We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是的证明,也就是透过在两
集合间建立一
(一
一且映成的
数)来证明它们的
数相等。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是的证明,也就是透过在两
集合间建立一
(一
一且映成的
数)来证明它们的
数相等。
声明:以上例句、词性分类均由互联网资源自动生成,部分未经过人工审核,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证明,也就是透过集合间建立一
对射(一对一且映成的
数)来证明它们的元素
数相等。
声明:以、词性分类均由互联网资源自动生成,部分未经过人工审核,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证,也就是透过在两个
建立一个对射(一对一且映成的
数)来证
它们的元素个数相等。
:
上例句、词性分类均由互联网资源自动生成,部分未经过人工审核,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证明,也就是透过在合间建立一
对射(一对一且映成的
数)来证明它们的元素
数相等。
声明:句、词性分类均由互联网资源自动生成,部分未经过人工审核,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证明,也就是透过在两个集合间建立一个对射(一对一且映成的数)来证明它们的元素个数相等。
声明:以上例句、词性分类均由互联网资源自动生成,部分未经过人,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证明,也就是透在两个集合间建立一个对射(一对一且映成的
数)来证明它们的元素个数相等。
声明:以上、词性分类均由互联网资源自动生成,部分未经
审核,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我主要关心
是
证明,也就是透过在两个集合间建立
个
(
且映成
数)来证明它
素个数相等。
声明:以上例句、词性分类均由互联网资源自动生成,部分未经过人工审核,其表达内容亦不代表本软件观点;若发现问题,欢迎向我
指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证,也就是透过在两个
建立一个对射(一对一且映成的
数)来证
它们的元素个数相等。
:
上例句、词性分类均由互联网资源自动生成,部分未经过人工审核,其表达内容亦不代表本软件的观点;若发现问题,欢迎向我们指正。
We will be concerned primarily with bijective proofs, i.e., showing that two sets have the same number of elements by exhibiting a bijection (one-to-one correspondence) between them.
我们主要关心的是对射的证明,也就是透过在两个集合间建立一个对射(一对一且映成的数)来证明它们的元素个数相等。
声明:以上例句、词性分类均由互联网资源自动生成,部分未经过人工审核,内容亦不代
本软件的观点;若发现问题,欢迎向我们指正。