bijection between sets
集合之間的雙射
one-to-one correspondence bijection
一對一對應關係的雙射
establish a bijection
建立雙射關係
invertible bijection
可逆雙射
perfect bijection
完美的雙射
unique bijection
唯一的雙射
bijection between domains
域之間的雙射
a bijection exists between the set of natural numbers and the set of even numbers.
自然數集合與偶數集合之間存在雙射。
in mathematics, a bijection is a special kind of function.
在數學中,雙射是一種特殊的函數。
understanding bijections is crucial for studying advanced algebra.
理解雙射對學習高級代數至關重要。
the concept of bijection helps in establishing one-to-one correspondences.
雙射的概念有助於建立一對一的對應關係。
every bijection has an inverse function that is also a bijection.
每個雙射都有一個也是雙射的逆函數。
in set theory, a bijection indicates that two sets have the same cardinality.
在集合論中,雙射表明兩個集合具有相同的基數。
the bijection between these two groups simplifies the problem significantly.
這兩個羣體之間的雙射顯著簡化了問題。
finding a bijection can be challenging in complex mathematical structures.
在複雜的數學結構中,尋找雙射可能很具挑戰性。
we can use a bijection to demonstrate the equivalence of two different proofs.
我們可以使用雙射來證明兩個不同證明的等價性。
the bijection principle is often used in combinatorial proofs.
雙射原理常用於組合證明中。
bijection between sets
集合之間的雙射
one-to-one correspondence bijection
一對一對應關係的雙射
establish a bijection
建立雙射關係
invertible bijection
可逆雙射
perfect bijection
完美的雙射
unique bijection
唯一的雙射
bijection between domains
域之間的雙射
a bijection exists between the set of natural numbers and the set of even numbers.
自然數集合與偶數集合之間存在雙射。
in mathematics, a bijection is a special kind of function.
在數學中,雙射是一種特殊的函數。
understanding bijections is crucial for studying advanced algebra.
理解雙射對學習高級代數至關重要。
the concept of bijection helps in establishing one-to-one correspondences.
雙射的概念有助於建立一對一的對應關係。
every bijection has an inverse function that is also a bijection.
每個雙射都有一個也是雙射的逆函數。
in set theory, a bijection indicates that two sets have the same cardinality.
在集合論中,雙射表明兩個集合具有相同的基數。
the bijection between these two groups simplifies the problem significantly.
這兩個羣體之間的雙射顯著簡化了問題。
finding a bijection can be challenging in complex mathematical structures.
在複雜的數學結構中,尋找雙射可能很具挑戰性。
we can use a bijection to demonstrate the equivalence of two different proofs.
我們可以使用雙射來證明兩個不同證明的等價性。
the bijection principle is often used in combinatorial proofs.
雙射原理常用於組合證明中。
探索常見搜尋詞彙