0 is 1 (b) 2 (c) 3 (d) 0

Solve (log)_x2(log)_(2x)2=(log)_(4x)2.

Solve (log)_(2x)2+(log)_4 2x=-3//2.

Find the number of solution to equation (log)_2(x+5)=6-x :

The value of x for which the equation 5*3^(log_3x)-2^(1-log_2x)-3=0

The number of real solution(s) of the equation 9^(log_(3)(log_(e )x))=log_(e )x-(log_(e )x)^(2)+1 is equal to

For a >0,!=1, the roots of the equation (log)_(a x)a+(log)_x a^2+(log)_(a^2a)a^3=0 are given a^(-4/3) (b) a^(-3/4) (c) a (d) a^(-1/2)

Let a >1 be a real number. Then the number of roots equation a^(2(log)_2x)=15+4x^((log)_2a) is 2 (b) infinite (c) 0 (d) 1