MedVision ad

Polynomial problems (1 Viewer)

byakuya kuchiki

New Member
Joined
Sep 15, 2008
Messages
29
Gender
Male
HSC
2010
Suppose that b and d are real numbers and d /=/ (doesn't equal) 0. consider the polynomial P(z) = z^4 + bz^2 + d.

For what values of b does P(z) have a double root equal to root 3i.

anyone who has problems with polynomial questions are more than welcome to post here.
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
Suppose that b and d are real numbers and d /=/ (doesn't equal) 0. consider the polynomial P(z) = z^4 + bz^2 + d.

For what values of b does P(z) have a double root equal to root 3i.

anyone who has problems with polynomial questions are more than welcome to post here.
If the polynomial has a double root of 3i then it must also have a double root of -3i since the polynomial is real.
Sum of roots in pairs:
(3i)(-3i) + (3i)(3i) + (3i)(-3i) + (-3i)(3i) + (-3i)(-3i) + (3i)(-3i) = 18
=> b = 18
 

adomad

HSC!!
Joined
Oct 10, 2008
Messages
543
Gender
Male
HSC
2010
do u dy/dz it and sub in 3i and then find b and then sub in b and z=3i to p(z)? i dunno haven't done 4U polynomials... just remember reading that in a 3U text book on repeated roots
 

byakuya kuchiki

New Member
Joined
Sep 15, 2008
Messages
29
Gender
Male
HSC
2010
but doesn't it say values? which means more than one value of b? i dunno. )':
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
Another way to look at it, the factorised form of the quartic polynomial is:
(z - 3i)(z - 3i)(z + 3i)(z + 3i)
which simplifies to
(z - 3i)(z + 3i)(z - 3i)(z + 3i) = (z2 + 9)2
= z4 + 18z2 + 81

Hence b = 18
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top