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.

View More On Wikipedia.org
Recent contents Top users
  1. Saitama

    MHB What are the possible values of $x+y$ in this complex number problem?

    Problem: Let $z=x+iy$ satisfy $$z^2=z+|z^2|+\frac{2}{|z|^3}$$then the possible values of $x+y$ is A)$-2^{1/4}$ B)$2^{1/4}$ C)$3^{1/4}$ D)$-5^{1/4}$ Attempt: Substituting $z=x+iy$ is definitely not a good idea, it can be solved by substituting but since this is an exam problem, I believe that...
  2. S

    MHB The sine inverse of a purely complex number

    To prove that sin^{-1}(ix)=2n\pi\pm i log(\sqrt{1+x^2}+x) I can prove sin^{-1}(ix)=2n\pi+ i log(\sqrt{1+x^2}+x) but facing problem to prove sin^{-1}(ix)=2n\pi- i log(\sqrt{1+x^2}+x) Help please
  3. Raerin

    MHB How do I solve complex number z^4+16=0

    How do I solve z^4+16=0 in a+bi form. I don't see how it can be factored so what do I do?
  4. Raerin

    MHB Complex Number Equation: Why Does a+bi=1 Not Give the Final Answer?

    Solve the following equations in the form a +bi. a) z^3-1=0 b) 3z^4+i=1-2i Apparently, the solution for a) is this: z^3=1 z=1 z=a+bi=1 sqrt(a^2+b^2)=1 I don't understand why a+bi=1 is not the final answer. Why do you have to make it into a modulus?
  5. J

    Complex number polynomial, with no root given

    Homework Statement z^3 + (-5+2i)z^2 + (11-5i)z -10+2i =0 has a real root, find all the solutions to this equation. The Attempt at a Solution I have only solved imaginary number polynomials with a given root, but this has no given root, how do I find the real solution? that I can then...
  6. MathematicalPhysicist

    Particles with complex number mass.

    I was thinking in the bus, we have theoretically speaking particles such as tachyons with imaginary number for their mass. These particles if they exist always run at speeds higher than c. My question is has anyone thought of modifying perhaps Lorentz transformations to give us the possiblity...
  7. B

    How can I find the rules for deriving a complex number without a complex root?

    Homework Statement Wolfram gives a step to step solution for \sqrt[3]{-9+46i} → 27+ 54i -36 - 8i → 27+ 54i -36i^2 + 8i^3 = (3+2i)^3 Can you tell me (where to find) the rules of this derivation? Thanks
  8. P

    Find complex number z from equation

    Homework Statement Find complex number z from equation Sinz+cosz=4Homework Equations The Attempt at a Solution I rewrite sinz+cosz=4 in form: \frac{(exp[i*z]-exp[-i*z])}{2i}+\frac{(exp[i*z]+exp[-i*z])}{2}=4 then subsitute t=exp[i*z] So I gain t2(1+i)+8ti-1+i=0,I think i can rewrite it in form...
  9. J

    Digital signal processing - conjugate reciprocal of a complex number

    Digital signal processing -- conjugate reciprocal of a complex number what is the difference between conjugate of a complex number and conjugate reciprocal of a complex number i am asking with reference to z transform...Thanyou
  10. Seydlitz

    Find a complex number z which satisfies a particular condition

    Hello guys! Homework Statement The question is like this: If ##z=\frac{a}{b}## and ##\frac{1}{a+b}=\frac{1}{a}+\frac{1}{b}##, find ##z##. The Attempt at a Solution This question is challenging for me because I don't know exactly where to start. The latter condition stated, the sum of...
  11. T

    Finding a complex number from an equation

    Homework Statement Find all complex numbers z such that z^6 = -64 Homework Equations I tried it in two ways, once with the sum of cubes (a + b)(a^2 - ab + b^2) as well as turning it into polar form and attempting it that way, z = re^(iθ) The Attempt at a Solution I completely couldn't...
  12. S

    Optimizing Accuracy: Complex Number Calculations for RL Circuit

    Homework Statement Calculate Z1=5+j10 Z2=10+j8 Z3=10+J5 RL=40 V=100 VTH=VX(Z2/Z1+Z2) ZTH=Z3+(Z1Z2/Z1+Z2) I=VTH/(ZTH+RL) IL=? Homework Equations My question is what calculation method is more accurate: First to convert complex numbers in polar forms, and then calculate or calculate complex...
  13. A

    MHB Complex Number Problems in Applied Maths

    This is a thread for complex number problems in applied mathematics. 1. Prove that: 1 + cos x + cos 2x + ...cos (n - 1)x = {1 - cos x + cos (n - 1)x - cos nx} / 2 (1 - cos x) = 1/2 + [{sin (n - 1/2)x}/2sin (x/2)]2. If a = cos x + i sin x, b = cos y + i sin y, c = cos z +...
  14. N

    MHB Elementary Complex Number Problems

    1. $|\frac{i(2+i)^3}{(1-i)^2}|$ Is there any way to complete this without expanding the numerator?2. what is the argument of $ -2\sqrt{3}-2i$ I got $r=4$ then $\cos\theta_1 $ $= \frac{-2}{\sqrt{3}{4}}$ and $-2=4\sin\theta_2$ $\theta_1 = \pi - \frac{\pi}{6} = 5\frac{\pi}{6}$ and $\theta_2 =...
  15. Petrus

    MHB Differential equation with eigenvector (complex number)

    Hello MHB, Solve the following system of linear differential equation f'=f-g g'=f+g with bounded limit f(0)=0, g(0)=1 could anyone check if My answer is correct? Just to make sure I understand correctly! ps we get \lambda=1-i and \lambda=1+i Regards, |\pi\rangle
  16. Raerin

    MHB How to graph complex number fractions

    If I'm graphing (3+4i)/25, would the x-point be 3/25 and the y-point be 4i/25?
  17. B

    How Do Complex Numbers Extend the Real Number System?

    I have for a while been trying to really understand the notion of a complex number and the construction of the complex number system. My knowledge of mathematics so far is very limited and spans mostly linear algebra (no pun intended), discrete mathematics (where I have yet to see complex...
  18. S

    Principal root of a complex number

    Homework Statement I am doing a problem of a contour integral where the f(z) is z1/2. I can do most of it, but it asks specifically for the principal root. I have been having troubles finding definitively what the principal root is. Anyplace it appears online it is vague, my book doesn't...
  19. C

    Proving that z1/z2 is purely imaginary: A Complex Number Problem

    Two complex numbers z1 and z2 are taken such that |z1+z2|=|z1-z2|, and z2 not equal to zero. Prove that z1/z2 is purely imaginary (has no real parts). I started by taking z1=a+bi, and z2=c+di, then z1+z2=a+c+i(b+d) and z1-z2=a-c+i(b-d) |z1+z2|=√(a+c)^2 + (b+d)^2 |z1-z2|=√(a-c)^2 + (b-d)^2...
  20. M

    Express the following in the form of a Complex Number

    Homework Statement For my waves class, I have to do this problem. I've previously completed a question like this except there was no phase constant (∏/4) in that question. Express the following in the form x = Re [Ae^i\alphae^iwt x=cos(wt + ∏/4) - sin(wt) Homework Equations euler's...
  21. B

    Simple Complex Number Question (Roots of 1)

    Homework Statement So on one of my homework assignments I had to find the complex fifth roots of one. Because of Euler's equation the arguments are simply 0, 2pi/5,4pi/5,6pi/5,and 8pi/5. It is easy to see that (e^i2pi/5)^5 = (e^i2pi) = cos(2pi) + isin(2pi) = 1 + 0 = 1 but on my paper I wrote...
  22. C

    Engineering Complex number help (AC circuit)

    Homework Statement Use the supernode technique to find I0 in the circuit Homework Equations nodal analysis, AC analysis The Attempt at a Solution Taking the left essential node as V1 and the right essential node as V2, V1 + 12V = V2 and -V1/(1-1j)Ω +...
  23. B

    Simple Complex Number Review Question

    Homework Statement z=1 + e^(iθ) calculate z^2 and lzl^2 Homework Equations The Attempt at a Solution for z^2 (1+e^(iθ))(1+e^(iθ)) = 1 + 2e^(iθ) + e^(i2θ).. is that the final answer? i expanded it into cosines and sines as well but that doesn't simplify anymore i don't...
  24. C

    Comp Sci How can I fix errors in my Java Complex Number Class Homework?

    Homework Statement Create a class which contains the following: a)instance variables for the complex number. For x+yi, x and y are the variables. b)constructor to initialize these variables. c)methods to return the real and imaginary parts of the complex number d)method to compute the...
  25. P

    Is {(-2)^5}^(1/5) a complex number ?

    is E = {(-2)^5}^(1/5) a complex number ? my cal gives E=(-2), but this gives 1.61+1.78i http://www.wolframalpha.com/input/?i=%28%28-2%29^%285%29%29^1%2F5 someone please explain this..
  26. B

    Understanding the Complex Number Paradox: Exploring Its Origins and Solutions

    Hi, How can we explain this paradox: Thanks in advance.
  27. denjay

    Have a function return a complex number in C?

    So I wrote a program that has one main function call two other functions in an equation and then calculates a value. The problem is the numbers I need returned from those two other functions need to stay in their complex form. Using double() I get an error when trying to return that. Is there...
  28. A

    Finding Solutions for Complex Numbers: A Case Study with ω10+ω5+3 = 0

    complex number ?? Homework Statement Let ω be the solution to the equation x2+x+1=0 Get the value of ω10+ω5+3=Homework Equations complex numbers?The Attempt at a Solution When I try solving the first equation I hit a complex number which is making me think I am wrong. (x+1/2)2=-3/4 Again if...
  29. K

    MHB Complex Number Help: Find x+yi for z1,z1z2,z1/z2

    z1 = −11+2 i and z2 = −1+13 i are given I need to find the following in the form x + y i. conjugate of z1 = conjugate of z1z2= z1/z2 = a) how would i go about it and b) can someone provide the solutions to the questions if possible
  30. M

    Complex Number Inequality: Solving for Locus of z = (x + iy) | Homework Help

    Homework Statement The locus of z satisfying the inequality (z + 2 i) / (2 z + i) < 1 where z = (x + i y) Homework Equations none The Attempt at a Solution After putting the value of z = (x + i y) , I tried to rationalize it but now I am stuck. can somebody explain how to solve it. The...
  31. Nero26

    What is the difference between 25i*20i/5i and 25i*20i/(5i) in CMPLX mode?

    Hi all, This is a little problem I'm unable to figure out, in CMPLX mode of my calculator 25i*20i/5i=-100i But 25i*20i/(5i) = 100i, Here i=sqrt(-1). What is the difference between these two expressions? Thanks for your help.
  32. T

    What is the equation of the circle for |(z+1)/(z-1)|=3?

    Hello! Few weeks ago we started learning complex number. And i have some questions about that because not all i understand and also don't know if my solution is good :) Also don't know if my name of topic is good :) if something goes wrong just say. I'd be grateful My task: |(z+1)/(z-1)|=3 need...
  33. T

    Solving for the roots of unity of a complex number

    Homework Statement Find both square roots of the following number: -15-8i Homework Equations De Moivre's thm: rn(cos(n\sigma) + i sin(n\sigma) The Attempt at a Solution So to use De Moivre's I have to find the modulus and the argument. actually in this question r =...
  34. T

    Absolute value squared of complex number?

    I'm given 1-a\cdot e^{-i\cdot 2 \pi f}. The squared absolute value apparently is |1-a\cdot e^{-i\cdot 2 \pi f}|^2=1+a^2-2acos(2 \pi f). Sadly the awnser doesn't show the steps of this derivation. I have tried many times to derive it my self but have not been able to do so. I feel like i...
  35. T

    Write the polar form of a complex number in the form of a+ib

    Homework Statement 4{cos(13∏/6)+isin(13∏/6)} = 4((√3/2)+(i/2)) = 2√3+2i Homework Equations The Attempt at a Solution This is an example from my textbook. The part which I do not understand is how to convert the cos and sin of radians into those fractions. Any help is greatly appreciated.
  36. I

    Solving Eigenvalues: Complex Numbers Solutions

    I have solutions for eigenvalues to be λ1=i-1 = √2 e^i(3∏/4) and λ2=i+1 =√2 e^i(∏/4) How do you go from the i-1 to the next bit for both? Thanks
  37. T

    Complex Number Orthonormal Basis.

    Find an orthonormal basis for P2(ℂ) with respect to the inner product: <p(x),q(x)> = p(0)q(0) + p(i)q(i) + p(2i)q(2i) the q(x) functions are suppose to be the conjugates I just don't know how to write it on the computer Attempt: This is where I'm having trouble. So usually I'm given...
  38. S

    MHB Principal value of complex number

    Find all the values of (\sqrt{3}+i)^{1/6}. What is its principle value?I have doubt about the second part. We have heard about the principal value of the amplitude of a complex number. But here the principal value of the complex number itself is asked for. Please help
  39. S

    Complex number proof about z (single or double overlined/conjugate) = z.

    Homework Statement The problem along with its solution are attached as TheProblemAndSolution.jpg. This post's focus is on part (iii), specifically. Homework Equations z (overlined) = z. (according to book) z (double overlined) = z. (according to me) The Attempt at a Solution I...
  40. B

    Can We Assume Equality of Complex Numbers Based on Their Norm?

    This question might be elementary: If the norm of two complex numbers is equal, can we deduce that the two complex numbers are equal. I know in ℝ we can just look at this as an absolute value, but what about ℂ? So mainly: let |z| = |w|*|r| can we say → z = w*r ? Thanks
  41. J

    On solving for a variable in the magnitude of a complex number

    All, I've been beating my head up on this equation, so I thought I'd try here to see if someone could help me. In the equation (sqrt{32}(2x-d))^-4 = (-d/2 - 1/2 )^2 + sqrt{(1+d)^2 + d/4}/4 Where the right hand side is my attempt to solve for d out of the magnitude |z| of a complex...
  42. S

    Is ℝ a Subset of ℂ? Understanding Complex Number Arithmetic and Isomorphism

    Homework Statement A textbook of mine asserts that ℝ is a subset of ℂ. The motivation for this is drawn by defining complex addition and multiplication and then showing that these operations on complex numbers of the form (x,0), with x an element of ℝ, are isomorphic to the field ℝ witih...
  43. P

    What should be the influence of the imaginary part on a complex number?

    Hi, What should be the influence of the imaginary part on a complex number? I am asking because I am running a simulation model where the input is a complex number; say z=a+ib Now the problem is that I get the same result when I put a=0 and give some high value to b, as when I do the...
  44. I

    How do i find the principal form of this complex number

    z= (10-j+elogj)2 I tried expanding but it just made it more complicated. help please!
  45. G

    Find Matrix B for Complex Number T(z)

    Homework Statement Let w = a + bi be a complex number and let T : C -> C be defined by T(z) = w · z. Considering C as a vector space over R, find the matrix B representing T relative to the basis {1, i} of C. Homework Equations The Attempt at a Solution I think you use...
  46. T

    Complex number sum that should be easy

    Hey, So I have a sum of complex numbers that really should be easy, but I'm not getting the right solution. It is with respct to using the Gram Schmidt process U1 = (i, -1, i) U2 = (1,1,0) So I perform the Gram Schmidt with U1 being my initial vector selection and I get: V2 =...
  47. C

    Complex number calculation

    Homework Statement Evaluate {(1+i)^(1-i)} and describe the set{1^x} when x is a real number, distinguish between the cases when x is rational and when x is rational. for now considering the complex number. 2. The attempt at a solution i don't know how to start with,for firest part i just...
  48. L

    Proving the Relationship between Complex Numbers and Trigonometric Functions

    Homework Statement Given that, x+yi=3/[2+cos θ+i(sin θ)] , prove that x^2+y^2=4x-3 Homework Equations r^2=x^2+y^2 The Attempt at a Solution since we know that x=r sinθ , y=r cosθ, i multiply r on the right hand side to equal 3r/[2r+x+yi], then multiply its comjugate (2r+x)-yi to...
  49. 5

    Expressing geometrically the nth roots of a complex number on a circle

    Homework Statement Let z \in \mathbb{C}. Prove that z^{1/n} can be expressed geometrically as n equally spaced points on the circle x^2 + y^2 = |z|^2, where |z|=|a+bi|=\sqrt{a^2 + b^2}, the modulus of z. Homework Equations // The Attempt at a Solution My problem is that I am...
  50. M

    Complex number equation and roots of unity

    I have some math problems What is the solution to this equation : z dash(complex conjugate) = z^3 Z is complex number I try to multiply both sides by Z in the left i get Z dash Z => |Z| but i don't see the solution ---- P is primitive 9th root of unity. Calculate the sum 1 + 2P...
Back
Top