`x^2+20x+y^2+16y=-20`
The equation above defines a circle in the xy-plane. What are the coordinates of the centre of the circle ?

x^(2)+y^(2)+4x-2y=-1 The equation of a circle in the xy-plane is shown above. What is the radius of the circle?

x^(2)+y^(2)-6x+8y=-9 The equation of the circle in xy-plane is shown above. What is the radius of the circle?

x ^(2) + 6x + y^(2) -8y =171 The equation of a circle in the xy-plane is shown above. What is the positive difference between the x-and y-coordinates of the center of the circle ?

If an equation of a parabola in the xy-plane is f(x)=-(x+2)^(2)-1 , what are the coordinates of the vertex of the parabola defined by g(x)=f(x-2) ?

Find the equation of the circle which touches the coordinate axes and whose centre lies on the line x-2y=3.

(x-2)^2+y^2=36 y=-x+2 The equation above represent a circle and a line that intersects the circle across its diameter . What is the point of intersection of the two equations that lies in Quadrant II?

Find the equation of the circle which touches the coordinate axes and whose centre lies on the line x-2y = 3 .

If the equation of a circle is lambdax^2+(2lambda-3)y^2-4x+6y-1=0, then the coordinates of centre are

(x-6)^2 + (y+5)^2 =16 In the xy-plane, the graph of the equation above is a circle. Point P is on the circle and has coordinates (10, −5). If bar(PQ) is a diameter of the circle, what are the coordinates of point Q ?

A circle touches both the coordinate axes and the line x-y=sqrt(2)a, a gt 0 , the coordinates of the centre of the circle cannot be