Sentences with COPRODUCT
Check out our example sentences below to help you understand the context.Sentences
1
"The coproduct of 5 and 6 is equal to 30."
2
"The coproduct of two sets is a set that contains all possible pairs of elements."
3
"In category theory, the coproduct is also known as the disjoint union."
4
"The coproduct of two groups is their direct product as sets with a certain binary operation."
5
"To calculate the coproduct of two matrices, we add them together elementwise."
6
"The coproduct of two rings is their direct sum as abelian groups."
7
"In algebraic geometry, the coproduct of two varieties is their fiber product."
8
"The coproduct of two objects in a category is a universal construction."
9
"The coproduct in the category of sets and functions is the disjoint union."
10
"The coproduct functor preserves isomorphisms."
11
"The coproduct is the categorical dual of the product."
12
"The coproduct of two topological spaces is their disjoint union with the disjoint topology."
13
"In type theory, the coproduct is also known as the sum type or the tagged union."
14
"The coproduct of two fields is a field that contains both fields."
15
"The coproduct of two graphs is the disjoint union of the graphs."
16
"In computer science, the coproduct of two data types is their sum type."
17
"The coproduct of two monoids is their free product as sets."
18
"In category theory, the coproduct is a special case of a colimit."
19
"The coproduct of two modules over a ring is their direct sum."
1
"In mathematics, the coproduct of two objects in a category is a universal construction that generalizes the direct sum of sets, the free product of groups, the disjoint union of sets, and the wedge sum of topological spaces."
2
"The coproduct in the category of sets is the disjoint union of sets."
3
"In the category of groups, the coproduct is the free product of groups."
4
"The coproduct of two objects is often denoted using the symbol ⊕ or +."
5
"In algebraic topology, the coproduct of two spaces is called the wedge sum."
6
"The coproduct of two vector spaces is the direct sum of vector spaces."
7
"The coproduct of two matrices is the direct sum of matrices."
8
"The coproduct of two sets consists of all possible pairs of elements from the two sets."