Find the condition that the slope of one of the lines represented by `ax^2 + 2xy +by^2 = 0` is square of slope the other

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

If the slope of one of the lines represented by ax^(2) + 2hxy + by^(2) = 0 is the square of the other, then (a+b)/h+(8h^(2))/(ab)

Statement-I : If two of the lines represented by ax^(3) + bx^(2)y + cxy^(2) + dy^(3) = 0 (a ne 0) make complementary angles with x-axis in anti-clockwise sense then slope of third line is a/d. Statement-II : If the slope of one of the line represented by ax^(2) + 2hxy + by^(2) = 0 is 'n' times the slope of another then ((1+n)^(2))/(n)=(h^(2))/(a b) Which of the above statement is correct :

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

y=mx is one of the lines represented by ax^2+2hxy+by^2=0 if a+2hm+bm^2 =

If the slope of one of the line represented by 2x^(2)+3xy+Ky^(2)=0 is 2 then angle between pair of lines is

The slope of the line x=0

Find the value of h if the slopes of the lines represented by 6x^(2)+2hxy+y^(2)=0 are in the ratio 1:2.