If are the roots of x2 - ax + b = 0 and if = Vn, then
Vn + 1 = aVn + bVn - 1
Vn + 1 = aVn + aVn - 1
Vn + 1 = aVn - bVn - 1
Vn + 1 = aVn - 1 + bVn
If the complex numbers z1, z2 and z3 are in AP, then they lie on a
circle
parabola
line
ellipse
C.
line
Let z1, z2 and z3 be affixes of points A, B and C, respectively. Since, z1, z2, and z3 are in AP, therefore
If one root is square of the other root of the equation x2 + px + q = 0 , then the relations between p and q is
p3 - (3p - 1)q + q2 = 0
p3 - q(3p + 1) + q2 = 0
p3 + (3p - 1)q + q2 = 0
p3 + (3p + 1)q + q2 = 0