• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

Poly question (extension Cambridge q) (1 Viewer)

Kurosaki

True Fail Kid
Joined
Jul 14, 2012
Messages
1,167
Location
Tubbytronic Superdome
Gender
Male
HSC
2014
Division transformation is that you can express a polynomial A (the dividend), with divisor D, quotient Q and remainder R as:
, and the degree of R is less than that of D. So try thinking about what D and R are :). If you still can't figure it out I'll show you how to do it :).

And the MX1 exam was pretty easy, not too hard.
 
Last edited:

iStudent

Well-Known Member
Joined
Mar 9, 2013
Messages
1,158
Gender
Male
HSC
2014
Division transformation is that you can express a polynomial A (the dividend), with divisor D, quotient Q and remainder R as:
, and the degree of R is less than that of D. So try thinking about what D and R are :). If you still can't figure it out I'll show you how to do it :).

And the MX1 exam was pretty easy, not too hard.
You mean you smashed it and should get 70/70 and that you would've state ranked if not for internals :p
 

Drongoski

Well-Known Member
Joined
Feb 22, 2009
Messages
4,255
Gender
Male
HSC
N/A
Let P(x) = (x-p)(x-q)Q(x) + ax+b

.: P(p) = 0 + ap+b = p^3
& P(q) = 0 + aq+b = q^3

Solving the 2 simultaneous equations for a and b, you get:

a = p^2 + pq + q^2 and b = -pq(p+q)

.: remainder is (p^2+pq+q^2)x - pq(p+q)
 

hsc3hard5me

Member
Joined
Oct 22, 2014
Messages
78
Gender
Male
HSC
2015
Thanks, I have another question I'm struggling to get, it looks really easy but I don't know how to get the answer:

 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
You can find M easily by using the fact that there is a root at x=-2, in other words P(-2)=0.

Now that you have M, you can use the sum of roots.

Note that the roots are -2, A and A, so the sum of roots is -2+2A. Compare that to the sum of roots by observing the coefficients and you can solve for A.
 

Axio

=o
Joined
Mar 20, 2014
Messages
484
Gender
Male
HSC
2015
Let P(x) = (x-p)(x-q)Q(x) + ax+b
.: P(p) = 0 + ap+b = p^3
& P(q) = 0 + aq+b = q^3

Solving the 2 simultaneous equations for a and b, you get:

a = p^2 + pq + q^2 and b = -pq(p+q)

.: remainder is (p^2+pq+q^2)x - pq(p+q)
With this, how do you know that the remainder is linear? (Or does it not matter)
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,402
Gender
Male
HSC
2006
With this, how do you know that the remainder is linear? (Or does it not matter)
Division by a quadratic always yields a remainder of a lower degree than the quadratic (ie a linear or constant function). If the 'remainder' has a degree greater than or equal to the degree of the quadratic then it is not really a true 'remainder' because further division can be carried out
 

hsc3hard5me

Member
Joined
Oct 22, 2014
Messages
78
Gender
Male
HSC
2015
You can find M easily by using the fact that there is a root at x=-2, in other words P(-2)=0.

Now that you have M, you can use the sum of roots.

Note that the roots are -2, A and A, so the sum of roots is -2+2A. Compare that to the sum of roots by observing the coefficients and you can solve for A.
I tried subbing in x=-2 but it m ends up cancelling out and the equation ends up as 0=0
 

Carrotsticks

Retired
Joined
Jun 29, 2009
Messages
9,494
Gender
Undisclosed
HSC
N/A
Oh dear, my response was incorrect anyway. I did not see that the second term was an x term, not an x^2 term. Ignore that please =)

The sum of roots is zero since the x^2 term has a zero coefficient (which is why it is not there).

2A - 2 = 0

A=1.

Now that you have all three roots, you can use the product of roots to calculate M.
 

hsc3hard5me

Member
Joined
Oct 22, 2014
Messages
78
Gender
Male
HSC
2015
Oh dear, my response was incorrect anyway. I did not see that the second term was an x term, not an x^2 term. Ignore that please =)

The sum of roots is zero since the x^2 term has a zero coefficient (which is why it is not there).

2A - 2 = 0

A=1.

Now that you have all three roots, you can use the product of roots to calculate M.
Thanks, that explained it quickly!
 

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

Top