Let `x_1 and x_2` satisfies the equation `x^2+6=x^(1+log_x 5) (x_1 gtx_2),` then

Let x_(1) and x_(2) satisfies the equation x^(2)+6=x^(1+log_(x)5)(x_(1)>x_(2)), then

If x_(1) and x_(2) satisfy the equation x^(log_(10)x)=100x then the value of x_(1)x_(2) equals

Let x_1 and x_2 be solutions of the equation "sin"^(-1)(x^2-3x+5/2)=pi/6 . Then, the value of x_1^2+x_2^2 is

Let x_(1) and x_(2) be two solutions of the equalition log_(x)(3x^(log_(5)x)+4) = 2log_(5)x , then the product x_(1)x_(2) is equal to

If x, where 0,1,2 are respectively the values of x satisfying the equation ((log_(5)x))^(2)+(log_(5x)((5)/(x))), then

The value of x satisfies the equation (1-2(log x^(2)))/(log x-2(log x)^(2))=1

f(x) = log((1+x)/(1-x)) satisfies the equation: f(x_(1)) +f(x_(2))