Solving for arg(iz) with Example Problem | Complex Numbers Homework Help"

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patm95
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Homework Statement



I need help on a little review please. z=2-i What is arg(iz)


Homework Equations



Well iz= 1+2i


The Attempt at a Solution



I think this should end up being arg(2i/1) But this doesn't seem to make sense because I am wanting to find an angle here right? I am somewhat confused. This is supposed to be an inverse tangent type problem, correct?
 
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I am thinking now that this should be something like 3pi/8 but I can't explain my logic...
 
It's simple trigonometry if you take a look at a complex number on the argand diagram. The argument of the complex number is the angle between the vector and the x-axis. The vector is just a line between the origin and the complex number.

So, [tex]arg(a+ib)=tan^{-1}(b/a)[/tex]
 
Ok. Doesn't that mean that it would be tan-1(2) which would be 1.107?
 
No, it doesn't! The arg of a+ bi is the angle the line from 0 to a+bi, thought of as points in the complex plane (a+ bi-> (a, b)) makes with the positive real axis. Specifically it is, as [itex]tan^{-1}(b/a)[/itex] as Mentallic says.

But your number is z= 2- i. a= 2 and b= -1, NOT a= 1 and b= 2 as you seem to think.
 
Yeah but the question is what is What is arg(iz) so doesn't that mean that I mult i times 2-i to give me 1+2i?

I think what you just said would be for arg(z). correct?