Geometric Representation Question (1 Viewer)

Nashchnc

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Having a bit of difficulty with a question and unsure whether my approach is correct?

"z1=4-i, z2=2i and z3 form vertices of an isosceles right angled triangle, with z3 the right angle, Find z3."

Is the question, my working went along the lines of:

Vector z3,z1 = (i) x vector z3,z2.

(z1-z3)=(i)(z2-z3)
4 - i - z3 = -2 - (i)z3
4 - i +2 = z3(1-i)
(6 - i)/(1 - i) = z3

Multiplying by conjugate gives

(7+5i)/2



Can someone kindly point out my flaw? Ive drawn it up on an argand plane and it doesnt seem like 90 degrees at that point? Thanls in advance :)
 

anomalousdecay

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Multiplying the numerator and denominator gives us:



I got the same thing as you...... I drew the diagram as well. Did you copy the question out properly?
 

obliviousninja

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Can't there be two points for Z3? The vertice could be on the top right or bottom left?
 
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obliviousninja

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Having a bit of difficulty with a question and unsure whether my approach is correct?

"z1=4-i, z2=2i and z3 form vertices of an isosceles right angled triangle, with z3 the right angle, Find z3."

Is the question, my working went along the lines of:

Vector z3,z1 = (i) x vector z3,z2.

(z1-z3)=(i)(z2-z3)
4 - i - z3 = -2 - (i)z3
4 - i +2 = z3(1-i)
(6 - i)/(1 - i) = z3

Multiplying by conjugate gives

(7+5i)/2



Can someone kindly point out my flaw? Ive drawn it up on an argand plane and it doesnt seem like 90 degrees at that point? Thanls in advance :)
Do you have answers?
 

Nashchnc

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no i dont have answers, its from the pittwater house paper on here
 

QZP

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@OP, you are correct. There is no mistake...
 

QZP

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There is another answer though
 

Nashchnc

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I thought so, thanks guys :)

As a side note, the locus arg((z-i)/(z+1))=pi/2

Will be a semicirle between i and -1, where a line between the two is the diameter of the locus, which is a circle?
 

Nashchnc

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How do i get the other result?

EDIT: I think its multiplication by -i am i correct???
 
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QZP

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How do i get the other result?

EDIT: I think its multiplication by -i am i correct???
It's the exact same thing as what you did for the first answer. Just z3 is in a different location... (hint: consider where z3 is if it is reflected about the axis joining z1 and z2)

I thought so, thanks guys :)

As a side note, the locus arg((z-i)/(z+1))=pi/2

Will be a semicirle between i and -1, where a line between the two is the diameter of the locus, which is a circle?
What's your answer? Semi circle or a circle? I can't help you if I don't know where you're going wrong :S
 

Nashchnc

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answer is a semicircle in quadrant 2, starting at i, ending at -1?
 

QZP

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answer is a semicircle in quadrant 2, starting at i, ending at -1?
It's not exactly a "semi-circle" (diameter not included as part of locus), and there is also a restriction on z which you haven't mentioned...
 

obliviousninja

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I fairly sure you also have to take into account the other scenario for Z3

ie. if the point was in the bottom left, rather than top right. (z3-z1)i = z3-z2
 

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