The concepts of domain and range in mathematics were developed over time, with early contributions from ancient Greek mathematicians like Euclid and later advancements made during the Renaissance and the development of calculus. The formal definitions we use today have been shaped by various mathematicians, particularly in the context of functions and set theory. While no single individual can be credited with "creating" these concepts, they have evolved through collaborative efforts in the field of mathematics.
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The range depends on the domain. If the domain is the complex field, the range is also the whole of the complex field. If the domain is x = 0 then the range is 4.
domain: (-infinity to infinity) range: ( -infinity to infinity)
The domain would be (...-2,-1,0,1,2...); the range: (12)
domain: all real numbers range: {5}
The domain and range are two different sets associated with a relationship or function. There is not a domain of a range.
You do not graph range and domain: you can determine the range and domain of a graph. The domain is the set of all the x-values and the range is is the set of all the y-values that are used in the graph.
The domain and range are (0, infinity).Both the domain and the range are all non-negative real numbers.
A number does not have a range and domain, a function does.
The domain is, but the range need not be.
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The range is the y value like the domain is the x value as in Domain and Range.
The domain of the inverse of a relation is the range of the relation. Similarly, the range of the inverse of a relation is the domain of the relation.
The domain is the the set of inputs. (x) The range is the set of oututs. (y)
The range depends on the domain. If the domain is the complex field, the range is also the whole of the complex field. If the domain is x = 0 then the range is 4.
sqrt(x) Domain: {0,infinity) Range: {0,infinity) *note: the domain and range include the point zero.
x = the domain y = the co-domain and range is the output or something e_e