MedVision ad

HSC 2014 MX2 Marathon (archive) (1 Viewer)

Status
Not open for further replies.

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

Facedesk*
I just recapped, I kept trying to think visually but i guess algebraic would be best...
Its just letting z=x+i that threw me off.
So i let z=x+iy.
for i) it is clear that locus is y=1 by equating coeff
ii) Similarly from your expansion y=1 should also be locus for z squared.
How do you let z=x+iy?

Think of it this way

since z=(x^2-1) + 2x i

What is z if x=1? or x=2? or x=3?

You get a series of dots, but they follow a certain curve, this curve is the locus. How do you find this locus given z?
 

Ikki

Active Member
Joined
Oct 29, 2012
Messages
130
Gender
Male
HSC
2014
Re: HSC 2014 4U Marathon

How do you let z=x+iy?

Think of it this way

since z=(x^2-1) + 2x i

What is z if x=1? or x=2? or x=3?

You get a series of dots, but they follow a certain curve, this curve is the locus. How do you find this locus given z?
If x=1: z^2=2i, If x=2:z^2=3+4i, If x=3: z^2=8+6i

If i let z=x+iy but also x+i
then x^2-y^2+2xyi=x^2-1+2xi
Equating imaginaries, y=1 right? But clearly not the case by substituting...

EDIT: We could just take them as points (0,2) (3,4) and (8,6). SYYYYYYYYYYYYYY Mind is blowing here
 
Last edited:

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

If x=1: z^2=2i, If x=2:z^2=3+4i, If x=3: z^2=8+6i

If i let z=x+iy but also x+i
then x^2-y^2+2xyi=x^2-1+2xi
Equating imaginaries, y=1 right? But clearly not the case by substituting...

EDIT: We could just take them as points (0,2) (3,4) and (8,6). SYYYYYYYYYYYYYY Mind is blowing here
But remember y=/=1 here!

its not z=x+i, its z=(x+i)^2 which is completley different

just imagine its z=t + i instead of x + i just so its not confusing

so z= x+iy = (t+i)^2 = (t^2-1) + 2t i

Hence x=(t^2-1) , y= 2t

t = y/2, x= (y^2/4-1)

Hence y^2 = 4(x+1)

Therefore the locus is the equation y^2 = 4(x+1) in the cartesian plane.
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,384
Gender
Male
HSC
2006
Re: HSC 2014 4U Marathon

Not sure if that is within the HSC syllabus?
 

Ikki

Active Member
Joined
Oct 29, 2012
Messages
130
Gender
Male
HSC
2014
Re: HSC 2014 4U Marathon

Ah like parametrics aye, yeh the t thing helped alot
TREBLAAA hi :)
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

Not sure if that is within the HSC syllabus?
Oh I was under the impression it was
(still a good problem though it was not useless)
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

(Definitely within syllabus)

 

Ikki

Active Member
Joined
Oct 29, 2012
Messages
130
Gender
Male
HSC
2014
Re: HSC 2014 4U Marathon

(Definitely within syllabus)

i) Hmm with this one i simply drew up the unit circle and placed z on the argand diagram between 0 and pi/2.
Similarly, for z^2 the domain extends to pi so I placed z^2 in the second quadrant which also lies in the unit circle.
By the modulus of z is clearly 1 for both numbers and similarly the distance from z and z^2 to (z+z^2)=1 via vector addition.
Therefore all sides of the quadrilateral (0,z,z^2,z+z^2) are equal, therefore it can be classified as a rhombus.

ii) let theta=x for my convienience.
z=cisx
z^2=cis2x (By demoivres)
z+z^2=cisx+cis2x= {cosx + cos2x} + i(sinx+sin2x)

But z^2 also = cos^2x-sin^2x + 2sinxcosxi
Therefore, z+z^2={cos^2x-sin^2x}+cosx+2sinxcosxi

Now observing LHS of what we need to show, we equate the Reals:

ANDDD This is where i'm not sure, am I on the right track?
 
Last edited:

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

i) Hmm with this one i simply drew up the unit circle and placed z on the argand diagram between 0 and pi/2.
Similarly, for z^2 the domain extends to pi so I placed z^2 in the second quadrant which also lies in the unit circle.
By the modulus of z is clearly 1 for both numbers and similarly the distance from z and z^2 to (z+z^2)=1 via vector addition.
Therefore all sides of the quadrilateral (0,z,z^2,z+z^2) are equal, therefore it can be classified as a rhombus.

ii) let theta=x for my convienience.
z=cisx
z^2=cis2x (By demoivres)
z+z^2=cisx+cis2x= {cosx + cos2x} + i(sinx+sin2x)

But z^2 also = cos^2x-sin^2x + 2sinxcosxi
Therefore, z+z^2={cos^2x-sin^2x}+cosx+2sinxcosxi

Now observing LHS of what we need to show, we equate the Reals:

ANDDD This is where i'm not sure, am I on the right track?
The first is correct, for the second one, try finding (z+z^2) in modulus argument form by considering the vector geometrically (use the first part)
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

 

dunjaaa

Active Member
Joined
Oct 10, 2012
Messages
473
Gender
Male
HSC
2014
Re: HSC 2014 4U Marathon

Domain: x=±1
Range: y=±pi
I drew each separate graph and they shared the common points of (1,pi/2),(-1,-pi/2) and hence by the summing the graphs, y-ordinate doubles. Everywhere else is undefined, you get 2 dots at (x=1,y=pi) and (x=-1,y=-pi)
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

 

hit patel

New Member
Joined
Mar 14, 2012
Messages
568
Gender
Male
HSC
2014
Uni Grad
2018
Re: HSC 2014 4U Marathon

Volumes Question :
Volumes.jpg
 

Sy123

This too shall pass
Joined
Nov 6, 2011
Messages
3,730
Gender
Male
HSC
2013
Re: HSC 2014 4U Marathon

I am getting I_(n-2) + I_n = 1/(2n-1) . Why so different?
If you mean I_(n-1) + I_n = 1/(2n-1) then this is fine since if we just make n -> n+1 we get

I_((n+1) - 1) + I_(n+1) = 1/(2(n+1)-1)

I_n + I_(n+1) = 1/(2n+1)
 

hit patel

New Member
Joined
Mar 14, 2012
Messages
568
Gender
Male
HSC
2014
Uni Grad
2018
Re: HSC 2014 4U Marathon

If you mean I_(n-1) + I_n = 1/(2n-1) then this is fine since if we just make n -> n+1 we get

I_((n+1) - 1) + I_(n+1) = 1/(2(n+1)-1)

I_n + I_(n+1) = 1/(2n+1)
Sorry its the same thing. Didnt see that. TOo much caffeine.
 
Status
Not open for further replies.

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

Top