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Toronto Math Forum
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MAT334--2020F
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MAT334--Lectures & Home Assignments
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Chapter 1
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1.2 circles
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Topic: 1.2 circles (Read 4196 times)
Maria-Clara Eberlein
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1.2 circles
«
on:
September 23, 2020, 07:27:50 PM »
When we have are asked to find the locus of |z-p|=|z-q|, can we immediately say the perpendicular bisector of the line segment joining p and q, or must we plug in z=x+iy and solve to get x=0?
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Last Edit: September 25, 2020, 12:11:12 AM by Maria-Clara Eberlein
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shiyuancao
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Re: 1.2 circles
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Reply #1 on:
September 24, 2020, 04:52:59 PM »
I think this depends on how you want to represent your solution. Both of them seems rational to me.
But $x$ does not necessarily to be $0$ since $p$ and $q$ are some arbitrary complex numbers.
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Lubna Burki
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Re: 1.2 circles
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Reply #2 on:
September 24, 2020, 07:34:11 PM »
I think it's enough to say that this looks like one of the Apollonius circles in which is row is 1 then a line is given (specifically the perpendicular bisector of the two foci).
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Toronto Math Forum
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MAT334--2020F
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MAT334--Lectures & Home Assignments
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Chapter 1
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1.2 circles