• Best of luck to the class of 2024 for their HSC exams. You got this!
    Let us know your thoughts on the HSC exams here
  • YOU can help the next generation of students in the community!
    Share your trial papers and notes on our Notes & Resources page
MedVision ad

Imaginay Nos (2 Viewers)

ninetypercent

ninety ninety ninety
Joined
May 23, 2009
Messages
2,148
Location
Sydney
Gender
Female
HSC
2010
cube both sides

(x+iy) = X^3 + 3X^2(iY) + 3X(iy)^2 + (iy)^3 = X^3 + 3X^2iY - 3XY^2 -iY^3

equating real and imaginary parts





 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
Thxs Gurmies, much appreciated.

Ive got more tho.

 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
I dont get this question at all.

Prove that if the ratio is purely imaginary, the point z lies on the circle whose centre is at the point 1/2(1+i) and whose radius is 1/sqrt 2

Shouldnt it it mean the ratio = Z (upper case) (since z-1/z-i is a complex no.), and that the point Z lies on the circle...

Because if it is the lower case z, then rearranging the ratio would be necessary, unless im wrong?
 
Last edited:

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
Also this question has me stunned.

Two points, P, Q represent the complex no.s z, 2z+3+i respectively, where P moves on the circle |z|=k how does Q move?
 
K

khorne

Guest
Not 100% this is right, but:

let p be a point on the circle |z|=k.

Mod. p = k
Arg p = @

2z + 3+i = 2z + (3+i)

so in a sense you are multiplying z by 2 and adding 3+i

Since the argument of 2z and z are the same, |2z| = 2k

I.e 2z would just move as a circle with twice the radius.

3+i however, moves the circle down ,i and to the left, 3, so the origin is at (-3,-i) and its radius is 2k.
 
Last edited by a moderator:

untouchablecuz

Active Member
Joined
Mar 25, 2008
Messages
1,693
Gender
Male
HSC
2009
I dont get this question at all.

Prove that if the ratio is purely imaginary, the point z lies on the circle whose centre is at the point 1/2(1+i) and whose radius is 1/sqrt 2

Shouldnt it it mean the ratio = Z (upper case) (since z-1/z-i is a complex no.), and that the point Z lies on the circle...

Because if it is the lower case z, then rearranging the ratio would be necessary, unless im wrong?


im sure you can find the equation of the locus of now :) (which is indeed a circle)
 

cyl123

Member
Joined
Dec 17, 2005
Messages
95
Location
N/A
Gender
Male
HSC
2007
Close but not quite.... cos adding 3+i onto the vector 2z should move it upwards by i and right by 3, so logically the centre of the circle should shift by the same amount

Or convert into parametrics question:
Let P=z=x+iy so x^2+y^2=k^2 (x,y,X,Y are real)

Let Q=X+iY such that Q=2z+3+i
So equating gives X=2x+3, Y=2y+1
So 2x=X-3 , 2y=Y-1
So since 4x^2+4y^2=4k^2
then (X-3)^2+(Y-1)^2=4k^2
where coordinates of Q is (X,Y) and Q moves in a circle with centre (3,1) and radius 2k


Not 100% this is right, but:

let p be a point on the circle |z|=k.

Mod. p = k
Arg p = @

2z + 3+i = 2z + (3+i)

so in a sense you are multiplying z by 2 and adding 3+i

Since the argument of 2z and z are the same, |2z| = 2k

I.e 2z would just move as a circle with twice the radius.

3+i however, moves the circle down ,i and to the left, 3, so the origin is at (-3,-i) and its radius is 2k.
 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
More to go:

, show that when z describes the circle |z| = 1, completely in one direction, then w describes the circle |w|=1 competely in the other direction.
 

Lukybear

Active Member
Joined
May 6, 2008
Messages
1,466
Gender
Male
HSC
2010
Just on this one, when using parametrics, as so stated, did anyone get two varaible for one value? If then, how do you solve, since i havent done parametrics yet.
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,384
Gender
Male
HSC
2006
More to go:

, show that when z describes the circle |z| = 1, completely in one direction, then w describes the circle |w|=1 competely in the other direction.
Not sure about the "other direction" part:

 

Users Who Are Viewing This Thread (Users: 0, Guests: 2)

Top