MedVision ad

Substitution of Roots in a Polynomial (1 Viewer)

murraysp

New Member
Joined
May 31, 2009
Messages
11
Gender
Male
HSC
2010
ax^3 + bx^2 + cx + d
has roots alpha, beta, gamma and delta

find equation with
alpha^2...

i understand that use x^1/2 i can do this question

find equation with
1/alpha

from the examples i see you use 1/x

i dont get it why is it for one you rearrange and for the other you don't.

and can you also explain alpha + 1 equation, what do you sub?

Thanks
 

murraysp

New Member
Joined
May 31, 2009
Messages
11
Gender
Male
HSC
2010
1. ok a+1=x-1

2. and a^2=sqrtx

3. but 1/a=1/x

how can that be?

i do not get the pattern

3. doesn't fit
 

MOP777

New Member
Joined
Mar 31, 2009
Messages
20
Gender
Male
HSC
2010
hey, hopefully this shows you why it is true.
the inv function of a+1 = a-1
inv function of x^2 = root(x)
and below is the inv. function of 1/x

 

Rezen

Member
Joined
Mar 12, 2009
Messages
62
Gender
Male
HSC
2010
I dont think inverse functions is quite the reason why this works. if this was the case then if i wanted to find a polynomial with roots 1/(alpha^2), etc.. then i woould sub in sqrt(1/alpha). which leads to a polynomial fo degree four and hence is obviously wrong. (assuming my algebra wasn't shit.)

My understanding of this is that,

Hopefully i explained ok. ><
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,385
Gender
Male
HSC
2006
I dont think inverse functions is quite the reason why this works. if this was the case then if i wanted to find a polynomial with roots 1/(alpha^2), etc.. then i woould sub in sqrt(1/alpha). which leads to a polynomial fo degree four and hence is obviously wrong. (assuming my algebra wasn't shit.)
If it is subbed into a polynomial of degree 3, then you wouldn't get a polynomial of degree 4, it would still be of degree 3 once you've rearranged it into a polynomial.

The inverse function idea is indeed the mechanism behind the substitution. In the example of roots 1/α, 1/β, ... etc notice that the inverse of a hyperbola y = 1/x is itself.
In general when you make the polnomial substitution of roots f(α), f(β), .... etc the approach is to
let y = f(x)
=> x = f-1(y)
then sub it into the polynomial equation P(x) and rearrange to get a new polynomial in terms of y which then has roots f(α), f(β), etc...
 

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

Top