A line through the origin intersects `x = 1,y =2 and x +y = 4`, in `A, B and C` respectively,such that `OA*OB*OC =8 sqrt2`. Find the equation of the line.

A straight line through the point A(-2, -3) cuts the line x+3y=9 and x+y+1=0 at B and C respectively. Find the equation of the line if AB.AC = 20 .

A straight line through the point (2, 2) intersects the lines sqrt(3)x+y=0 and sqrt(3)x-y=0 at the points A and B. The equation of the line AB so that DeltaOAB is equilateral, is:

Sum of slopes of all possible lines passing through origin (O) and intersecting the lines x+y=1 and x+2y=1 at A & B respectively such that 3(OA.OB)=1 is

The equations to the straight lines each of which passes through the point (3,2) and intersects the x-axis and y-axis in A,B respectively such that OA-OB=2, can be

The equation of the line through the intersection of the lines 2x-3y=0 and 4x-5y=2 and

A line L passing through the point (2,1) intersects the curve 4x^(2)+y^(2)-x+4y-2=0 at the point A and B .If the lines joining the origin and the points A,B are such that the coordinate axes are the bisectors between them,then find the equation of line L.