If `x` and `y` satisfy te equation `xy-2x^(2)-9x+3y-16=0` then

If x and y are real and satisfy the equation x^(2)+16y^(2)-3x+2=0 then which of the following is/are true

If x,y in R satisfy the equation x^2 + y^2 - 4x-2y + 5 = 0, then the value of the expression [(sqrtx-sqrty)^2+4sqrt(xy)]/((x+sqrt(xy)) is

If x and y satisfy the equation y = 2[x]+9 and y = 3[x+2] simultaneously, the [x+y] is (where [x] is the greatest integer function)

If x,y in R and satisfy the equation xy(x^(2)-y^(2))=x^(2)+y^(2) where xne0 then the minimum possible value of x^(2)+y^(2) is

If x, y satisfy the equation, y^(x)=x^(y) and x=2y , then x^(2)+y^(2)=

Complex numbers whose real and imaginary parts x and y are integers and satisfy the equation 3x^(2)-|xy|-2y^(2)+7=0

Find the value of x and y that satisfy the equations [(3,-2),(3,0),(2,4)] [(y,y),(x,x)]=[(3,3),(3y,3y),(10,10)]

Find the real numbers (x,y) that satisfy the equation: xy^(2) = 15x^(2) +17xy + 15y^(2) x^(2)y = 20x^(2) + 3y^(2)

If x and y are real numbers connected by the equation 9x ^(2)+2xy+y^(2) -92x-20y+244=0, then the sum of maximum value of x and the minimum value of y is :

The equation x^(2)+4xy+4y^(2)-3x-6y-4=0 represents a