Understanding Complex Numbers: Find the Answer

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SUMMARY

The discussion clarifies the calculation of i^3, confirming that i^3 equals -i, not i. Participants emphasize that the expression i can be represented as √(-1), but caution against misapplying the square root properties when dealing with negative numbers. The correct interpretation is that i^3 can be derived from the multiplication of i with itself: i^3 = (i*i)*i = -1*i = -i. The conversation also highlights the importance of understanding the limitations of notation in complex number calculations.

PREREQUISITES
  • Understanding of complex numbers and their properties
  • Familiarity with basic algebraic operations involving square roots
  • Knowledge of the concept of imaginary unit i
  • Awareness of notation limitations in mathematical expressions
NEXT STEPS
  • Study the properties of complex numbers in detail
  • Learn about the implications of Euler's Formula in complex analysis
  • Explore the rules of manipulating square roots, especially with negative values
  • Review advanced topics in complex calculus for deeper insights
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Students and educators in mathematics, particularly those focusing on complex numbers and algebra, as well as anyone seeking to clarify misconceptions in mathematical notation and operations.

kay
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We know that i^3 is -i .
But I am getting confused, because I thought that i can be written as √(-1) and i^3 = √(-1) × √(-1) × √(-1) = √(-1 × -1 × -1) = √( (-1)^2 × -1) = √(1× -1) = √(-1) = i
( and not -i ).
Please help.:rolleyes:
Sorry I couldn't use superscript because I was using my phone.
 
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https://www.physicsforums.com/showthread.php?t=637214
 
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i definitely is not \sqrt{-1}. If you like (abuse of notation)
\sqrt{-1} = \pm i
Using (this not correct notation) \sqrt{-1}^3 = \pm i. Much better is of course
i^3 = (i*i)*i = -1*i = -i
 
micromass said:
https://www.physicsforums.com/showthread.php?t=637214
i am really not familiar with Euler's constant that much, and complex calculus, but thanks. :)
 
Last edited by a moderator:
dieterk said:
i definitely is not \sqrt{-1}. If you like (abuse of notation)
\sqrt{-1} = \pm i
Using (this not correct notation) \sqrt{-1}^3 = \pm i. Much better is of course
i^3 = (i*i)*i = -1*i = -i

I didn't understand anything. :|
 
kay said:
i am really not familiar with Euler's constant that much, and complex calculus, but thanks. :)


The link given by micromass has everything you need to know and you don't need to know Euler's Formula to understand what he meant. I suggest read (not skim) the link provided by micromass.
 
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When you got to this point: $$\sqrt{-1}\cdot\sqrt{-1}\cdot\sqrt{-1}=\sqrt{(-1)\cdot(-1)\cdot(-1)},$$ you made a mistake since \sqrt{a}\sqrt{b}=\sqrt{ab} isn't true when a,b\lt0.
 

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