If `m_(1)` and `m_(2)` are slopes of line represented `2x^(2) - 3xy + y^(2)=0` , then `(m_(1))^(3) + (m_(2))^(3)=`

The sum of the slopes of the lines represented by x^(2)-xy-6y^(2)=0 is

If slopes of lines represented by kx^(2)+5xy+y^(2)=0 differ by 1 , then k=

If m_(1),m_(2) are slopes of lines represented by 2x^(2)-5xy+3y^(2)=0 then equation of lines passing through origin with slopes 1/(m_(1)),1/(m_(2)) will be

The sum of the slopes of the lines given by 3x^(2)+5xy-2y^(2)=0 is

If the sum of the slopes of the lines represented by the equation x^(2)-2xy tan A-y^(2)=0 be 4 then /_A=

If the angle between the two lines represented by 2x^(2)+5xy+3y^(2)+6x+7y+4=0 is tan^(-1)(m) , then m is equal to