For a >0,!=1, the roots of the equation...

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

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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)

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