2i

$-1+ i$
−1+i
命名
名稱	−1+i
性質
高斯整數分解	<img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/92da8b59d7eb5dd2cad46c92e66f8824572d7818" class="mwe-math-fallback-image-inline mw-invert skin-invert" aria-hidden="true" style="vertical-align: -0.838ex; width:10.257ex; height:2.843ex;" alt="{\displaystyle i\times \left(1+i\right)}">
絕對值	<img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/b4afc1e27d418021bf10898eb44a7f5f315735ff" class="mwe-math-fallback-image-inline mw-invert skin-invert" aria-hidden="true" style="vertical-align: -0.671ex; width:3.098ex; height:3.009ex;" alt="{\displaystyle {\sqrt {2}}}">
表示方式
值	<img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/4f2fac00b62573b331aaa71fcfe11b62ea12b697" class="mwe-math-fallback-image-inline mw-invert skin-invert" aria-hidden="true" style="vertical-align: -0.505ex; width:6.613ex; height:2.343ex;" alt="{\displaystyle -1+i}">
代數形式	<img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/44c1c03511ea8129eb06eaee17dedbb46ec4aff8" class="mwe-math-fallback-image-inline mw-invert skin-invert" aria-hidden="true" style="vertical-align: -0.838ex; width:5.709ex; height:3.009ex;" alt="{\displaystyle {\sqrt {-2i}}}">
十进制	−1+i
2i进制	113.2
	查; 论; 编;

$2 i$
2i
數表 — 高斯整數; << −3i −2i −i 0 i 2i 3i >>
	; 在高斯平面上的位置
命名
名稱	2i; 負四的平方根; 二虛數單位
性質
高斯整數分解
絕對值	2
以此為根的多項式或函數
表示方式
值	2倍虛數單位;
代數形式	;
十进制	2i
-1+i进制	1110100
2i进制	10
	查; 论; 编;

$2i$ 是在虛數軸正向距離原點兩個單位的純虛數，屬於高斯整數^[2]^:13，為虛數單位的兩倍^[2]^:12，同時也是負四的平方根^[2]^:12^[3]^[4]^:ix^[5]^[6]^[7]^[8]，是方程式 $x^{2}+4=0$ 的正虛根^[3]^[9]^:10。日常生活中通常不會用 $2i$ 來計量事物，例如無法具體地描述何謂 $2i$ 個人，邏輯上 $2i$ 個人並沒有意義。^[10]部分書籍或教科書偶爾會使用 $2i$ 來做虛數的例子或題目。^[11]

在高斯平面上，與 $2i$ 相鄰的高斯整數有 $i$ 和 $3i$ （上下相鄰；純虛數）以及 $2i-1$ 和 $2i+1$ （左右相鄰），然而複數不具備有序性，即無法判斷 $2i$ 與 $3i$ 間的大小關係，因此無法定義 $i$ 與 $3i$ 何者為 $2i$ 的前一個虛數、何者為 $2i$ 的下一個虛數。

−1+3i	$3 i$	1+3i
$-1+2 i$	$2 i$	$1+2 i$
$-1+ i$	$i$	$1+ i$
與 $2i$ 相鄰的高斯整數示意圖

性質

$2i$ 不屬於實數，是一個純虛數，同時也是複數位於複數平面，其實部為0、虛部為2^[12]，輻角為90度（ ${\frac {\pi }{2}}$ 弧度）^[13]，其也能表達為 $2e^{i\pi /2}$ ^[14]^:7或 $2\left(\cos {\frac {\pi }{2}}+i\sin {\frac {\pi }{2}}\right)$ ^[15]。
$2i$ 是一個高斯整數^[16]^[17]^[18]，高斯整數分解為 $(1+i)^{2}$ ^[19]^:711，或 $(1+i)(1+i)$ ^[20]^:433，其中， $1+ i$ 為 $2 i$ 的高斯質因數。^[19]^:711^[21]^[22]^:247
所有複數的可以表達為 $2i$ 之冪的線性組合。^[23]換句話說若進位制以 $2i$ 為底數，則可獨一無二地表示全體複數^[24]。該進制稱為2i進制，由高德納於1955年發現。^[25]
複數的虛數部可以定義為複數與其共軛複數之差除以 $2i$ 的商，^[26]換言之，則 $z-z^{*}=2i\,Im(z)$ 。^[2]^:32
$Im(z)={\frac {z-z^{*}}{2i}}$
正弦函數可以定義為純虛指數函數與其倒數之差除以 $2i$ 的商。^[27]^[28]^:41^[2]^:64
$\sin(z)={\frac {e^{iz}-e^{-iz}}{2i}}$
$2i$ 等於最小的質數和虛數單位的積，即 $p_{_{1}}\times i=2i$ ^[15]，其中 $p_{n}$ 為第 $n$ 個質數。
虛數單位和虛數單位的倒數相差 $2i$ 。
任意數與 $2i$ 相乘的意義為模放大兩倍並在複平面上以原點為中心逆時針旋轉90度。^[14]^:7^[2]^:20-21

$2 i$ 的冪

$2i$ 的前幾次冪為 $1、 2 i 、 -4、 -8 i 、 16、 32 i 、 -64$ ...^[29]，其會在實部和虛部交錯變換，其單位會在 $1、 i 、-1、- i$ 中變化。其中，實數項為−4的冪^[30] ，虛數的正值項為16的冪的2倍^[31] 、虛數的負值項為16的冪的−8倍^[32]，因此這種特性使得 $2i$ 作為底數可以不將複數表達為實部與虛部就能表示全體複數，^[29]並且有研究以此特性設計複數運算電路^[33]。

$2 i$ 的平方根

$2i$ 的平方根正好是實數單位與虛數單位的和，即 ${\sqrt {2i}}=1+i$ ^[28]^:3，反過來說 $2i$ 正好是實數單位與虛數單位相加的平方， $(1+i)^{2}=2i$ ^[34]^[35]^:388。若考慮平方根的正負，則 $1+ i$ 和 $-1- i$ 都是 $2i$ 的平方根。

相鄰的高斯整數

−1+3i	$3 i$	1+3i
$-1+2 i$	$2 i$	$1+2 i$
$-1+ i$	$i$	$1+ i$
與 $2i$ 相鄰的高斯整數示意圖

$3 i$

$3i$ 是在虛數軸正向距離原點3個單位的純虛數，是虛數單位的三倍，同時也是負九（−9）的平方根，與純虛數 $2 i$ 和 $4 i$ 相鄰、並與高斯整數 $-1+3 i$ 和 $1+3 i$ 相鄰。

$3i$ 的為虛數單位與質數3的乘積，其中，3也是高斯質數，因此 $3i$ 的高斯整數分解為 $i\times 3$ 。

$-1+2 i$

$-1+2i$ 是在虛數軸正向距離原點 ${\sqrt {5}}$ 個單位的高斯整數，其實部為負一、虛部為 $2 i$ ，與純虛數 $2 i$ 相鄰、並與高斯整數 $-1+3 i$ 、 $-1+ i$ 和 $-2+2 i$ 相鄰。

$-1+2i$ 不是高斯質數，其具有高斯質因數 $2+i$ 。 $-1+2i$ 的高斯整數分解為 $i\times \left(2+i\right)$ 。

$1+2 i$

$1+2i$ 是一個高斯質數 ^[37]，在虛數軸正向距離原點 ${\sqrt {5}}$ 個單位，其實部為一、虛部為 $2 i$ ，與純虛數 $2 i$ 相鄰、並與高斯整數 $1+3 i$ 、 $1+ i$ 和 $3+2 i$ 相鄰。

參見

參考文獻

^ What is 2i equal to?. geeksforgeeks.org. [2022-09-15]. （原始内容存档于2022-09-15）.
^ ^2.0 ^2.1 ^2.2 ^2.3 ^2.4 ^2.5 Mokhithi, Mashudu and Shock, Jonathan, Introduction to Complex Numbers (PDF), Jonathan Shock, 2020 [2022-06-23], （原始内容存档 (PDF)于2022-07-04）
^ ^3.0 ^3.1 Complex or Imaginary Numbers. themathpage.com. [2022-06-23]. （原始内容存档于2022-07-13）.
^ Hart, P. The Book of Imaginary Indians: Ancient Traditions and Modern Caricatures in the White Man's Quest for Meaning. iUniverse. 2008 [2022-06-23]. ISBN 9780595435036. （原始内容存档于2022-08-20）.
^ A brief history to imaginary numbers. sciencefocus.com. 2019-06-21 [2022-06-23]. （原始内容存档于2022-07-12）.
^ Williams, Travis D. King Lear, Without the Mathematics: From Reading Mathematics to Reading Mathematically. The Palgrave Handbook of Literature and Mathematics (Springer). 2021: 399–418.
^ Neuman, Yrsa. Moore’s Paradox and Limits in Language Use. Wittgenstein and the Limits of Language (Routledge). 2019: 159–171.
^ Parker, Barry. Fractals. Chaos in the Cosmos (Springer). 1996: 129–154.
^ Complex Numbers and the Complex Exponential (PDF). people.math.wisc.edu. [2022-06-23]. （原始内容存档 (PDF)于2022-01-21）.
^ Abubakr, Mohammed. On logical extension of algebraic division. arXiv preprint arXiv:1101.2798. 2011 [2022-06-23]. doi:10.48550/ARXIV.1101.2798. （原始内容存档于2022-07-04）.
^ 中學數學實用詞典, 九章出版社, 孫文先, P.22 中的示範其解為2i, ISBN 957-603-093-5
^ Complex Numbers 2i (PDF). ichthyosapiens.com. [2022-06-23]. （原始内容存档 (PDF)于2017-08-29）.
^ All Complex Number Solutions z=2i. mathway.com. [2022-06-23]. （原始内容存档于2022-06-25）.
^ ^14.0 ^14.1 Jeremy Orloff. Complex algebra and the complex plane (PDF). math.mit.edu. [2022-06-23]. （原始内容存档 (PDF)于2021-11-03）.
^ ^15.0 ^15.1 Wolfram, Stephen. "(smallest prime number) * (imaginary unit)". from Wolfram Alpha: Computational Knowledge Engine, Wolfram Research （英语）.
^ C. F. Gauss, Theoria residuorum biquadraticorum. Commentatio secunda., Comm. Soc. Reg. Sci. Gottingen 7 (1832) 1-34; reprinted in Werke, Georg Olms Verlag, Hildesheim, 1973, pp. 93-148.
^ 从数到环：环论的早期历史（页面存档备份，存于互联网档案馆），由Israel Kleiner所作 (Elem. Math. 53 (1998) 18 – 35)
^ Ribenboim, Paulo, The New Book of Prime Number Records, New York: Springer, 1996, ISBN 0-387-94457-5
^ ^19.0 ^19.1 Banerjee, Ashmi and Mukherjee, Shaunak and Datta, Somjit and Majumder, Subhashis. Computational search for Gaussian perfect integers. 2015 International Conference on Control Communication & Computing India (ICCC) (IEEE). 2015: 710–715 [2022-08-15]. （原始内容存档于2022-08-15）.
^ Briggs, WE. Factorization in Integral Domains. The Mathematics Teacher (National Council of Teachers of Mathematics). 1966, 59 (5): 432–436.
^ Kerins, Bowen. Delving Deeper: Gauss, Pythagoras, and Heron. The Mathematics Teacher (National Council of Teachers of Mathematics). 2003, 96 (5): 350–357.
^ Gallian, Joseph A and Jungreis, Douglas S. Homomorphisms from Z_m[i] into Z_n[i] and Z_m[ρ] into Z_n[ρ], Where i² + 1 = 0 and ρ² + ρ + 1 = 0. The American Mathematical Monthly (Taylor & Francis). 1988, 95 (3): 247–249.
^ Blest, David C and Jamil, Tariq. Division in a binary representation for complex numbers. International Journal of Mathematical Education in Science and Technology (Taylor & Francis). 2003, 34 (4): 561–574.
^ Donald Knuth. An imaginary number system. Communications of the ACM. April 1960, 3 (4).
^ D. Knuth. The Art of Computer Programming. Volume 2, 3rd Edition. Addison-Wesley. pp. 205, "Positional Number Systems"
^ Complex Numbers (PDF), hawaii.edu, [2022-06-23], （原始内容存档 (PDF)于2022-06-26）
^ Weisstein, Eric W. (编). Sine. at MathWorld--A Wolfram Web Resource. Wolfram Research, Inc. （英语）.
^ ^28.0 ^28.1 ^28.2 Bak, Joseph and Newman, Donald J and Newman, Donald J, Complex analysis (PDF) 8, Springer, 2010 [2022-06-23], （原始内容存档 (PDF)于2022-06-25）
^ ^29.0 ^29.1 Robert Braunwart. Negative and Imaginary Radices. School Science and Mathematics. 1965-04, 65 (4): 292–295 [2022-06-23]. doi:10.1111/j.1949-8594.1965.tb13422.x. （原始内容存档于2022-06-27）（英语）.
^ Sloane, N.J.A. (编). Sequence A262710 (Powers of -4). The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
^ Sloane, N.J.A. (编). Sequence A013776 (a(n) = a(n) = 2^(4*n+1)). The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
^ Sloane, N.J.A. (编). Sequence A013777 (a(n) = 2^(4*n + 3)). The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
^ Sarkar, Souradip and Gomony, Manil Dev. Quater-imaginary base for complex number arithmetic circuits. 2018 Design, Automation & Test in Europe Conference & Exhibition (DATE) (IEEE). 2018: 1481–1483 [2022-08-15]. （原始内容存档于2022-08-20）.
^ Dujella, Andrej. The problem of Diophantus and Davenport for Gaussian integer. Glasnik Matematicki (HRVATSKO MATEMATICKO DRUSTVO). 1997, 32: 1–10.
^ Collins, George E. A fast Euclidean algorithm for Gaussian integers. Journal of Symbolic Computation (Elsevier). 2002, 33 (4): 385–392.
^ ^36.0 ^36.1 Penney, Walter. A``Binary System for Complex Numbers (PDF). J. ACM. 1965, 12 (2): 247–248 [2022-06-23]. （原始内容存档 (PDF)于2022-07-04）.
^ ^37.0 ^37.1 Sven Simon. List with Gaussian primes (extended) of A103431/A103432. The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. [2023-12-29]. （原始内容存档于2023-12-29）.
^ ^38.0 ^38.1 Gilbert, William J. Fractal geometry derived from complex bases (PDF). The Mathematical Intelligencer (Springer). 1982, 4 (2): 78–86 [2022-06-23]. （原始内容存档 (PDF)于2022-01-02）.
^ arg(-1+i). from Wolfram Alpha: Computational Knowledge Engine, Wolfram Research. [2023-12-29]. （原始内容存档于2023-12-29）.
^ Gilbert, William J. Arithmetic in complex bases. Mathematics Magazine (Taylor & Francis). 1984, 57 (2): 77–81.
^ Gilbert, William J. The fractal dimension of sets derived from complex bases (PDF). Canadian mathematical bulletin (Cambridge University Press). 1986, 29 (4): 495–500 [2022-08-20]. （原始内容存档 (PDF)于2022-08-20）.

[1] What is 2i equal to?. geeksforgeeks.org. [2022-09-15]. （原始内容存档于2022-09-15）.

[article_mokhithi2020introduction-2] 2.0 ^2.1 ^2.2 ^2.3 ^2.4 ^2.5 Mokhithi, Mashudu and Shock, Jonathan, Introduction to Complex Numbers (PDF), Jonathan Shock, 2020 [2022-06-23], （原始内容存档 (PDF)于2022-07-04）

[themathpage-3] 3.0 ^3.1 Complex or Imaginary Numbers. themathpage.com. [2022-06-23]. （原始内容存档于2022-07-13）.

[bookhart2008book-4] Hart, P. The Book of Imaginary Indians: Ancient Traditions and Modern Caricatures in the White Man's Quest for Meaning. iUniverse. 2008 [2022-06-23]. ISBN 9780595435036. （原始内容存档于2022-08-20）.

[5] A brief history to imaginary numbers. sciencefocus.com. 2019-06-21 [2022-06-23]. （原始内容存档于2022-07-12）.

[incollection_williams2021king-6] Williams, Travis D. King Lear, Without the Mathematics: From Reading Mathematics to Reading Mathematically. The Palgrave Handbook of Literature and Mathematics (Springer). 2021: 399–418.

[incollection_neuman2019moore-7] Neuman, Yrsa. Moore’s Paradox and Limits in Language Use. Wittgenstein and the Limits of Language (Routledge). 2019: 159–171.

[incollection_parker1996fractals-8] Parker, Barry. Fractals. Chaos in the Cosmos (Springer). 1996: 129–154.

[9] Complex Numbers and the Complex Exponential (PDF). people.math.wisc.edu. [2022-06-23]. （原始内容存档 (PDF)于2022-01-21）.

[article_abubakr2011logical-10] Abubakr, Mohammed. On logical extension of algebraic division. arXiv preprint arXiv:1101.2798. 2011 [2022-06-23]. doi:10.48550/ARXIV.1101.2798. （原始内容存档于2022-07-04）.

[11] 中學數學實用詞典, 九章出版社, 孫文先, P.22 中的示範其解為2i, ISBN 957-603-093-5

[12] Complex Numbers 2i (PDF). ichthyosapiens.com. [2022-06-23]. （原始内容存档 (PDF)于2017-08-29）.

[13] All Complex Number Solutions z=2i. mathway.com. [2022-06-23]. （原始内容存档于2022-06-25）.

[Topic_1_Notes_Jeremy_Orloff-14] 14.0 ^14.1 Jeremy Orloff. Complex algebra and the complex plane (PDF). math.mit.edu. [2022-06-23]. （原始内容存档 (PDF)于2021-11-03）.

[(smallest_prime_number)_*_(imaginary_unit)-15] 15.0 ^15.1 Wolfram, Stephen. "(smallest prime number) * (imaginary unit)". from Wolfram Alpha: Computational Knowledge Engine, Wolfram Research （英语）.

[16] C. F. Gauss, Theoria residuorum biquadraticorum. Commentatio secunda., Comm. Soc. Reg. Sci. Gottingen 7 (1832) 1-34; reprinted in Werke, Georg Olms Verlag, Hildesheim, 1973, pp. 93-148.

[17] 从数到环：环论的早期历史（页面存档备份，存于互联网档案馆），由Israel Kleiner所作 (Elem. Math. 53 (1998) 18 – 35)

[18] Ribenboim, Paulo, The New Book of Prime Number Records, New York: Springer, 1996, ISBN 0-387-94457-5

[inproceedings_banerjee2015computational-19] 19.0 ^19.1 Banerjee, Ashmi and Mukherjee, Shaunak and Datta, Somjit and Majumder, Subhashis. Computational search for Gaussian perfect integers. 2015 International Conference on Control Communication & Computing India (ICCC) (IEEE). 2015: 710–715 [2022-08-15]. （原始内容存档于2022-08-15）.

[article_briggs1966factorization-20] Briggs, WE. Factorization in Integral Domains. The Mathematics Teacher (National Council of Teachers of Mathematics). 1966, 59 (5): 432–436.

[article_kerins2003delving-21] Kerins, Bowen. Delving Deeper: Gauss, Pythagoras, and Heron. The Mathematics Teacher (National Council of Teachers of Mathematics). 2003, 96 (5): 350–357.

[article_gallian1988homomorphisms-22] Gallian, Joseph A and Jungreis, Douglas S. Homomorphisms from Z_m[i] into Z_n[i] and Z_m[ρ] into Z_n[ρ], Where i² + 1 = 0 and ρ² + ρ + 1 = 0. The American Mathematical Monthly (Taylor & Francis). 1988, 95 (3): 247–249.

[article_blest2003division-23] Blest, David C and Jamil, Tariq. Division in a binary representation for complex numbers. International Journal of Mathematical Education in Science and Technology (Taylor & Francis). 2003, 34 (4): 561–574.

[knuth1960-24] Donald Knuth. An imaginary number system. Communications of the ACM. April 1960, 3 (4).

[25] D. Knuth. The Art of Computer Programming. Volume 2, 3rd Edition. Addison-Wesley. pp. 205, "Positional Number Systems"

[26] Complex Numbers (PDF), hawaii.edu, [2022-06-23], （原始内容存档 (PDF)于2022-06-26）

[27] Weisstein, Eric W. (编). Sine. at MathWorld--A Wolfram Web Resource. Wolfram Research, Inc. （英语）.

[bookbak2010complex-28] 28.0 ^28.1 ^28.2 Bak, Joseph and Newman, Donald J and Newman, Donald J, Complex analysis (PDF) 8, Springer, 2010 [2022-06-23], （原始内容存档 (PDF)于2022-06-25）

[10.1111/j.1949-8594.1965.tb13422.x-29] 29.0 ^29.1 Robert Braunwart. Negative and Imaginary Radices. School Science and Mathematics. 1965-04, 65 (4): 292–295 [2022-06-23]. doi:10.1111/j.1949-8594.1965.tb13422.x. （原始内容存档于2022-06-27）（英语）.

[30] Sloane, N.J.A. (编). Sequence A262710 (Powers of -4). The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.

[31] Sloane, N.J.A. (编). Sequence A013776 (a(n) = a(n) = 2^(4*n+1)). The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.

[32] Sloane, N.J.A. (编). Sequence A013777 (a(n) = 2^(4*n + 3)). The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.

[inproceedings_sarkar2018quater-33] Sarkar, Souradip and Gomony, Manil Dev. Quater-imaginary base for complex number arithmetic circuits. 2018 Design, Automation & Test in Europe Conference & Exhibition (DATE) (IEEE). 2018: 1481–1483 [2022-08-15]. （原始内容存档于2022-08-20）.

[article_dujella1997problem-34] Dujella, Andrej. The problem of Diophantus and Davenport for Gaussian integer. Glasnik Matematicki (HRVATSKO MATEMATICKO DRUSTVO). 1997, 32: 1–10.

[article_collins2002fast-35] Collins, George E. A fast Euclidean algorithm for Gaussian integers. Journal of Symbolic Computation (Elsevier). 2002, 33 (4): 385–392.

[article_penney1965binary-36] 36.0 ^36.1 Penney, Walter. A``Binary System for Complex Numbers (PDF). J. ACM. 1965, 12 (2): 247–248 [2022-06-23]. （原始内容存档 (PDF)于2022-07-04）.

[OEIS_A103431/A103432-37] 37.0 ^37.1 Sven Simon. List with Gaussian primes (extended) of A103431/A103432. The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. [2023-12-29]. （原始内容存档于2023-12-29）.

[article_gilbert1982fractal-38] 38.0 ^38.1 Gilbert, William J. Fractal geometry derived from complex bases (PDF). The Mathematical Intelligencer (Springer). 1982, 4 (2): 78–86 [2022-06-23]. （原始内容存档 (PDF)于2022-01-02）.

[39] rg(-1+i). from Wolfram Alpha: Computational Knowledge Engine, Wolfram Research. [2023-12-29]. （原始内容存档于2023-12-29）.

[article_gilbert1984arithmetic-40] Gilbert, William J. Arithmetic in complex bases. Mathematics Magazine (Taylor & Francis). 1984, 57 (2): 77–81.

[article_gilbert1986fractal-41] Gilbert, William J. The fractal dimension of sets derived from complex bases (PDF). Canadian mathematical bulletin (Cambridge University Press). 1986, 29 (4): 495–500 [2022-08-20]. （原始内容存档 (PDF)于2022-08-20）.

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高斯整數導航
			↑
			$2 i$
		$-1+ i$	$i$	$1+ i$
←	−2	−1	0	1	2	→
		$-1- i$	$- i$	$1- i$
			$-2 i$
			↓

十進制	二進制	2i進制	$-1+ i$ 進制	$-2+ i$ 進制
0	0	0	0	0
1	1	1	1	1
2	10	2	1100	2
−1	−1	103	11101	144
−2	−10	102	11100	143
$i$	$i$	10.2	11	12
$2 i$	$10 i$	10	1110100	24
$3 i$	$11 i$	20.2	1110111	1341
$- i$	$- i$	0.2	111	133
$-2 i$	$-10 i$	1030	100	121
$-3 i$	$-11 i$	1030.2	110011	13304
$1+ i$	$1+ i$	11.2	1110	13
$1- i$	$1- i$	1.2	111010	134
$-1+ i$	$-1+ i$	113.2	10	11
$-1- i$	$-1- i$	103.2	110	132
$2+ i$	$10+ i$	12.2	1111	14
$2- i$	$10- i$	2.2	111011	1440
$-2+ i$	$-10+ i$	112.2	11111	10
$-2- i$	$-10- i$	102.2	11101011	131

2i

目录