The lines 2x+3y+19=0 and 9x+6y-17=0 cuts the coordinate axes in

The lines 2x+3y+19=0 and 9x+6y-17=0 , cut the coordinate axes at concyclic points.

The lines 2x-5y+1=0 and 10x-4y-3=0 meets the coordinate axes in concylic points, then equation to the circle is

If lines 2x-3y+6=0 and kx+2y=12=0 cut the coordinate axes in concyclic points, then the value of |k| is

Show that the lines 3x-y+3=0 and x-3y-6=0 cut the coordinate axes at concylic points. Show that the equation of the circle passing through these points is x^(2)+y^(2)-5x-y-6=0

If the lines 2x-3y+7=0, 3x+ky+5=0 cut the coordinate axes in concyclic points then k=

If the lines x-2y+3=0, 3x+ky+7=0 cut the coordinate axes in concylic points, then k=

Statement 1 :If the lines 2x+3y+19=0 and 9x+6y-17=0 cut the x-axis at A ,B and the y-axis at C ,D , then the points, A , B , C , D are concyclic. Statement 2 : Since O AxO B=O CxO D , where O is the origin, A , B , C , D are concyclic.

If the 4 points made by intersection of lines 2x-y+1=0, x-2y+3=0 with the coordinate axes are concylic then centre of circle is

Find the equation of the straight line passing through the point of intersection of 2x+y-1=0 and x+3y-2=0 and making with the coordinate axes a triangle of area 3/8 sq. units.

The radius of the larger circle lying in the first quadrant and touching the line 4x+3y-12=0 and the coordinate axes, is