3sqrt(log2x)-log2 8x+1=0...

`3sqrt(log_2x)-log_2 8x+1=0`

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The number of integral value of x satisfying the following system of inequalities (sqrt(log_(2)^(2)x-3log_(2)x+2))/(log_(5)((1)/(3)log_(3)5-1))>=&x-sqrt(x)-2>=0 is 0 (2) 1 (3) 2 (4) 3

Sum of integers satisfying sqrt((log)_2x-1)-1/2(log)_2(x^3)+2>0 is......

Sum of integers satisfying sqrt((log)_2x-1)-1/2(log)_2(x^3)+2>0 is......

Sum of integers satisfying sqrt((log)_2x-1)-1/2(log)_2(x^3)+2>0 is......

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The equation x^((3)/4 (log_2x)^2+log_2 x -(5)/(4))=sqrt(2) has :

The equation x^((3)/4 (log_2x)^2+log_2 x -(5)/(4))=sqrt(2) has :

3^(log_(3)log sqrt(x))-log x+log^(2)x-3=0

Find the value of x satisfying the equation, sqrt((log_3(3x)^(1/3)+log_x(3x)^(1/3))log_3(x^3))+sqrt((log_3(x/3)^(1/3)+log_x(3/x)^(1/3))log_3(x^3))=2

Find the value of x satisfying the equation, sqrt((log_3(3x)^(1/3)+log_x(3x)^(1/3))log_3(x^3))+sqrt((log_3(x/3)^(1/3)+log_x(3/x)^(1/3))log_3(x^3))=2

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