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#1 2009-05-27 13:44:44
- sunflower84
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- Registered: 2009-05-27
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finding the maximum of arg z
Given that u=1+2i, and also the |z-u|=2.
Already sketch the locus of the complex number z such that|z-u|=2.
Now, question ask me to find the greatest value of arg z for points on this locus.
How can I get the answer?
Thx for helping ya.!:)
Last edited by sunflower84 (2009-05-28 03:05:13)
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#2 2009-05-28 01:20:26
- mathsyperson
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- Registered: 2005-06-22
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Re: finding the maximum of arg z
I was about to attack this with horrible-looking calculus, but then I saw a much nicer way.
You should be able to find the minimum of arg(z) without much trouble.
Once you have that, draw a line of symmetry between 0 and u, and that will get you the maximum of arg(z) without much work.
Why did the vector cross the road?
It wanted to be normal.
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#3 2009-05-28 03:15:26
- sunflower84
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- Registered: 2009-05-27
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Re: finding the maximum of arg z
ok......by following your way,
i can get the correct answer as shown in the book.
but i think i need a little bit more expaination on this.
Why the maximum of arg(z) is the double of the arg(u)?
_______________________________________________
Looking for your explaination......
thank you so much!! 
Last edited by sunflower84 (2009-05-28 03:20:32)
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#4 2009-05-28 05:52:13
- mathsyperson
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- Registered: 2005-06-22
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Re: finding the maximum of arg z
That happens because the minimum argument is 0.
By symmetry, it's required that max(arg(z)) - arg(u) = arg(u) - min(arg(z)).
(That's not a general law, but it's easy to see why it's true here if you consider it geometrically)
Why did the vector cross the road?
It wanted to be normal.
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