A parallelogram is formed by the lines `ax^2 + 2hxy + by^2 = 0 ` and the lines through `(p, q)` parallel to them. Show that the equation of the diagonal of the parallelogram which doesn't pass through origin is ` (2x-p)(ap + hq) + (2y - q) (hp + bq) = 0 `

A parallelogram is formed by the lines ax^2 + 2hxy + by^2 = 0 and the lines through (p, q) parallel to them. Show that the equation of the diagonal of the parallelogram which doesn't pass through origin is (lamdax-p)(ap + hq) + (µy - q) (hp + bq) = 0 then µ^3+λ^3 is

A parallelogram is formed by the lines ax^2 + 2xy + by^2 = 0 and the lines through (x_1, y_1) parallel to them. Show that the area of parallelogram is (|ax_1^2+2hx_1y_1+by_1^2|)/(2sqrt(h^2-ab))

If the lines ax^2+2hxy+by^2=0 be two sides of a parallelogram and the line lx+my=1 be one of its diagonal, show that the equation of the other diagonal is y (bl-hm)=x(am-hl).

If the lines ax^2+2hxy+by^2=0 be two sides of a parallelogram and the line lx+my=1 be one of its diagonal, show that the equation of the other diagonal is y (bl-hm)=x(am-hl).

If the lines ax^2+2hxy+by^2=0 be two sides of a parallelogram and the line lx+my=1 be one of its diagonal, show that the equation of the other diagonal is y (bl-hm)=x(am-hl).

If the lines ax^2+2hxy+by^2=0 be two sides of a parallelogram and the line lx+my=1 be one of its diagonal, show that the equation of the other diagonal is y (bl-hm)=x(am-hl).

Find a general equation for the line. Parallel to the line 2x-y+2=0 , passing through (0,0)

Find a general equation for the line. Parallel to the line 2x-y+2=0 , passing through (0,0)

If one of the lines ax^(2)+2hxy+by^(2)+2gx+2fy+c=0 passes through the origin then