What is Complex number: Definition and 438 Discussions

In mathematics, a complex number is a number that can be expressed in the form a + bi, where a and b are real numbers, and i is a symbol called the imaginary unit, and satisfying the equation i2 = −1. Because no "real" number satisfies this equation, i was called an imaginary number by René Descartes. For the complex number a + bi, a is called the real part and b is called the imaginary part. The set of complex numbers is denoted by either of the symbols




C



{\displaystyle \mathbb {C} }
or C. Despite the historical nomenclature "imaginary", complex numbers are regarded in the mathematical sciences as just as "real" as the real numbers and are fundamental in many aspects of the scientific description of the natural world.Complex numbers allow solutions to all polynomial equations, even those that have no solutions in real numbers. More precisely, the fundamental theorem of algebra asserts that every polynomial equation with real or complex coefficients has a solution which is a complex number. For example, the equation




(
x
+
1

)

2


=

9


{\displaystyle (x+1)^{2}=-9}

has no real solution, since the square of a real number cannot be negative, but has the two nonreal complex solutions −1 + 3i and −1 − 3i.
Addition, subtraction and multiplication of complex numbers can be naturally defined by using the rule i2 = −1 combined with the associative, commutative and distributive laws. Every nonzero complex number has a multiplicative inverse. This makes the complex numbers a field that has the real numbers as a subfield. The complex numbers form also a real vector space of dimension two, with {1, i} as a standard basis.
This standard basis makes the complex numbers a Cartesian plane, called the complex plane. This allows a geometric interpretation of the complex numbers and their operations, and conversely expressing in terms of complex numbers some geometric properties and constructions. For example, the real numbers form the real line which is identified to the horizontal axis of the complex plane. The complex numbers of absolute value one form the unit circle. The addition of a complex number is a translation in the complex plane, and the multiplication by a complex number is a similarity centered at the origin. The complex conjugation is the reflection symmetry with respect to the real axis. The complex absolute value is a Euclidean norm.
In summary, the complex numbers form a rich structure that is simultaneously an algebraically closed field, a commutative algebra over the reals, and a Euclidean vector space of dimension two.

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  1. V

    Differential of a complex number

    What is d/di(x+iy)?
  2. H

    Writing in polar form a complex number

    Homework Statement Write z = 1 + √3i in polar form Homework Equations z = r (cos\varphi + sin\varphii) The Attempt at a Solution Found the modulus by |z| = √4 = 2 Now I am stuck on this part of finding the argument: Tan-1 (√3) now I am not sure how to go from that to...
  3. T

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    Homework Statement The mill (single phased) is now affected by a load from a resistor. We assume that the turbine can deliver an infinitely large current without affecting the frequency. figure 1 illustrates the load: http://puu.sh/19GGR The voltage over the capacitor can can be...
  4. MarkFL

    MHB A complex number problem that has been vexing me....

    Recently, on another forum, the following problem was posted: Given three distinct complex numbers: $\displaystyle z_1,z_2,z_3$ where: $\displaystyle |z_1|=|z_2|=|z_3|\ne0$ and: $\displaystyle z_1+z_2z_3,z_2+z_1z_3,z_3+z_1z_2$ are all real, then prove: $\displaystyle z_1z_2z_3=1$ I...
  5. T

    The distinct roots of complex number

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  6. A

    Complex Number- Express in magnitude/phase form

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  7. M

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  8. A

    Undefined argument for a complex number

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  9. R

    MHB Complex Number Loci: Proof and Circle Variation with z = 1/(3+it)

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  10. B

    Complex Number RLC Series Parallel Voltage and Current Supply

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  11. S

    Simple complex number question

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  12. U

    What is the Modulus of the Complex Number exp(√i)?

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  13. C

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  14. A

    Complex number method for kinematic equations

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  15. F

    Is [itex]x = - lo{g_2}(x)[/itex] a complex number

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  16. E

    Limit help needed for end of complex number question

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  17. E

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  18. H

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  19. R

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  20. R

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  21. T

    Factoring the equation z^(n)-1=0 where z is a complex number

    Homework Statement Hey, I am attempting to fully factorize z^{n}-1=0 for all integers of n where n does not equal zero, and where z is a complex number in the form a+bi. The question asks to first factorize the equation when n=3,4,5. I know how to factorize when n=3 and 4, but I get stuck at...
  22. C

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  23. C

    Calculating exponent of complex number.

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  24. C

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  25. P

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  26. J

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  27. D

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  28. D

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  29. C

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  30. E

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  31. F

    What is the purpose of <-i> in a complex number subgroup?

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  32. A

    Finding the Polar Form of a Complex Number Using Euler's Relation

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  33. D

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  34. A

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  35. S

    Problem involving square / square root of a complex number

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  36. B

    Interpret the angle of the complex number

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  37. S

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  38. D

    Splitting an exponential complex number into real and imaginary parts

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  39. S

    What is the correct way to find the argument of a complex number?

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  40. U

    Taking a number to a complex number power

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  41. A

    Do complex number have anything like consecutive numbers?

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  42. 3

    Complex number generalizations

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  43. C

    What Determines the Angle of a Complex Number in Polar Form?

    Hi all. Suppose I am looking for the following quantity: \sphericalangle cn, where cn = \frac{sin(\frac{nπ}{2})}{nπ}. cn is a complex number. According to the book, "Signals and Systems" by Edward Kamen 2nd. Ed., \sphericalangle cn = π for n = 3, 7, 11 ... , and cn = 0, for all other n. The...
  44. Saitama

    (Complex number) I have no idea on this

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  45. B

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    Nothing much, I have this: I have studied (myself) about this for many days. And I believe that, for some conditions for a complex ψ,ϕ What are those conditions I mentioned about? And which field of study I should go to see?
  46. D

    Integration and log of a complex number

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  47. G

    Inequality of a complex number

    Homework Statement Suppose that w is a complex number which is not both real and \left\lfloorw\right\rfloor\geq1 (the absolute value of w). Verify that Re[(1-w^{2})^{1/2}+iw]>0. Homework Equations The Attempt at a Solution I attempted to solve this problem by dividing it into...
  48. T

    Understanding Complex Numbers and the cis Formula

    Hi guys, just before i ask this question i would like to let you know that i am a year 11 student, who has decided to study next years Specialist math (highest level of maths) course early to get a head start as i am nervous for next year(year 12.) :) Homework Statement and The first one...
  49. E

    Expressing a complex number as an Exponent

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  50. D

    How many square roots does a complex number have?

    In general, how many square roots does a complex number have?
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