Name the locus of the equation `x^2+y^2=0`.

What is the locus of the equations x^2+y^2+z^2=0 ?

Two perpendicular tangents to the circle x^2 + y^2= a^2 meet at P. Then the locus of P has the equation

A variable circle C has the equation x^2 + y^2 - 2(t^2 - 3t+1)x - 2(t^2 + 2t)y + t = 0 , where t is a parameter.The locus of the centre of the circle is

Name the surface represented by the equation 2x-3y=0.

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

Let (x_(0), y_(0)) be the solution of the following equations: (2x)^("In "2)=(3y)^("In "3) 3^("In "x) = 2^("In "y) Then x_(0) is

The equation of a circle C_1 is x^2+y^2= 4 . The locus of the intersection of orthogonal tangents to the circle is the curve C_2 and the locus of the intersection of perpendicular tangents to the curve C_2 is the curve C_3 , Then

Check the following is solution of the equation x - 2y = 4 or not. (2, 0)

Check the following is solution of the equation x - 2y = 4 or not. (0, 2)

Find in symmetrical form, the equations of the line 2x-2y+3z-2=0, x-y+z+1=0 .