If the lines `x^2+(2+k)xy - 4y^2 = 0` are equally inclined to the coordinate axes, then k=

If the lines x^(2)+(2+h)xy-4y^(2)=0 are equally inclincd to the coordinate axes then h=

If the lines ax^(2) + 2hxy + by^(2)= 0 are equally inclined with the coordinate axes then

If the two lines kx^(2)+5xy+9y^(2)=0 are equally inclined with the cordinates axes, then: k=

The lines x^(2)-12xy+6y^(2)=0 are equally inclined to the line

The lines 36x^(2)-33xy-20y^(2)=0 are equally inclined to the line

Show that the pair of lines joining the origin to the points of intersection of the line 3x - y = 2 with the pair of lines 7x^2 - 4xy + 8y^2 + 2x - 4y - 8 = 0 are equally inclined with the co-ordinate axes.

If two lines in 2x^(2)+2(k-1)xy-3y^(2)=0 are equally inclined to axes then k=

If two lines of x^(2)+3(l-5)xy-5y^(2)=0 are equally inclined with the axes then l=

If the straight lines joining the origin and the points of intersection ofthe curve 5x^2 + 1 2xy-6y^2 + 4x-2y+ 3=0 and x + ky-1=0 are equally inclined to the co-ordinate axes then the value of k

If the straight lines joining the origin and the points of intersection ofthe curve 5x^(2)+12xy-6y^(2)+4x-2y+3=0 and x+ky-1=0 are equally inclined to the co-ordinate axes then the value of k