Examples of 'commutative' in a sentence
Meaning of "commutative"
Commutative is an adjective that describes a property in mathematics where the order of the numbers or elements being combined does not affect the outcome. For example, in addition, 3 + 4 is the same as 4 + 3
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- Such that the order in which the operands are taken does not affect their image under the operation.
- Having a commutative operation.
- Such that any two sequences of morphisms with the same initial and final positions compose to the same morphism.
- Relating to exchange; interchangeable.
How to use "commutative" in a sentence
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commutative
A commutative ring is a ring whose multiplication is commutative.
This addition is both commutative and associative.
Commutative rings are also important in algebraic geometry.
Each operator is both commutative and associative.
A commutative quantale is a quantale whose multiplication is commutative.
This is true for any commutative monoid.
Commutative rings with restricted minimum condition.
Note that quaternion multiplication is not commutative.
A ring is called commutative if its multiplication is commutative.
Putting on left and right socks is commutative.
A commutative ring is a ring where multiplication is commutative.
Their multiplication is both commutative and associative.
In commutative justice we consider chiefly real equality.
In a field both addition and multiplication are commutative.
The ring is commutative if the law o is commutative.
See also
The natural sum is associative and commutative.
Using the commutative and associative laws.
The operation is associative but not commutative.
Commutative means that order does not matter.
This is a very common technique in commutative algebra.
The commutative property is true for multiplication.
It means that multiplication of such matrices is commutative.
The commutative property of multiplication is very similar.
All rings are assumed to be commutative and unital.
A commutative semigroup is a semigroup whose operation is commutative.
Division and subtraction are not commutative operations.
The study of commutative rings is called commutative algebra.
A group in which the group operation is commutative.
This is the commutative property of multiplication.
Multiplication of infinite ordinals is not commutative.
Both of these operations are commutative and associative.
It is a commutative and associative operation for unlabelled graphs.
All counter operations are associative and commutative.
Division is neither commutative nor associative.
This shows us that division is not commutative.
Because simple commutative rings are fields.
We say that function composition is not commutative.
Every countable commutative ring has a prime ideal.
Commutative rings have a product operation.
We have to show that given a commutative diagram.
Most commutative operations encountered in practice are also associative.
Make him understand the commutative property.
Any commutative monoid is the opposite monoid of itself.
Keeping order with the commutative property.
A commutative semisimple ring is a finite direct product of fields.
And this is just a commutative property.
A commutative ring is left primitive if and only if it is a field.
Moduli spaces of commutative ring spectra.
Commutative and anticommutative are equivalent.
The product is commutative and associative.
