The equation `(log_(8)((8)/(x^(2))))/((log_(8)x)^(2))=3` has

The product of roots of the equation (log_(8)(8//x^(2)))/((log_(8)x)^(2)) = 3 is

The equation ((log)_8(8/(x^2)))/(((log)_8x^2))=3 has- a. \ no integral solution b. one natural c. \ two real solution d. one irrational solution

If the equation (log_(12)(log_(8)(log_(4)x)))/(log_(5)(log_(4)(log_(y)(log_(2)x))))=0 has a solution for 'x' when c lt y lt b, y ne a , where 'b' is as large as possible, then the value of (a+b+c) is equals to :

If the equation (log_(12)(log_(8)(log_(4)x)))/(log_(5)(log_(4)(log_(y)(log_(2)x))))=0 has a solution for 'x' when c lt y lt b, y ne a , where 'b' is as large as possible, then the value of (a+b+c) is equals to :

Solve the equation log_((x^(3)+6))(x^(2)-1)=log_((2x^(2)+5x))(x^(2)-1)

If the interval x satisfying the equation |x| +|-x|=(log_(3)(x-2))/(|log_(3)(x-2)|) " is " (a,b), " then " a+b= _______.

Solve the equation: log_(2x+3)x^(2) lt log_(2x)(2x+3)

The equation (log_10x+2)^3+(log_10x-1)^3=(2log_10x+1)^3 has

Number of real values of x satisfying the equation log_(x^2+6x+8)(log_(2x^2+2x+3)(x^2-2x))=0 is equal to

The sum of all the roots of the equation log_(2)(x-1)+log_(2)(x+2)-log_(2)(3x-1)=log_(2)4