A straight line through the origin O meets the parallel lines `4x+2y=9 and 2x+y+6=0` at points P and Q respectively. Then the point O divides the segment PQ in the ratio :

A line intersects y-axis and x-axis at the points P and Q respectively. If (2, 5) is the mid point of PQ then find the co ordinates of P and Q.

If the line y = mx meets the lines x+2y-1=0 and 2x-y+3=0 at the same point, then m equals :

A line from the origin meets the lines (x-2)/1 = (y-1)/(-2) = (z+1)/1 and (x-8/3)/2 = (y+3)/(-1) = (z-1)/1 at P and Q respectively. If length PQ = d then d^(2) is equal to

A st. 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 to the line AB so that the triangle OAB is equilateral is :

The distance between the parallel lines 9 x^(2)-6 x y+y^(2)+18 x-6 y+8=0 is

A line passing through P(4, 2) meets the x and y-axis at A and B respectively. If O is the origin, then locus of the centre of the circumcircle of DeltaOAB is :

Let O be the vertex and Q be any point on the parabola x^(2)=8y if the point p divides the line segement OQ internally in the ratio 1:3 then the locus of P is

A line passing through P(3,4) meets the x -axis and y -axis at A and B respectively. If O is the origin, then locus of the centre of the circum centre of Delta O A B is

The ratio in which the line y=x divides the segment joining (2,3) and (8,6) is

Find equation of the line parallel to the line 3x - 4y + 2 = 0 and passing through the point (-2, 3) .