Examples of 'is surjective' in a sentence
Meaning of "is surjective"
is surjective - This phrase is used in mathematics to describe a function where each element in the range of the function has at least one corresponding element in the domain
How to use "is surjective" in a sentence
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is surjective
Next we prove that the homomorphism is surjective.
Is surjective for all in a generating set.
The sequence is exact if and only if g is surjective.
Moreover this map is surjective by construction.
That is surjective and its kernel is the special linear group.
The exponential map is surjective.
Is surjective if and only if f is.
Injective if and only if it is surjective.
And g is surjective.
Every morphism in a concrete category whose underlying function is surjective is an epimorphism.
So and is surjective.
In concrete categories, a function that has a right inverse is surjective.
Then is surjective.
This homomorphism is surjective.
Such a morphism is surjective if and only if it 's an isomorphism.
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This shows that is surjective.
Then, is surjective if and only if is semiperfect.
Every isometry is injective, although not every isometry is surjective.
The fact that the Frobenius map is surjective implies that every finite field is perfect.
It is surjective and its kernel consists of all integers which are divisible by 3.
To conclude, θ is surjective.
Conversely, if f o g is surjective, then f is surjective but g, the function applied first, need not be.
In particular, it is surjective.
Equivalently, a function is surjective if its image is equal to its codomain.
Suppose to the contrary that f { \ displaystyle f } is surjective.
In particular, if φ is surjective then H is isomorphic to G / kerφ.
Then, to prove ( 2 ), assume that m and p are injective and i is surjective.
In particular, if φ is surjective then S is isomorphic to R / kerφ.
Isometrical isomorphisms, i.e., A is an isometry which is surjective ( and hence bijective ).
Epimorphism A group homomorphism that is surjective ( or, onto ) ; i.e., reaches every point in the codomain.
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Examples of using Surjective
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Every surjective function has a right inverse
This function right here is onto or surjective
The composite of surjective functions is always surjective
