4U Polynomial question HELP !! (1 Viewer)

_mysteryatar_

New Member
Joined
Oct 11, 2018
Messages
8
Gender
Undisclosed
HSC
2019
If the polynomial x^3+3ax^2+3bx+c=0 has a double root, show that the double root is (c-ab)/(2(a^2-b)) , given that a^2 doesnt equal to b

Please help Im struggling with this question
 

HeroWise

Active Member
Joined
Dec 8, 2017
Messages
353
Gender
Male
HSC
2020
I am gonna do it a bit later, a bit busy, but have you tried 3rd derivative getting it to be 0 then testing against second derivative and subbing in the original function?
 

_mysteryatar_

New Member
Joined
Oct 11, 2018
Messages
8
Gender
Undisclosed
HSC
2019
But since the root has a multiplicity of 2 can it be found in the third derivative?
 

fluffchuck

Active Member
Joined
Apr 29, 2016
Messages
256
Location
Sydney
Gender
Male
HSC
2017
Uni Grad
2021
can't do the question right now but i assume that this is how you do it:

since x^3 + 3ax^2 + 3bx + c = 0 has a double root then this means that p(x) = x^3 + 3ax^2 + 3bx + c has a double zero. let this double zero be y. then p(y) = 0 and p'(y) = 0. this means that y^3 + 3ay^2 + 3by + c = 0 and 3y^2 + 6ay + 3b = 0 -> y^2 + 2ay + b = 0. now we solve this last equation for the double root, y. u will get 2 solutions (since quadratic), then sub each presumed double root into the original equation (p(y)). whichever results in p(y) = 0 is the double root. good luck!
 

fan96

617 pages
Joined
May 25, 2017
Messages
543
Location
NSW
Gender
Male
HSC
2018
Uni Grad
2024
Notice that the required answer includes the constant term . That should be a hint - if we were to differentiate the polynomial, we would lose , so not only would we have to expand the cube of a binomial (which can be really messy), we would also have to rewrite the result to include in order to find the double root, so let's try a different approach.

Let and let the roots be .

By the relationships between the roots and co-efficients,







Rearranging,







Now:





Therefore,

 
Last edited:

BChen65536

New Member
Joined
Aug 7, 2014
Messages
1
Gender
Male
HSC
2014
While the method above is indeed valid, one could also solve the problem using calculus:

Let P(x)=x3+3ax2+3bx+c.

Then P'(x)=3x2+6ax+3b.

For there to be a double root, there must exist some x such that P(x)=0 and P'(x)=0.

P'(x)=0 iff 3x2+6ax+3b=0, i.e. x2+2ax+b=0.

Now, P(x)=0 for the same value of x,

so x3+3ax2+3bx+c=0,

i.e. x(x2+2ax+b)+ax2+2bx+c=0.

x(x2+2ax+b)+a(x2+2ax+b)-2a2x-ab+2bx+c=0.

But x2+2ax+b=0 (proven above),

so -2a2x-ab+2bx+c=0,

i.e. x(2b-2a2)+c-ab=0.

x=(c-ab)/(2(a2-b)) as a2-b≠0.

Hence, the double root must be equal to (c-ab)/(2(a2-b)) as required.

 
Last edited:

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

Top