Find k, if the slope of one of the lines given by `kx^(2) + 4xy - y^(2) = 0` exceeds the slope of other by 8.

If the slope of one of the lines given by kx^(2)+4xy-y^(2)=0 exceeds the slope of the other by 8, then k=

If the slope of one of the lines given by 6x^(2)+axy+y^(2)=0 exceeds the slope of the other by one then a=

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

If the slope of one of the lines given by 6x^(2)+axy+y^(2)=0 exceeds the slope of the other by one, then a is equal to

If the slope of one of the lines given by 3x^(2)-4xy+ky^(2)=0 is 1, then k=

Find the value of k, if the slope of one of the lines given by 4x^(2) + kxy + y^(2) = 0 is four times the other.

If the slopes of one of the line given by 3x^(2)+4xy+ky^(2)=0 is three times the other, then k=