The real value of `x` for which satisfies the equation `((x^(2)-6sqrt(x)+7)/(x^(2)+6sqrt(x)+7))=1` is

For the equation 2x^(2)-6sqrt(2)x-1=0

The value of x satisfying the equation x=sqrt(2+sqrt(2-sqrt(2+x))) is

The only real value of x satisfying the equation is 6 sqrt((x)/(x +4)) - 2 sqrt((x + 4)/(x) = 11" " (1) where x in R

Integral value of x which satisfies the equation =log_(6)54+log_(x)16=log_(sqrt(2))x-log_(36)((4)/(9))is.

What are the values of x which satisfy the equation,sqrt(5x-6)+(1)/(sqrt(5x-6))=(10)/(3)?

The equation sqrt(x+3-4sqrt(x-1))+sqrt(x+8-6sqrt(x-1))= hs

Number of real values of x satisfying the equation sqrt(x^2 - 6x+9) + sqrt(x^2 - 6x +6) = 1 is (i)0 (ii)1 (iii)2