i
"The" imaginary number ๐ i
(also called the imaginary unit)
is defined as the square root of ๐ -1
, i.e., ๐ i=sqrt(-1)
.
Although there are two possible square roots of any number, the square roots of a
negative number cannot be distinguished until one of the two is defined as the imaginary
unit, at which point ๐ +i
and ๐ -i
can then be distinguished. Since either
choice is possible, there is no ambiguity in defining ๐ i
as "the" square root of ๐ -1
.
In the Wolfram Language, the imaginary number is implemented as .
For some reason, engineers and physicists prefer the symbol j
to ๐ i
, probably because the symbol ๐ i
(or ๐ I
)
is commonly used to denote current.
In the novel The Da Vinci Code, the character Robert Langdon jokes that character Sophie Neveu
"believes in the imaginary number ๐ i
because it helps her break code" (Brown 2003, p. 351).
In the movie Proof
(2005), the character Hal Dobbs (played by Jake Gyllenhaal) is a mathematics graduate
student whose rock-and-roll band "plays" a song called "๐ i
." The joke is that when the band "plays" the
song, they remain silent and motionless for several minutes since the song is "imaginary."
In Isaac Asimov's short story "The Imaginary" (1942), eccentric psychologist
Tan Porus explains the behavior of a mysterious species of squid by using imaginary
numbers in the equations which describe its psychology. The anthology Imaginary
Numbers: An Anthology of Marvelous Mathematical Stories, Diversions, Poems, and Musings
(Frucht 2000) includes many other works involving imaginary numbers.
Numbers of the form ๐ iy
, where ๐ y
is a real number, are called imaginary
numbers (or sometimes, for emphasis, purely
imaginary numbers). Numbers of the form ๐ z=x+iy
where ๐ x
and ๐ y
are real numbers
are called complex numbers, and when ๐ z
is used to denote a complex
number, it is sometimes (in older texts) called an "affix."
The square root of ๐ i
is
since
![๐ [1/(sqrt(2))(i+1)]^2=1/2(i^2+2i+1)=i.](https://mathworld.wolfram.com/images/equations/i/NumberedEquation2.svg){kind=link}
This can be immediately derived from the Euler formula with ๐ x=pi/2
,
| ๐ i=e^(ipi/2) |
(3)
|
Amazingly, the principal value of ๐ i^i
is a real number given by
(OEIS A049006; Uhler 1921; Wells 1986, p. 26; Derbyshire 2004, p. 205).
Interestingly, all higher-order power towers have complex values, but the infinite power tower converges to the value
| ๐ i^(i^(ยท^(ยท^ยท))) | ๐ = | ๐ -(W(-lni))/(lni) |
(6)
|
| ๐ Image | ๐ = | ๐ (2i)/piW(-1/2pii) |
(7)
|
| ๐ Image | ๐ approx | ๐ 0.438283+0.3605924i |
(8)
|
(OEIS A077589 and A077590; Macintyre 1966), where ๐ W(x)
is the Lambert W-function, as illustrated above.
The following mathematical joke exhibits the strange way in which mathematicians think. "Rrrrrring. Operator: I'm sorry, the number you have dialed is imaginary.
Please multiply by ๐ i
and dial again." A variant of this joke, actually left on one mathematician's
phone by his son states, "I'm sorry, the number you have dialed is an imaginary
number. Please rotate by ๐ 90 degrees
and try again." Taking this joke one step further gives the "identity"
| ๐ 8รi=infty. |
(9)
|
The double-struck capital letter I, ๐ I
,
is a symbol sometimes used instead of ๐ Z
for the ring of integers.
In contrast, the lower case symbol ๐ i
is used to refer to the imaginary unit ๐ i=sqrt(-1)
.
See also
Complex Number, Imaginary Number, Purely Imaginary Number, Real Number, Surreal Number, Power Tower Explore this topic in the MathWorld classroomRelated Wolfram sites
http://functions.wolfram.com/Constants/I/Explore with Wolfram|Alpha
More things to try:
References
Asimov, I. "The Imaginary." Super Science Stories. Nov. 1942. Reprinted in The Early Asimov, Book One. Del Rey, pp. 246-262, 1986.Brown, D. The Da Vinci Code. New York: Doubleday, 2003.Courant, R. and Robbins, H. What Is Mathematics?: An Elementary Approach to Ideas and Methods, 2nd ed. Oxford, England: Oxford University Press, p. 89, 1996.Derbyshire, J. Prime Obsession: Bernhard Riemann and the Greatest Unsolved Problem in Mathematics. New York: Penguin, 2004.Frucht, W. (Ed.). Imaginary Numbers: An Anthology of Marvelous Mathematical Stories, Diversions, Poems, and Musings, 2nd ed. New York: Wiley, 2000.Nahin, P. J. An Imaginary Tale: The Story of -1. Princeton, NJ: Princeton University Press, 2007.Macintyre, A. J. "Convergence of ๐ i^(i^(ยท^(ยท^ยท)))
." Proc. Amer. Math. Soc. 17, 67, 1966.Mazur, B. Imagining Numbers (Particularly the Square Root of Minus Fifteen). New York: Farrar, Straus and Giroux, 2003.Sloane, N. J. A. Sequences A049006, A077589, and A077590 in "The On-Line Encyclopedia of Integer Sequences."Uhler, S. "On the Numerical Value of ๐ i^i
." Amer. Math. Monthly 28, 114-116, 1921.Wells, D. The Penguin Dictionary of Curious and Interesting Numbers. Middlesex, England: Penguin Books, p. 26, 1986.
Referenced on Wolfram|Alpha
iCite this as:
Weisstein, Eric W. "i." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/i.html