surjective function
滿射函數
surjective map
滿射映射
surjective relation
滿射關係
surjective property
滿射性質
surjective transformation
滿射變換
surjective homomorphism
滿射同態
surjective mapping
滿射映射
surjective analysis
滿射分析
surjective functionals
滿射泛函
surjective correspondence
滿射對應
the function is surjective if every element in the codomain has a preimage.
如果餘域中的每個元素都有一個原像,則該函數是滿射的。
in mathematics, a surjective function maps every element of its codomain.
在數學中,滿射函數將其餘域的每個元素映射到。
to prove that a function is surjective, you must show that it covers the entire range.
要證明一個函數是滿射的,必須表明它覆蓋整個值域。
surjective functions are important in various branches of mathematics.
滿射函數在數學的各個分支中都很重要。
a surjective map guarantees that every output is reached by at least one input.
滿射映射保證每個輸出至少由一個輸入到達。
understanding surjective functions can help in solving complex equations.
理解滿射函數有助於解決複雜方程。
in set theory, a surjective function is also known as an onto function.
在集合論中,滿射函數也稱爲映射函數。
not all functions are surjective; some may miss elements in the codomain.
並非所有函數都是滿射的;有些可能會遺漏餘域中的元素。
surjective functions play a key role in understanding bijections and inverses.
滿射函數在理解雙射和逆函數中起着關鍵作用。
surjective function
滿射函數
surjective map
滿射映射
surjective relation
滿射關係
surjective property
滿射性質
surjective transformation
滿射變換
surjective homomorphism
滿射同態
surjective mapping
滿射映射
surjective analysis
滿射分析
surjective functionals
滿射泛函
surjective correspondence
滿射對應
the function is surjective if every element in the codomain has a preimage.
如果餘域中的每個元素都有一個原像,則該函數是滿射的。
in mathematics, a surjective function maps every element of its codomain.
在數學中,滿射函數將其餘域的每個元素映射到。
to prove that a function is surjective, you must show that it covers the entire range.
要證明一個函數是滿射的,必須表明它覆蓋整個值域。
surjective functions are important in various branches of mathematics.
滿射函數在數學的各個分支中都很重要。
a surjective map guarantees that every output is reached by at least one input.
滿射映射保證每個輸出至少由一個輸入到達。
understanding surjective functions can help in solving complex equations.
理解滿射函數有助於解決複雜方程。
in set theory, a surjective function is also known as an onto function.
在集合論中,滿射函數也稱爲映射函數。
not all functions are surjective; some may miss elements in the codomain.
並非所有函數都是滿射的;有些可能會遺漏餘域中的元素。
surjective functions play a key role in understanding bijections and inverses.
滿射函數在理解雙射和逆函數中起着關鍵作用。
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