[" If "m_(1)" and "m_(2)" are slopes of lines represented by "],[2x^(2)-3xy+y^(2)=0," then "(m_(1))^(3)+(m_(2))^(3)=]

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

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

If m_1 and m_2 are the slopes of the lines represented by ax^(2)+2hxy+by^(2)=0 , then m_1+m_2=

If m_1 and m_2 are the slopes of the lines represented by ax^(2)+2hxy+by^(2)=0 , then m_1m_2=

If m_(1) and m_(2) are slopes of lines represented by equation 3x^(2) + 2xy - y^(2) = 0 , then find the value of (m_(1))^(2) + (m_(2))^(2) .

Assertion (A) : The slopes of one line represented by 2x^(2)–5xy+2y^(2) = 0 is 4 times the slope of the second line. Reason (R): If the slopes of lines represented by ax^(2)+2hxy+by^(2)=0 are in m:n then ((m+n)^(2))/(mn)=(4h^(2))/(ab)

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

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

If m_(1) and m_(2) are the slopes of tangents to x^(2)+y^(2)=4 from the point (3,2), then m_(1)-m_(2) is equal to