The lines `(lx+my)^2-3(mx-ly)^2=0` and `lx+my+n=0` forms

Show that the area of the triangle formed by the lines ax^2+2hxy+by^2=0 and lx+my+n=0 is (n^2sqrt((h^2-ab)))/(|(am^2-2hlm+bl^2)|)

Show that the straight lines x^2+4xy+y^2=0 and the line x-y=4 form an equilateral triangle .

Prove that the triangle formed by the lines ax^2+2hxy+by^2=0 and lx+my=1 isosceles, if h(l^2-m^2)=(a-b)lm .

If the lines 2x+ y-3 = 0, 5x+ky - 3=0 and 3x -y -2 =0 are concurrent, find the value of k.

The distance of the point of intersection of the lines 2 x- 3y + 5 = 0 and 3x + 4y =0 from the line 5x-2y =0 is

Show that the centroid (x',y') of the triangle with sides ax^2+2hxy+by^2=0 and lx +my =1 , is given by (x')/(bl-hm)=(y')/(am-hl)=(2)/(3(am^2-2hlm+bl^2))

Find the value of p so that the three lines 3x + y-2=0, px+2y-3 =0 and 2x-y -3 =0 may intersect at one point.

Area of the triangle formed by the lines y^2-9xy+18x^2=0 and y=9 is

If the pairs of lines x^2+2x y+a y^2=0 and a x^2+2x y+y^2=0 have exactly one line in common, then the joint equation of the other two lines is given by (a) 3x^2+8x y-3y^2=0 (b) 3x^2+10 x y+3y^2=0 (c) y^2+2x y-3x^2=0 (d) x^2+2x y-3y^2=0

The equation of the plane passing through the line of intersection of the planes ax + by+cz + d = 0 and lx + my + nz + p = 0 and it is parallel to the line y = 0 z = 0 is..............