数学符号k∈Z在数学中类似题目那样的表达老外看得懂吗?k∈N,k∈N*,and so on~可是据他们整数用intege
来源:学生作业帮 编辑:搜狗做题网作业帮 分类:英语作业 时间:2024/07/31 01:47:00
数学符号k∈Z
在数学中类似题目那样的表达老外看得懂吗?k∈N,k∈N*,and so on~
可是据他们整数用integer呀~
在数学中类似题目那样的表达老外看得懂吗?k∈N,k∈N*,and so on~
可是据他们整数用integer呀~
![数学符号k∈Z在数学中类似题目那样的表达老外看得懂吗?k∈N,k∈N*,and so on~可是据他们整数用intege](/uploads/image/z/13833837-45-7.jpg?t=%E6%95%B0%E5%AD%A6%E7%AC%A6%E5%8F%B7k%E2%88%88Z%E5%9C%A8%E6%95%B0%E5%AD%A6%E4%B8%AD%E7%B1%BB%E4%BC%BC%E9%A2%98%E7%9B%AE%E9%82%A3%E6%A0%B7%E7%9A%84%E8%A1%A8%E8%BE%BE%E8%80%81%E5%A4%96%E7%9C%8B%E5%BE%97%E6%87%82%E5%90%97%3Fk%E2%88%88N%2Ck%E2%88%88N%2A%2Cand+so+on%7E%E5%8F%AF%E6%98%AF%E6%8D%AE%E4%BB%96%E4%BB%AC%E6%95%B4%E6%95%B0%E7%94%A8intege)
国际统一符号,放心使用,没问题.
以下内容引自baidu屏蔽的w开头的某网站(你知道的):
The integers (from the Latin integer, literally "untouched", hence "whole": the word entire comes from the same origin, but via French[1]) are formed by the natural numbers including 0 (0, 1, 2, 3, ...) together with the negatives of the non-zero natural numbers (−1, −2, −3, ...). Viewed as a subset of the real numbers, they are numbers that can be written without a fractional or decimal component, and fall within the set {... −2, −1, 0, 1, 2, ...}. For example, 65, 7, and −756 are integers; 1.6 and 1½ are not integers.
The set of all integers is often denoted by a boldface Z (or blackboard bold \mathbb{Z}, Unicode U+2124 ℤ), which stands for Zahlen (German for numbers, pronounced [ˈtsaːlən]).[2] The set \mathbb{Z}_n is the finite set of integers modulo n (for example, \mathbb{Z}_2=\{0,1\}).
以下内容引自baidu屏蔽的w开头的某网站(你知道的):
The integers (from the Latin integer, literally "untouched", hence "whole": the word entire comes from the same origin, but via French[1]) are formed by the natural numbers including 0 (0, 1, 2, 3, ...) together with the negatives of the non-zero natural numbers (−1, −2, −3, ...). Viewed as a subset of the real numbers, they are numbers that can be written without a fractional or decimal component, and fall within the set {... −2, −1, 0, 1, 2, ...}. For example, 65, 7, and −756 are integers; 1.6 and 1½ are not integers.
The set of all integers is often denoted by a boldface Z (or blackboard bold \mathbb{Z}, Unicode U+2124 ℤ), which stands for Zahlen (German for numbers, pronounced [ˈtsaːlən]).[2] The set \mathbb{Z}_n is the finite set of integers modulo n (for example, \mathbb{Z}_2=\{0,1\}).
数学符号k∈Z在数学中类似题目那样的表达老外看得懂吗?k∈N,k∈N*,and so on~可是据他们整数用intege
数学符号中~的含义是什么,例如N(k)~k^-D
已知集合M={2分之k+四分之一k,k∈z},N={a=四分之k+二分之一,k∈z}求MN的关系
利用数学归纳法证明不等式1+12+13+…+12n-1<f(n)(n≥2,n∈N*)的过程中,由n=k变到n=k+1时,
用数学归纳法证明(n+1)(n+2)…(n+n)=2n•1•3•…•(2n-1)(n∈N)时,从“k”到“k+1”的证明
用数学归纳法证明“1+12+13+…+12n−1<n(n∈N*,n>1)”时,由n=k(k>1)不等式成立,推证n=k+
三道高一数学集合题1.设集合A={a|a=3n+2,n∈Z},集合B={b|b=3k-1,k∈Z},试判断集合A,B的关
a b为不等的正数 k∈N+ 则a·b^k + b·a^k -a^(k+1)+b^(k+1)的符号为________
用数学归纳法证明“(n+1)(n+2)…(n+n)=2^n·1·3·5…(2n-1)(n∈N*)”时,从n=k到n=k+
已知M={x=k/2 +1,k∈Z} N={x=k+1/2,k∈Z} 求MN之间的关系 求快速!
已知M={x=k/2 +1,k∈Z} N={x=k+1/2,k∈Z} 求MN之间的关系
若3n=0.618,a∈[k,k+1),k∈Z,则k=