SXC_DRAGON_BOY
Been A While
3 complex numbers Z1, Z2 and Z3 lie on a circle passing through the origin, show that 1/Z1, 1/Z2 and 1/Z3 are collinear
-
Looking for HSC notes and resources? Check out our Notes & Resources page
complex numbers.... need help with a question? (1 Viewer)
- Thread starter SXC_DRAGON_BOY
- Start date
Rahul
Dead Member
jus lookin at it:
ummm...
if z1, z2, z3 lie on a circle then their modulus must be the same
therefore,
z1=a+bi
z2=a-bi
z3=-a-bi
hmmmm......i have 4gotten to do this:mad1: i guess i gotta go back and study
i think i am on the right track.....i think!
ummm...
if z1, z2, z3 lie on a circle then their modulus must be the same
therefore,
z1=a+bi
z2=a-bi
z3=-a-bi
hmmmm......i have 4gotten to do this:mad1: i guess i gotta go back and study
i think i am on the right track.....i think!
SXC_DRAGON_BOY
Been A While
thanks for trying
this is a funny question cause my teacher told me that a selective skool in my region couldnt do this one...
i know it has to do with the modulus, but just what?
this is a funny question cause my teacher told me that a selective skool in my region couldnt do this one...
i know it has to do with the modulus, but just what?
N
ND
Guest
That would be true if the centre of the circle was the origin, however, it says the circle passes through the origin. I don't have any ideas. I don't see how its do-able considering that the locus for any Z is lZl <= R, -pi <= Arg(Z) <= pi. Are you sure the question is correct?
phenol
Argonaute
- Joined
- Feb 8, 2003
- Messages
- 145
- Gender
- Undisclosed
- HSC
- 2003
well if the centre of the circle is not the origin then we can do x-y plane shift
define
y' = y + h
x' = x + k
assume that (k, h) is the centre of the circle
then we now have a new x'-y' plane where the circle has centre on origin.
then
let z1, z2, z3 be rcis(pi), rcis(xi), rcis(nu) respectively then
1/z1 = cis(-pi) / r^2
similarly
1/z2 = cis(-xi)/ r^2
1/z3 = cis(-nu)/ r^2
easily see the three points are NOT colinear rather they lie on the same circle with radius 1/(r^2) and origin (k, h)
pi
define
y' = y + h
x' = x + k
assume that (k, h) is the centre of the circle
then we now have a new x'-y' plane where the circle has centre on origin.
then
let z1, z2, z3 be rcis(pi), rcis(xi), rcis(nu) respectively then
1/z1 = cis(-pi) / r^2
similarly
1/z2 = cis(-xi)/ r^2
1/z3 = cis(-nu)/ r^2
easily see the three points are NOT colinear rather they lie on the same circle with radius 1/(r^2) and origin (k, h)
pi
A hard question. Use this to review circle geometry and complex vectors and their args.
Three complex numbers p,q and r are collinear in the Argand plane if arg(p-q)-arg(q-r)=0,pi,-pi (0,180,-180). This just means that the two vectors p-q and q-r have the same arg or are supplementary.
Three points 1/z1,1/z2, and 1/z3 are collinear if
arg(1/z1-1/z2)-arg(1/z2-1/z3)=0,pi, or -pi
=arg((z2-z1)/z1z2)-arg((z3-z2)/z2z3)
= arg(z2-z1)-arg(z1z2)-arg(z3-z2)+arg(z2z3)
=arg(z2-z1)-arg(z3-z2)-arg(z1)-arg(z2)+arg(z2)+arg(z3)
=(arg(z2-z1)-arg(z3-z2))-((arg(z1)-arg(z3))
But arg(z2-z1)-arg(z3-z2) is either the -angle z1z2z3 or the external angle at z2 of the cyclic quad. Oz1z2z3 depending on how you draw these concyclic points.
arg(z1)-arg(z3) is an interior angle z1Oz2 of cyclic quad. Oz1z2z3.
The expression (arg(z2-z1)-arg(z3-z2))-((arg(z1)-arg(z3)) will give you the negative sum of two interior opposite angles -pi, or the difference of an external angle and an opposite interior angle, zero. Proven.
Three complex numbers p,q and r are collinear in the Argand plane if arg(p-q)-arg(q-r)=0,pi,-pi (0,180,-180). This just means that the two vectors p-q and q-r have the same arg or are supplementary.
Three points 1/z1,1/z2, and 1/z3 are collinear if
arg(1/z1-1/z2)-arg(1/z2-1/z3)=0,pi, or -pi
=arg((z2-z1)/z1z2)-arg((z3-z2)/z2z3)
= arg(z2-z1)-arg(z1z2)-arg(z3-z2)+arg(z2z3)
=arg(z2-z1)-arg(z3-z2)-arg(z1)-arg(z2)+arg(z2)+arg(z3)
=(arg(z2-z1)-arg(z3-z2))-((arg(z1)-arg(z3))
But arg(z2-z1)-arg(z3-z2) is either the -angle z1z2z3 or the external angle at z2 of the cyclic quad. Oz1z2z3 depending on how you draw these concyclic points.
arg(z1)-arg(z3) is an interior angle z1Oz2 of cyclic quad. Oz1z2z3.
The expression (arg(z2-z1)-arg(z3-z2))-((arg(z1)-arg(z3)) will give you the negative sum of two interior opposite angles -pi, or the difference of an external angle and an opposite interior angle, zero. Proven.
spice girl
magic mirror
- Joined
- Aug 10, 2002
- Messages
- 785
Idunno if my solution is the same as OLDMAN's, but anyway:
When comparing z to 1/z, what's not important here is arg(1/z) = -arg(z)
What's more important is that |1/z| = 1/|z|
So If z1, z2, z3 represented by A, B, C, (origin O as usual), we have cyclic quad OABC (without loss of generality assume OABC is in that order).
Then suppose 1/z1(bar), 1/z2(bar), 1/z3(bar) is represented by A', B', C'.
Note that OA'A , OB'B, OC'C are collinear since arg(1/z1(bar)) = -arg(1/z1) = arg(z1)
Consider triangles OAB and OA'B':
angle O is common
OA/OB' = OB/OA' = ab
Thus OAB similar to OA'B'
and angle OAB = angle OB'A' (corresponding angles of similar triangles equal)
similarly, OBC is similar to OB'C' and angle OB'C' = OCB
(If you aren't following, it's prolly cos u aren't drawing this)
But angle OAB + angle OCB = pi (opp angles of cyclic quad supplementary)
Thus A', B', C' are collinear (angle OB'A' + angle OB'C' = pi)
Now, since 1/z1 is 1/z1(bar) reflected about the x axis, etc, thus since A', B', C' are collinear, thus 1/z1, 1/z2, 1/z3 are collinear (the line a reflection of A'B'C' about the x axis)
When comparing z to 1/z, what's not important here is arg(1/z) = -arg(z)
What's more important is that |1/z| = 1/|z|
So If z1, z2, z3 represented by A, B, C, (origin O as usual), we have cyclic quad OABC (without loss of generality assume OABC is in that order).
Then suppose 1/z1(bar), 1/z2(bar), 1/z3(bar) is represented by A', B', C'.
Note that OA'A , OB'B, OC'C are collinear since arg(1/z1(bar)) = -arg(1/z1) = arg(z1)
Consider triangles OAB and OA'B':
angle O is common
OA/OB' = OB/OA' = ab
Thus OAB similar to OA'B'
and angle OAB = angle OB'A' (corresponding angles of similar triangles equal)
similarly, OBC is similar to OB'C' and angle OB'C' = OCB
(If you aren't following, it's prolly cos u aren't drawing this)
But angle OAB + angle OCB = pi (opp angles of cyclic quad supplementary)
Thus A', B', C' are collinear (angle OB'A' + angle OB'C' = pi)
Now, since 1/z1 is 1/z1(bar) reflected about the x axis, etc, thus since A', B', C' are collinear, thus 1/z1, 1/z2, 1/z3 are collinear (the line a reflection of A'B'C' about the x axis)