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 straight line through origin O meets the lines 3y=10-4x and 8x+6y+5=0 at points A and B respectively. Then O divides the segment AB in the ratio.

A straight line meets the X and y axes at the points A,B respectively if AB=6 units then the locus of the point P which divides the line segment AB such that AP:PB =2 :1 is

If a line through A(1, 0) meets the lines of the pair 2x^2 - xy = 0 at P and Q. If the point R is on the segment PQ such that AP, AR, AQ are in H.P then find the locus of the point R.

A straight line with slope 1 passes through Q(-3,5) and meets the straight line x+y-6=0 at P. Find the distance PQ.

A straight line with slope 1 passes through Q(-3,5) meets the line x+y-6=0 at P. Find the distance PQ.