Show that if two of the lines `ax^3+bx^2y+cxy^2+dy^3=0 (a ne 0)` make complementary angles with X -axis in anti -clockwise sense, then `a(a-c)+d(b-d)=0` .

If two of the three lines represented by ax^3+ bx^2y +cxy^2+dy^3=0 may be at right angles then

Two of the straight lines given by 3x^3 +3x^2y-3xy^2+dy^3=0 are at right angles , if d equal to

The tangent to the cureve xy+ax+by=0 at (1, 1) makes an angle with X - axis is tan^(-1)2 then ………….

If two of the lines represented by ax^4 +bx^3y +cx^2 y^2+dxy^3+ay^4=0 bisects the angle between the other two, then

Show that the sum of roots of a quadratic equation ax^(2)+bx+c=0 (a ne 0) is (-b)/(a) .

The plane 2x - 3y + 6z + 9 =0 makes an angle with positive direciton of X -axis is ........

If the pair of lines ax^2 +2hxy+ by^2+ 2gx+ 2fy +c=0 intersect on the y-axis then

Show that the product of the roots of a quadratic equation ax^(2)+bx+c=0 (a ne 0) is (c )/(a) .

The condition that the parabolas y^2=4c(x-d) and y^2=4ax have a common normal other than X-axis (agt0,cgt0) is

If the lines represented by x^(2)-2pxy-y^(2)=0 are rotated abouu the origin through ann angle theta , one clockwise direction and other in anti-clockwise direction, then the equationn of the bisectors of the angle between the lines in the new position is