Suppose that `log_10(x-2)+log_10y=0` `sqrtx+sqrt(y-2)=sqrt(x+y)`.
The value of x is

Suppose that log_(10)(x-2)+log_(10)y=0and sqrtx+sqrt(y-2)=sqrt(x+y). Then the value of (x+y) is

Suppose that log_(10)(x-2)+log_(10)y=0and sqrtx+sqrt(y-2)=sqrt(x+y). Then the value of (x+y) is

if 2x-2y=10 find the value of x-y

If xgt2 is a solution of the equation |log_sqrt3x-2|+|log_3x-2|=2 , then the value of x is

If log_10 2, log_10(2^x- 1) and log_10(2^x+3) are in A.P., then find the value of x.

If x_1,x_2 & x_3 are the three real solutions of the equation x^(log_10^2 x+log_10 x^3+3)=2/((1/(sqrt(x+1)-1))-(1/(sqrt(x+1)+1))), where x_1 > x_2 > x_3, then these are in

If y = log x - x^2 , then value of (d^2y)/(dx^2) is

The domain of the function f(x)=log_(10)(sqrt(x-4)+sqrt(6-x)) is

If x= (sqrt3+sqrt2)/(sqrt3-sqrt2) and y=(sqrt3-sqrt2)/(sqrt3+sqrt2) , then find the value of x^2+y^2