From a point (2, 0) the feet of perpendiculars to the lines of the pair `2y^2 - 3xy + x^2 = 0` are P and Q then find the equation of the line PQ.

From a point (2, 0) the feet of perpendiculars to the lines of the pair x^2 -3xy + 2y^2 = 0 are L and M then find the distance LM.

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.

Find the equation of a line perpendicular to the line x - 2y + 3 = 0 and passing through the point (1, -2) .

Two straight lines are drawn through the points (0, 2) such that the length of the perpendiculars from the point (4, 4) to these lines are each equal to 2 units. The equation of the line joining the feet of these perpendiculars is

If the product of perpendiculars from (k,k) to the pair of lines x^2+4xy+3y^2=0 is 4sqrt5 then k is

The product of the perpendiculars from (-1, 2) to the pair of lines 2x^(2)-5xy+2y^(2)=0

The equation of the straight line perpendicular to the straight line 3x+2y=0 and passing through the point of intersection of the lines x+3y-1=0 and x-2y+4=0 is

Find the perpendicular distance of that point (3,-4) from the line 2x-5y+2=0 .

The product of perpendiculars from origin to the pair of lines 2x^(2)+5xy+3y^(2)+6x+7y+4=0 is