" For "x,a>0" the root(s) of the equatio...

" For "x,a>0" the root(s) of the equation "log_(ax)a+log_(x)a^(2)+log_(a^(2)x)a^(3)=0" is (are) given by "

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

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)

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)

the number of roots of the equation log_(3sqrt(x))x+log_(3x)(sqrt(x))=0 is

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

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

the number of roots of the equation log_(3sqrtx) x + log_(3x) (sqrtx) =0 is

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