Homogenization Of Second Degree Equation

Second Degree Homogeneous Equation

What is the General equation of second degree and condition for represent pair of lines?

Find the value of K for which the equation 2x^2 - xy +Ky^2 + 8x +7y-10=0 may represent a pair of lines. For this value of K show that this equation can be transformed into a homogeneous equation of second degree by translating the origin to a properly chosen point. Also find the acute angle between the line pair represented by the given general equation.

Condition OF common roots || General secound degree equation || Theory OF equation

Show that a homogeneous equations of degree two in x and y , i.e., ax^(2) + 2 hxy + by^(2) = 0 represents a pair of lines passing through the origin if h^(2) - 2ab ge 0 .

The differential equation of the curve for which the initial ordinate of any tangent is equal to the corresponding subnormal (a) is linear (b) is homogending of second degree (c) has separable variables (d) is of second order

General Equation OF Degree two Homogenization OF Curve With Help OF Line

Pair OF straight line || Homogeneous equation OF two degree || N degree || Condition OF angle bisector and line

Homogenous & Non homogenous equation ||Crammer rule || System OF equation

Homogeneous Differential Equations with Illustrations