0
What else can I help you with?
What is the difference between improper subset and equal sets?
There is no difference between improper subset and equal sets. If A is an improper subset of B then A = B. For this reason, the term "improper subset" is rarely used.
What natural numbers are whole numbers?
The set of counting numbers is the positive integers. The set of whole numbers is the positive integers plus zero. The term "natural numbers" has been used interchangeably with both of those sets.
What does proper set mean?
I don't think such a term is used in set theory. A proper subset, on the other hand, is a subset of the set, that is not equal to the set itself. The difference is comparable to the difference between "greater than" and "greater-or-equal", for real numbers.
What is the math term for subset?
"Subset" IS the math term in this case.
What term is used to represent real numbers?
I thinl the term you want is integers.
What is the difference between improper subset and equal sets?
There is no difference between improper subset and equal sets. If A is an improper subset of B then A = B. For this reason, the term "improper subset" is rarely used.
What natural numbers are whole numbers?
The set of counting numbers is the positive integers. The set of whole numbers is the positive integers plus zero. The term "natural numbers" has been used interchangeably with both of those sets.
What does proper set mean?
I don't think such a term is used in set theory. A proper subset, on the other hand, is a subset of the set, that is not equal to the set itself. The difference is comparable to the difference between "greater than" and "greater-or-equal", for real numbers.
What is the math term for subset?
"Subset" IS the math term in this case.
What does the term relationship mean in math?
A pattern formed by 2 sets of numbers.
Is 628 on a ring mean its real.?
In mathematics, the concept of a "ring" refers to a specific algebraic structure. The number 628 being on a ring does not inherently imply that it is a real number. In the context of rings, elements can be integers, rational numbers, complex numbers, or other mathematical objects, but the term "real" typically refers to a subset of numbers on the real number line. Therefore, without additional context or clarification, it is not accurate to conclude that 628 being on a ring means it is a real number.
What is a product of real numbers and variables?
It is a Term.
What is the term for numbers formatted with a decimal point?
The set of real numbers.
What term is used to represent real numbers?
I thinl the term you want is integers.
Are monomials real numbers?
a monomial itself is not a real number because it ia a vocabulary term, however, real numbers and vairables can be monmials.
What is the densest subset of real numbers?
"Densest" is not really an applicable term here. I take it you mean "has the highest cardinality?" In this cast there are an infinite number of these. A theorem states (I forget the name) that a subset of a set can have at most the same cardinality of that set. So we need a set S such such that S ⊆ ℝ and |S| ≈ |ℝ|. Like I said, many sets fit this description, i.e. ℝ itself, any open or closed interval on ℝ like [1,16) or (-∞, 3), any union of any subset of ℝ and an open or closed interval on ℝ such as (12, ∞) ∪ {e}. I suppose that there are many types that I may be forgetting, but I hope you understand. =]
What math term can have an answer of all real numbers?
Found out it is an "OR"statement
