Find the condition that the slope of one of the lines represented by `ax^2+2hxy+by^2=0` should be n times the slope of the other .

If the slope of one of the lines represented by ax^(2)+10xy+y^(2)=0 is four times the slope of the other then

If m is the slope of one of the lines represented by ax^(2)+2hxy+by^(2)=0 then (h+bm)^(2) =

If m is the slope of one of the lines represented by ax^(2)+2hxy+by^(2)=0 , then (h+bm)^(2) =

If the slope of one of the lines gives by ax^(2)+2hxy+by^(2)=0 is 5 times the other, then

If the slope of one of the lines represented by ax^(2)-6xy+y^(2)=0 is the square of the other then

The condition that the slope of one the lines of a x^(2)+2 h x y+b y^(2)=0 is twice the other is

The sum of the slopes of the lines represented by 4x^(2)+2hxy-7y^(2)=0 is equal to the product of the slopes then h is

If the slope of one of the lines represented by ax^2 + 2hxy+by^2=0 be the nth power of the other , prove that , (ab^n)^(1/(n+1)) +(a^nb)^(1/(n+1))+2h=0 .

If one of the slopes of the pair of the lines ax^(2) + 2 hxy + by^(2) = 0 is n times the other , then

The lines represented by ax^(2)+2hxy+by^(2)=0 are perpendicular to each other if