在數學 中,負三 記作−3 負二 之間的整數 ,為3 加法逆元 或相反數 [ 1] :22 [ 2] [ 3] 逆反詞 或相對概念[ 4] [ 4] [ 5]
負三經常在訊號處理 領域被提及,因為負三分貝 約為能量的一半[ 6] 半能點 [ 7] 濾波器 、滤光器 和放大器 [ 8] [ 9] 國際單位制 基本單位的表示法中,負三偶爾也會做為冪次來表達立方倒數,比如密度 的单位kg・m-3 [ 10]
負三為第二大的負奇數。最大的負奇數為負一 ,而負三為負一的三倍[ 11]
負三與無理數
10
log
10
(
1
2
)
≈
−
3.0103
{\displaystyle 10\log _{10}\left({\tfrac {1}{2}}\right)\approx -3.0103}
十分接近 [ 12] 分貝 代表能量為一半的情況[ 6]
負三是最大的負基本判别式 [ 13] [ 14]
負三能使連續三個奇數的乘積加一為平方數。有這種性質的奇數只有-3 和1 ,而所有滿足n(n+2)(n+4)+1為平方數的整數只有11個,分別為-4, -3, -2, 0, 1, 2, 8, 10, 18, 112, 1272[ 15]
負三能使二次域
Q
[
d
]
{\displaystyle \mathbb {Q} [{\sqrt {d}}]}
類数 為1,即
Q
[
−
3
]
{\displaystyle \mathbb {Q} [{\sqrt {-3}}]}
類数 為1,亦即其整數環 為唯一分解整環 [ 註 1] [ 16] 複平面 上形成了一個六角網格 ,每個六邊形又可分成6個三角形 (三角網格 )[ 17] :289 。
而根據史塔克-黑格纳理論 [ 18] [ 17] :295 [ 19] [ 20] 黑格纳数 [ 21]
此外負三也能使二次域
Q
[
d
]
{\displaystyle \mathbb {Q} [{\sqrt {d}}]}
[ 22]
Q
[
−
3
]
{\displaystyle \mathbb {Q} [{\sqrt {-3}}]}
OEIS 數列A048981 )[ 23] [ 24] [ 25]
若考慮正數,則-3是第七個有此性質的數,前一個是-7、下一個是-2[ 16] [ 26]
負三與負三的乘積為正九[ 27] [ 28] [ 註 2]
現有兩數i和j,i和j的乘積與六倍i和j的和相等,且其和與i、j皆為整數的結果只有8個解,負三是其中之一[ 31]
負三為四維超立方體 (或四維超方形 )下闭集合 中欧拉示性数 的最小值[ 32]
負三的因數有-3, -1, 1和3[ 33] [ 34] [ 35]
−
3
=
{\displaystyle -3=\,}
−
1
×
3
{\displaystyle -1\times 3}
算术基本定理 一般以探討正整數的質因數分解 為主[ 16] [ 36]
密度 CGS制 單位g/cm3 [ 37] ML-3 ,此時負三用以表示立方的倒數[ 38]
而立方倒數中的相關議題還有立方倒數和。自然數的負三次次方和(立方倒數和)會收斂並趨近於阿培里常数 ,即:
∑
n
=
1
∞
n
−
3
{\displaystyle \sum _{n=1}^{\infty }{n^{-3}}}
π
2
7
{
1
−
4
∑
k
=
1
∞
ζ
(
2
k
)
(
2
k
+
1
)
(
2
k
+
2
)
2
2
k
}
≈
1.202056903
{\displaystyle {\frac {\pi ^{2}}{7}}\left\{1-4\sum _{k=1}^{\infty }{\frac {\zeta (2k)}{(2k+1)(2k+2)2^{2k}}}\right\}\approx 1.202056903}
[ 39] 即全體自然數的負三次方和 會收斂在這個數。其值約為1.202056903。同時其也是Zeta函數 代入3的結果[ 39]
負三通常以在3前方加入負號表示[ 1] :28 [ 40] [ 41] [ 42] [ 43]
在二進制時,尤其是計算機運算,負數的表示通常會以二補數 來表示[ 44] (2) 」,例如,在八位元的二補數 二進制中,負三會以「11111101(2) 」表示,正三會以「00000011(2) 」;而在使用負號的表示法中,負三計為「-11(2) 」,亦有在最高位填1表示其為負之表示法,此時負三表示為「10000011(2) 」[ 45]
^ 當d<0時,若
Q
[
d
]
{\displaystyle \mathbb {Q} [{\sqrt {d}}]}
Q
[
d
]
{\displaystyle \mathbb {Q} [{\sqrt {d}}]}
Q
[
−
5
]
{\displaystyle \mathbb {Q} [{\sqrt {-5}}]}
Z
[
−
5
]
{\displaystyle \mathbb {Z} [{\sqrt {-5}}]}
2
×
3
{\displaystyle 2\times 3}
(
1
+
−
5
)
(
1
−
−
5
)
{\displaystyle (1+{\sqrt {-5}})(1-{\sqrt {-5}})}
^ 三的平方為九、負三的平方亦為九,故兩者皆為九的平方根[ 29] [ 30]
^ 許多計算機程式庫會實作零年的功能,例如Perl CPAN 的 DateTime module[ 53]
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![{\displaystyle \mathbb {Q} [{\sqrt {d}}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/86b4fd0d487fad901c09de8e288da7d2e50fd2eb)
![{\displaystyle \mathbb {Q} [{\sqrt {-3}}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/749c9868ac496f73dc9cd03307c627bbeda9f62a)
![{\displaystyle \mathbb {Q} [{\sqrt {-5}}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/8b63d421239faeb1572bcd6a024c0ed526404276)
![{\displaystyle \mathbb {Z} [{\sqrt {-5}}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/a37499ef27234d8a67a65932184280bb17301312)
