Question 2570
As, log of a to the base b = log a/log b

So, log of 9 to the base square root of x = log 9/log (square root of x)
=> log 9/log(x^1/2) = > 

As, log(a^b) = bloga
=> log 9/log(x^1/2) = log (3^2)/log(x^1/2) = 2log3/((1/2)logx) = 4log3/logx...(1)

log of 3 to the base x = log 3/logx...(2)

log ofx to the base square root of 3 = log x/log (3^1/2) = log x/ ((1/2)log3) = 2logx/log3...(3)

Now according to the quesiton and using the equations (1)(2) and (3)
we get
4log3/logx - log3/logx = 9 + 6(2logx/log3)
=> 3log3/logx = 9 + 12logx/log3
=> 3log3/logx = (9log3 + 12logx)/log3
=> 3log3*log3 = 9log3*logx + 12logx*logx

Let logx be X and log3 be Y
=> 3Y*Y = 9YX + 12 X*X
=>  12X^2 + 9XY - 3Y^2 = 0
=> 4X^2 + 3XY - Y^2 = 0
=> 4X^2 + 4XY-XY -Y^2 = 0
=> 4X(X+Y)-Y(X+Y)=0
=> (4X-Y)(X+Y)=0

According to the zero product rule
4X-Y =0 and X+Y = 0
=> X = Y/4 and X = -Y
as Y = log 3
and X = logx
So, X= Y/4 
=> logx = (log 3)/4 = log (3^1/4)
=> x = 3^1/4

X = -Y
=> logx = -log 3 = log 3^-1 = log (1/3)
so x = 1/3