" The solution of the equation "9^(log(3...

" The solution of the equation "9^(log_(3)(log_(2)x))=log_(2)x-(log_(2)x)^(2)+" lis "

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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

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

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

Solve the following equation for x: 9^(log_(3)(log_(2)x))=log_(2)x-(log_(2)x)^(2)+1

The solution set of the equation x^(log_(x)(1-x)^(2))=9 is

If 9^("log"_3("log"_(2) x)) = "log"_(2)x - ("log"_(2)x)^(2) + 1, then x =

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