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Nice complex numbers question. (1 Viewer)

Comeeatmebro

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Wow those are some amazing marks that you achieved! And no I've got no idea for the question
 

Hermes1

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vector PR = PQ cis 60
vector RQ = PQ cis -60

therefore,
r-p = (q-p)cis 60
q-r = (q-p)cis -60

cis 60 = r-p/q-p
cis -60 = q-r/q-p

cis 60 x cis -60 = r-p/q-p x q-r/q-p
therefore,
(r-p)(q-r)/(q-p)^2 = 1

simplify from here to get above answer

nice question, this is my favourite part of complex numbers the vectors.
 

seanieg89

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Thankyou comeeatmebro and good work arj, although you have only proven the 'if' statement, not the 'only if' statement. The latter is slightly harder.
 

gurmies

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vector PR = PQ cis 60
vector RQ = PQ cis -60

therefore,
r-p = (q-p)cis 60
q-r = (q-p)cis -60

cis 60 = r-p/q-p
cis -60 = q-r/q-p

cis 60 x cis -60 = r-p/q-p x q-r/q-p
therefore,
(r-p)(q-r)/(q-p)^2 = 1

simplify from here to get above answer

nice question, this is my favourite part of complex numbers the vectors.
I don't think that's sufficient for an iff proof.

[EDIT: seanieg89 has addressed this already]
 

Hermes1

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Thankyou comeeatmebro and good work arj, although you have only proven the 'if' statement, not the 'only if' statement. The latter is slightly harder.
how would you do the only if
 

seanieg89

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Assume that the given equation holds and try to deduce that this forces the three points to be vertices of an equilateral triangle.
It isn't easy, but I will wait for more people to attempt it before i give any big hints.
 

Trebla

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There's probably a shorter way but here's what I did

 
Last edited:

cutemouse

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Triangle PQR is equilateral iff |PQ|=|QR|=|RP| and arg (PR) - arg (PQ) = arg(QP) - arg(QR)

iff |q-p| = |r-q| = |p-r| and arg(r-p)-arg(q-p)=arg(p-q)-arg(r-q)

iff |q-p| = |r-q| = |p-r| and arg[(r-p)/(q-p)] = arg[(p-q)/(r-q)]

iff (r-p)/(q-p)=(p-q)/(r-q)

iff (r-p)(r-q)= -(p+q)^2 , q=/=p and r=/=q

iff r^2 - rq - rp +pq = - (p^2 - 2pq + q^2)

iff p^2 + q^2 + r^2 = pq + rq + rp QED
 

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