Consider a variable line L which passes through the point of intersection P of the line `3x+4y-12=0 and x+2y-5=0` meetingt the coordinate axes at point A and B.
Locus of the centroid of the variable triangle OAB has the equation (where O is origin )

Consider a variable line L which passes through the point of intersection P of the line 3x+4y-12=0 and x+2y-5=0 meetingt the coordinate axes at point A and B. Locus of the middle point of the segment AB has the eqution

Consider a variable line L which passes through the point of intersection P of the line 3x+4y-12=0 and x+2y-5=0 meetingt the coordinate axes at point A and B. Locus of the feet of the perpendicular from the origin on the variable line L has the equation

A circle passes through the points of intersection of the lines lamda x-y+1=0 and x-2y+3=0 with the coordinates axes. Show that lamda=2 .

If a circle passes through the points of intersection of the axes with the lines ax-y+1=0 and x-2y+3=0 then a=

A variable line drawn throgh the point of intersection of the lines x/a+y/b=1,x/b+y/a=1 meets the coordinate axes in A and B. Then the locus of midpoint of AB is

The equation of the line passing through the point of intersection of the lines 2x+3y-4=0, 3x-y+5=0 and the origin is

The point of intersection of the straight lines 2x+3y+4=0, 6x-y+12=0 is

The equation of the line passing through the point of intersection of the lines 2x+y+1=0, x-y-7=0 and the point (3, -2) is

If m is a variable the locus of the point of intersection of the lines x/3-y/2=m and x/3+y/2=1/m is