Trial Questions (1 Viewer)

scardizzle

Salve!
Joined
Aug 29, 2008
Messages
166
Location
Rwanda
Gender
Male
HSC
2010
Hey guys,

Im having trouble with these 2 problems from my school's past paper (no solutions "-_- )

1. Differentiate y= ln(tan3x) epressing your final answer in terms of cosec3x. I can do the differentiation part but i end up with 3/(cos3xsin3x) = 6/sin6x ?

2. the polynomial P(x) is given by P(x) = x^3 - x^2 - 8x + 12
i) Factorise P(x) completely given P(x) = 0 has a repeated root
ii) The polynomial Q(x) has the form Q(x) = P(x)(x+a) with P(x) as given above and where the constant a is chosen so the Q(x) >/= 0 for all real values of x. Find all possible values of a.

I can do part i) but no idea where to start from part ii)

Thanks in advance
 
Last edited:

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,393
Gender
Male
HSC
2006
Hey guys,

Im having trouble with these 2 problems from my school's past paper (no solutions "-_- )

1. Differentiate y= ln(tan3x) epressing your final answer in terms of cosec3x. I can do the differentiation part but i end up with 3/(cos3xsin3x) = 6/sin6x ?

2. the polynomial P(x) is given by P(x) = x^3 - x^2 - 8x + 12
i) Factorise P(x) completely given P(x) = 0 has a repeated root
ii) The polynomial Q(x) has the form Q(x) = P(x)(x+a) with P(x) as given above and where the constant a is chosen so the Q(x) >/= 0 for all real values of x. Find all possible values of x.

I can do part i) but no idea where to start from part ii)

Thanks in advance
For 1) I think it should say "cosec 6x"

2) i) Not sure if this is in the Ext 1 course but for a repeated root P'(x) = P(x) = 0 is satisfied.
This gives x = 2 as a root and then use the sum of roots to find the third root.

ii) Not sure if I interpreted this correctly, (I think you mean all possible values of a?)
Q(x) = (x + a)(x³ - x² - 8x + 12) ≥ 0
=> (x + a)(x - 2)²(x + 3) ≥ 0
For expression to hold true we require (x + a)(x + 3) ≥ 0
The only way this expression holds true for all real x is when a = 3 (which gives a perfect square which is always non-negative)
 

gurmies

Drover
Joined
Mar 20, 2008
Messages
1,209
Location
North Bondi
Gender
Male
HSC
2009
Not sure about that...I thought multiplicity was an extension II concept...
 

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
Not sure about that...I thought multiplicity was an extension II concept...
I think in Ext 1 you only consider roots of multiplicity of 2. ie. If a is a double root of P(x) then P(a)=P'(a)=0. But in Ext 2 you can be asked roots of other multiplicity.

This was in our Year 11 preliminary exam for Ext 1. The question was something like, if a is a double root of P(x), then prove that P(a)=P'(a)=0.

As was finding a^3+b^3+c^3, given that a, b and c are roots of P(x)=...
 

Aquawhite

Retiring
Joined
Jul 14, 2008
Messages
4,946
Location
Gold Coast
Gender
Male
HSC
2010
Uni Grad
2013
I think in Ext 1 you only consider roots of multiplicity of 2. ie. If a is a double root of P(x) then P(a)=P'(a)=0. But in Ext 2 you can be asked roots of other multiplicity.

This was in our Year 11 preliminary exam for Ext 1. The question was something like, if a is a double root of P(x), then prove that P(a)=P'(a)=0.

As was finding a^3+b^3+c^3, given that a, b and c are roots of P(x)=...
In Ext. 1 we are often asked to do that, yes... but I wouldn't name it as multiplicy though...
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
I think in Ext 1 you only consider roots of multiplicity of 2. ie. If a is a double root of P(x) then P(a)=P'(a)=0. But in Ext 2 you can be asked roots of other multiplicity.

This was in our Year 11 preliminary exam for Ext 1. The question was something like, if a is a double root of P(x), then prove that P(a)=P'(a)=0.

As was finding a^3+b^3+c^3, given that a, b and c are roots of P(x)=...
Theres also a method called "Newtons Sums" to find the sum of roots when given a P(x)
 

Aquawhite

Retiring
Joined
Jul 14, 2008
Messages
4,946
Location
Gold Coast
Gender
Male
HSC
2010
Uni Grad
2013
Theres also a method called "Newtons Sums" to find the sum of roots when given a P(x)
What's that/how's it work?

I only know the regular sum of roots, sum of roots two at a time (etc...), product of roots. blah blah blah.
 

Michaelmoo

cbff...
Joined
Sep 23, 2008
Messages
591
Gender
Male
HSC
2009
1) Unless anyone else can think of another way, I think the question should've been express it in terms of cosec6x. In that case Uve got the answer:

6cosec(6x)

2) (i)The way they teach it in 3 unit is as follows:
  • Look at the degree, it is to a power of 3 so there are three roots
  • It says there is a repeated root, now this has root has to appear either twice or 3 times
  • You know that the three roots multipled should give the constant term (i.e. 12). However, no number when cubed gives twelve, so there can't be triple root.
  • So now we know that there is a double root and a single root. Call the double root "a" and the single root "b".
  • Call the roots a,a and b
Lets do a sum of the roots:

a + a + b = 1
2a + b = 1
b = 1 - 2a -------------------- (1)

Sum of the roots 2 at a time:

a^2 + ab + ab = -8
a^2 + 2ab = -8 ----------------- (2)

Now (1) into (2)

a^2 + 2a(1 - 2a) = -8
a^2 + 2a - 4a^2 = -8
3a^2 - 2a - 8 = 0

Solve this quadratic you get a = 2 (thus b = -3) or a = -4/3 (and b = 11/3)

However when you consider the multiplication of roots..

a x a x b = -12
(a^2)b = -12

This equation is only satisfied for the a =2 b =-3 combination. Thus these are the roots:

Hence factorising gives (x+3)(x-2)^2

The derivative/root method is only 4 unit I think..

(ii) Draw the graph above, you notice it starts to go below the x- axis at x = -3. So we need to make that root a double root (so it turns back up and doesn't go below the x-axis, i.e. remains greater than 0). i.e. multiple the equation by (x+3) , i.e. a = 3
 

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

Top