The equation of the circle passing through the points of intersection of the circles x²+y²-8x+10y+2=0, x²+y²-3x+5y-1=0 and touching line 2x+y=3 is

The equation of the circle passing the origin having its centre on the line x+y=4 and cutting the circle x²+y²-4x+2y+4=0  orthogonally is

The limiting points of the coaxal system x²+y²+2λx+4=0 are

The equation of the circle passing  through (2, 1) and touching the coordinate axes is

The length of the tangent from the point (-1, 1) to the circle x²+y²-4x+k=0 is equal to 2 then k=

The equations of the tangents to the circle x²+y²=16 which are inclined at an angle of 60⁰ to the x-axis is

The common chord of x²+y²-4x-4y=0 and x²+y²=16 substends at the origin an angle equal to

The conjugate line of 3x+4y-45=0 with respect to x²+y²-6x-8y+5=0 which is perpendicular to x+y=0 is

The equation of the circle having a radius 2 and passing through the limiting points of the coaxal system x²+y²-6-2λ(x+y-4)=0 is

If the lines 2x-y+11=0, x-2y+3=0 intersecting the coordinate axes in four concyclic points then the centre of the circle passing through these four points is