Evaluating complex multiplication?

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    Complex Multiplication
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Discussion Overview

The discussion centers on understanding the product of complex numbers, particularly through vector representation in the complex plane and algebraic simplification. Participants explore mathematical transformations and identities related to complex multiplication and the real part of the resulting complex number.

Discussion Character

  • Exploratory
  • Technical explanation
  • Mathematical reasoning

Main Points Raised

  • One participant inquires about comprehending the product of complex numbers and specifically seeks the value of Re(C) for a given series.
  • Another participant suggests converting complex numbers into polar form (R(θ)) for multiplication, noting that the magnitudes multiply and the angles add.
  • A participant requests a more mathematical explanation of the transformation involved, mentioning the formulas for the magnitude and angle of a complex number.
  • Further clarification is provided regarding the need to ensure the angle is in the correct quadrant when calculating θ.
  • A participant asks about simplifying identities for specific series related to the original question about Re(C).

Areas of Agreement / Disagreement

Participants express varying levels of understanding and clarity regarding the mathematical transformations involved, with no consensus reached on the simplification of the series or the value of Re(C).

Contextual Notes

There are unresolved aspects regarding the assumptions needed for the transformations and the conditions under which the identities may hold true.

Loren Booda
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How might one comprehend the product of complex numbers

N
[pi](an+ibn)=C
n=1

such as by representation with vectors in the complex plane, or algebraic simplification? Specifically, I would like to know the value Re(C).
 
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Hi

Any complex number a+ib can be represented as R(& theta). Where R is the magnitude and & theta is the phase. So convert the complex number into R(& theta) form and multiply. The R parts multiply while the angle parts add up.

e.g. R(& theta)* P(& Theta) = R*P(& theta + & Theta)

Got it?


Sridhar
 
A bit rough, sridhar, but helpful in jogging my memory.

Can you or another be more mathematical in regard to the transform involved?

Is it tan-1(b/a)=[the] and r=(a2+b2)1/2?
 
Right...ish

if (a + bi) = r exp(iθ), then it is true that

r = (a^2 + b^2)^(1/2)
and
tan θ = b/a

But you have to make sure that θ is in the correct quadrant. (iow you might have to add π).
 
Hurkyl,

Is there a simplifying (exact) identity for the arithmetic series

N
[sum]tan-1(bn/an)
n=1

and for the geometric series

N
[pi](an2+bn2)1/2
n=1

or, more importantly, for my original statement concerning Re(C)?
 

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