MedVision ad

Geometry/Complex Numbers (1 Viewer)

OLDMAN

Member
Joined
Feb 20, 2003
Messages
251
Location
Mudgee
Gender
Undisclosed
HSC
N/A
Some complex number problems could be done quiet elegantly using a geometric approach. How about the other way around?

Let ABC be a triangle, D be the midpoint of AB and E a point on the side AC for which AE = 2EC. Prove that BE bisects the segment CD.

a) by geometry
b) by complex numbers
 

nike33

Member
Joined
Feb 18, 2004
Messages
219
ahh :( so far for a, i have drawn a circle aroud DC where a point 'z' is the centre of the circle now if i can prove B F E are collinear does that prove it?
 

OLDMAN

Member
Joined
Feb 20, 2003
Messages
251
Location
Mudgee
Gender
Undisclosed
HSC
N/A
nike33 : you're on the right track - but are you doing approach b) or a) ? At any rate, go on...
 

nike33

Member
Joined
Feb 18, 2004
Messages
219
ok heres my attempt

Let z be midpoint of AE

in triangle ABE

2AZ = AE
2AD = DB
and angle BAC is common

hence triangle ADZ|||triangleABE .:. DZ||BE (corresponding angles in parrallel lines equal)

triangle DZC|||TriangleEOC (where O is where DC and BE intercept by AAA

as the triangles are in the ratio 2:1 tje midpoint of DZ (m) produced perpindicular to DZ will cut O.

and by SAS DMO and OEC are congruent...hence DO = OC corresponding sides in congruent triangle

*waits for someones 2 line complex number proof :(
 

OLDMAN

Member
Joined
Feb 20, 2003
Messages
251
Location
Mudgee
Gender
Undisclosed
HSC
N/A
just to comment that dropping a perpendicular from the midpoint of DZ and assuming that it will cut DC at O might be at best unnecessary or at worst wrong. But overall approach is good.
Will give you a chance to revise that part or defend it.
 

nike33

Member
Joined
Feb 18, 2004
Messages
219
ok... DZ is parrallel to BE

hence a perpindicular from DZ will perpindiculary cut BE
now as DZ = 2OE (proven using similar triangle rations)
the midpoint of DZ ie m will pass though O in this example (due to the paralled lines)

it has to cut 'o' as MZ = OE = DM and ZE = MO
and, if it didnt cut o then DO =! OC
 

Idyll

Member
Joined
Mar 9, 2004
Messages
106
Gender
Undisclosed
HSC
2006
My attempt at b:

Let A be the complex no. alpha, B be beta and C be gamma.

Since D is the midpoint of AB, it represents the complex number:
0.5(alpha+beta).

Therefore, mid-point DC has coordinates 0.25(alpha+beta)+0.5gamma.

By ratio division formula, E represents the complex no. 2/3*gamma+1/3*alpha.

Now, for the mid-point of DC lies on BE, there must exist a natural no. l such that:

l(0.25beta-1/12*alpha-1/6*gamma)=beta-2/3*gamma-1/3*alpha

For l=4:
4(0.25beta-1/12*alpha-1/6*gamma)=beta-2/3*gamma-1/3*alpha
beta-2/3*gamma-1/3*alpha=beta-2/3*gamma-1/3*alpha

i.e. The mid-point of DC lies on BE.

Therefore, BE bisects DC.
 

nike33

Member
Joined
Feb 18, 2004
Messages
219
is that a hsc method? anyways i understood it till


l(0.25beta-1/12*alpha-1/6*gamma)=beta-2/3*gamma-1/3*alpha

that line, can you explain? :)
 

Idyll

Member
Joined
Mar 9, 2004
Messages
106
Gender
Undisclosed
HSC
2006
Let R be the mid-point of of DC. Hence, R has coordinates 0.25(alpha+beta)+0.5gamma.

Now, the vector ER is 0.25beta-1/12*alpha-1/6*gamma.
The vector EB is beta-2/3*gamma-1/3*alpha

And that line is just showing that ER and EB are parallel and hence R lies on the line EB
 

:: ck ::

Actuarial Boy
Joined
Jan 1, 2003
Messages
2,414
Gender
Male
HSC
2004
beta gamma alpha... wtf o_O

arghz y make it look so complex... [using complex numbers XD.. ok bad joke] .. T_T
 

ND

Member
Joined
Nov 1, 2002
Messages
971
Location
Club Mac.
Gender
Male
HSC
2003
It's easier if you let one of teh vertices lie on the origin. Btw, wouldn't have been easier to you a b and c instead of alpha beta and gamma?
 

Idyll

Member
Joined
Mar 9, 2004
Messages
106
Gender
Undisclosed
HSC
2006
Originally posted by ND
It's easier if you let one of teh vertices lie on the origin. Btw, wouldn't have been easier to you a b and c instead of alpha beta and gamma?
Yeah, it would've been easier to use a, b and c, lol. Oh well :)

Edit: And I agree it would've been easier to let one of the vertices be the origin :)
 
Last edited:

OLDMAN

Member
Joined
Feb 20, 2003
Messages
251
Location
Mudgee
Gender
Undisclosed
HSC
N/A
Idyll hasn't done too badly, he (or she) has the right approach. But in the name of elegance, lets follow ND's advise and more.

Position the triangle with C at O, A at 12 and ... wait for it... B at 12z where z is a complex number.

If Idyll (or anyone else) care to do it again with this definition, it will certainly look a lot nicer.
 

OLDMAN

Member
Joined
Feb 20, 2003
Messages
251
Location
Mudgee
Gender
Undisclosed
HSC
N/A
Originally posted by nike33
ok... DZ is parrallel to BE

hence a perpindicular from DZ will perpindiculary cut BE
now as DZ = 2OE (proven using similar triangle rations)
the midpoint of DZ ie m will pass though O in this example (due to the paralled lines)

it has to cut 'o' as MZ = OE = DM and ZE = MO
and, if it didnt cut o then DO =! OC
Well defended nike33.
Another way is to draw CF // BE and DZ. Since this 3 parallel lines splits ZC equally, they must also split DC equally.
 

Idyll

Member
Joined
Mar 9, 2004
Messages
106
Gender
Undisclosed
HSC
2006
That definitely makes things much nicer :)

Now, D is the complex no. 6+6z.
E is the complex no. 4.

Let the mid-point OD be R.

Therefore, R is the complex no. 3+3z.

Therefore, for R lies on EB, there must exist a natural number, l, such that:
l(-1+3z)=-4+12z

Which there is (l=4), and hence the result follows.

would I be right in saying you chose 12 because it is divisible by 4, which makes the working nicer, but it will still work for any number?
 

ND

Member
Joined
Nov 1, 2002
Messages
971
Location
Club Mac.
Gender
Male
HSC
2003
Originally posted by OLDMAN
Position the triangle with C at O, A at 12 and ... wait for it... B at 12z where z is a complex number.
But don't you lose some generality by making A = 12? I mean, it's commonsensical that it won't actually make any difference, but will markers like it? Would it be better to make it 12x, where x is any real number?
 

OLDMAN

Member
Joined
Feb 20, 2003
Messages
251
Location
Mudgee
Gender
Undisclosed
HSC
N/A
There are always two sides to an argument : the argument itself and the argument about the argument. Please excuse this Lewis Carroll type argument..:)

Now for the argument itself : no there won't be any loss of generality by saying one side is size 12 unless you're talking about shoes! 12 what?

Now for the argument about the argument : yes it will leave some markers confused, so better off assuming 12k.

I win the first argument but ND wins the second.
 

CM_Tutor

Moderator
Moderator
Joined
Mar 11, 2004
Messages
2,642
Gender
Male
HSC
N/A
Alternately, you state in your answer that, were A to be positioned anywhere else on the real axis, the 'new' situation will be formally similar to the 'current' situation, and hence the result will remain true.
 

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

Top