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HSC 2014 MX2 Marathon (archive) (4 Viewers)

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Chlee1998

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Re: HSC 2014 4U Marathon

here's a nice q (well in the syllabus carrot and sean lol)

abc is a triangle with ab = 360, bc = 240 and ac = 180. The internal and external bisectors of cab meet bc and bc produced at p and q respectively. Find the radius of the circle which passess through a, p and q.
also, do not use a calculator under no cricumstances
 

FrankXie

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Re: HSC 2014 4U Marathon

Here's a nice Q (well in the syllabus carrot and Sean lol)

ABC is a triangle with AB = 360, BC = 240 and AC = 180. The internal and external bisectors of CAB meet BC and BC produced at P and q respectively. Find the radius of the circle which passess through A, P and Q.
Use the bisector angle theorem, i.e.,

So

Therefore, the radius is 160 because triangle APQ is right angled at A and PQ is the diameter.
 

Axio

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Re: HSC 2014 4U Marathon

z satisfies |z-i|=Imz+1. Sketch/determine the locus of P(x,y) representing z. If A is the point (0,1) on the Argand diagram and B is the y-intercept of the tangent of the locus at P on the Argand diagram, show that angleAPB=angleABP.
 
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integral95

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Re: HSC 2014 4U Marathon

z satisfies |z-i|=Im(z+1). Sketch/determine the locus of P(x,y) representing z. If A is the point (0,1) on the Argand diagram and B is the y-intercept of the tangent of the locus at P on the Argand diagram, show that angleAPB=angleABP.
After fudging the algebra you get Then you realised that A is actually the focus of the parabola and B lies on the directrix, so therefore AB = PA from the focus directrix definition of the parabola. There fore the angles are equal as they are base angles of isos triangle

(yeah I'm actually not too sure about the directrix part)
 

integral95

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Re: HSC 2014 4U Marathon

z satisfies |z-i|=Im(z+1). Sketch/determine the locus of P(x,y) representing z. If A is the point (0,1) on the Argand diagram and B is the y-intercept of the tangent of the locus at P on the Argand diagram, show that angleAPB=angleABP.
After fudging the algebra you get Then you realised that A is actually the focus of the parabola and B lies on the directrix, so therefore AB = PA from the focus directrix definition of the parabola. There fore the angles are equal as they are base angles of isos triangle

(yeah I'm actually not too sure about the directrix part)
Yeah sorry that's not right at all

I'll let P be point (Xo,Yo)



So APB is an isosceles triangle so therefore the angles are equal
 
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Axio

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Re: HSC 2014 4U Marathon

^ I removed the brackets from Im to make it easier to do.
 

Axio

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Re: HSC 2014 4U Marathon

By using the binomial theorem on cos5theta and solving the equation 32x^5 -40x^3 +10x -1=0, find the exact form of .
 

Sy123

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Re: HSC 2014 4U Marathon





 
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dan964

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Re: HSC 2014 4U Marathon

Second part, does it still work for x=0?
Is it supposed to be 0<|x|<1

I must be missing something because I keep getting Cn=1 when n=0?
 
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Sy123

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Re: HSC 2014 4U Marathon

Second part, does it still work for x=0?
Is it supposed to be 0<|x|<1
C_0(x) is supposed to be 1, my bad, editing now

And yes it should work for x = 0, (see when n=0)
 

Axio

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Re: HSC 2014 4U Marathon

i)

(Don't know how to simplify last bit)
 
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Sy123

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Re: HSC 2014 4U Marathon

i)

(Don't know how to simplify last bit)
That looks a little hand-wavy tbh (unless by "last bit" you mean those lines in your proof for part (i))

There is an easier way to do it though
 

Axio

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Re: HSC 2014 4U Marathon

That looks a little hand-wavy tbh (unless by "last bit" you mean those lines in your proof for part (i))

There is an easier way to do it though
Meant this. Feel free to share the easier method :tongue:.
 

Sy123

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Re: HSC 2014 4U Marathon

Meant this. Feel free to share the easier method :tongue:.
HINT: Try to prove the relationships for C_n(cos theta) instead of C_n(x)
 
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