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polynomials question (1 Viewer)

nanashi

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hey i need help with a polynomials question
its in the 2001 HSC exam
Question 7 (b) all parts
Consider the equation x3 - 3x - 1 = 0, which we denote by (*).
(i) Let x = p/q where p and q are integers having no common divisors other than +1 and -1. Suppose that x is a root of the equation ax3 - 3x + b = 0, where a and b are integers.
Explain why p divides b and why q divides a. Deduce that (*) does not have a rational root. [4 marks]

(ii) Suppose that r, s and d are rational numbers and that sqrt(d) is irrational. Assume that [r + s x sqrt(d)] is a root of (*).
Show that 3r2s + s3d - 3s = 0 and show that [r - s x sqrt(d)] must also be a root of (*).
Deduce from this result and part (i), that no root of (*) can be expressed in the form r + s sqrt(d) with r, s and d rational. [4 marks]

(iii) Show that one root of (*) is 2cos(pi/9). (You may assume the identity cos3@ = 4cos3@ - 3cos@.) where @ is theta. [1 mark]

i can sorta do part (i) but i want to make sure i have the correct working out. thanx
 

KFunk

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nanashi said:
Consider the equation x3 - 3x - 1 = 0, which we denote by (*).
(i) Let x = p/q where p and q are integers having no common divisors other than +1 and -1. Suppose that x is a root of the equation ax3 - 3x + b = 0, where a and b are integers.
Explain why p divides b and why q divides a. Deduce that (*) does not have a rational root. [4 marks]

i can sorta do part (i) but i want to make sure i have the correct working out. thanx
Here's the way it makes sense to me. First off show that p divides b and q divides a so sub x = p/q into the equation:

ap<sup>3</sup>/q<sup>3</sup> - 3p/q + b = 0
ap<sup>3</sup> - 3pq<sup>2</sup> + bq<sup>3</sup> = 0

bq<sup>3</sup> = p(3q<sup>2</sup> - ap<sup>2</sup>) = pR<sub>1</sub> (where R<sub>1</sub> is an integer)

hence bq<sup>3</sup>/p = R<sub>1</sub> , but p does not divide q (as defined) so p divides b. Similarly:

ap<sup>3</sup> = q(3pq - bq<sup>2</sup>) = qR<sub>2</sub> (where R<sub>2</sub> is an integer)

hence qp<sup>3</sup>/q = R<sub>2</sub>, but q does not divide p, so q divides a.


Then assume that (*) has a rational root (p/q). In eq'n (*) a=1 and b=-1. Since q divides a, q = &plusmn;1 and since p divides b, p = &plusmn; 1. Hence if (*) has a rational root then p/q = &plusmn; 1:

Subbing 1 into (*) = -3
Subbing -1 into (*) = 1

We arrive at a contradiction since neither 'possible' rational root is a zero of (*), &there4; the roots of (*) are irrational.
 

justchillin

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For the second part of the question, sub r + sqrt (d) or whatever it is into the equation. You get a rational part + an irrational part = 0 with correct factorising. Now, just like equating imaginary parts in complex numbers, equate the irrational part and u get the expression for that = 0. Also note the other expression as its needed next. To prove r -sqrt(d) is a root, sub in and play around with the expression, and u get sqrt(d) outside the expression that I told u to take note of. Now since this equals zero, by equating the rational parts of the other root, the whole thing = 0 and hence r- sqrt(d) is also a root. For the cosine part, let x=cos(theta) then let cos 3(theta)=1 and solve...
 

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