How to use in-sentence of “cardinality”:
– The cardinality of 1679 was chosen because it is a semiprime.
– Depending on cardinality and the level of database normalisation, it may be necessary to introduce additional entities and relationships.
– Two sets have the “same” cardinality if and only if they have the same number of elements, which is the another way of saying that there is a 1-to-1 correspondence between the two sets.
– There are infinitely many natural numbers, the cardinality of the set of natural numbers is infinite.
– The cardinality of “A”= is 4.
– The smallest cardinality is 0.
– If the cardinality of the codomain is less than the cardinality of the domain, then the function cannot be an injection.
Example sentences of “cardinality”:
- The empty set has a cardinality of 0.
- The cardinality of the set "A" is "less than or equal to" the cardinality of set "B" if and only if there is an injective function from "A" to "B".
– The empty set has a cardinality of 0.
– The cardinality of the set “A” is “less than or equal to” the cardinality of set “B” if and only if there is an injective function from “A” to “B”.
– If the cardinality of the set “A” is “n”, then there is a “next larger” set with cardinality “n”+1 There is no largest finite cardinality.
– At times cardinality is not a number.
– For finite sets the cardinality is a simple number.
– Two sets have the same cardinality if we can pair up their elements—if we can join two elements, one from each set.
– The set has a cardinality of 2.
– If the cardinality of a set is not finite, then the cardinality is infinite.
– In mathematical terms, the cardinality of the subset containing the odd-numbered rooms is the same as the cardinality of the set of all rooms.
– Another definition is to say a set is finite if its cardinality is a natural number.
– After all the relations have been mapped, they are usually also revised to include cardinalities; a cardinality specifies the number of entities related in a relationship.
– A famous theorem of Cantor is that the cardinality of the real numbers is larger than the cardinality of the natural numbers.