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A relation in which each element in the domain is mapped to exactly one element inthe range?
Wiki User
∙ 7y ago
It is an injective relation.
Wiki User
∙ 7y ago
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Name a function where each domain element is mapped to the same range element?
What is a function where each domain element is mapped to the same range element.
How much of the moon surface has been mapped?
By the best figures, only 2-3 percent of the ocean floor has been properly mapped, at least in regards to the public domain. Certain militaries may be able to claim as high as 10 percent, but those figures are guarded nearly as closely as the other information contained in their files.
Why are maps of prehistoric sites often made before removing the artifacts?
Because the locations of the artifacts in relation to the site, and in relation to each other, will give invaluable insights into the uses and meanings of the artifacts and the site. Invaluable information can be lost forever if the site isn't properly mapped before anything is moved. IDK
Who mapped the atom?
Niels Bohr
Is carlsbad caverns the biggest cave?
No; Mammoth Cave in KY is the world's longest known cave. Carlsbad has about 25 mi. mapped. Mammoth has over 390 mi. mapped.
What is the relation in which each element in the domain is mapped to exactly one element the range?
It is an invertible function.
Which relation are function relation?
A relation is a mapping between two sets, a domain and a range. A function is a relationship which allocates, to each element of the domain, exactly one element of the range although several elements of the domain may be mapped to the same element in the range.
Name a function where each domain element is mapped to the same range element?
What is a function where each domain element is mapped to the same range element.
How do you determined if a relation is a function?
For every element on the domain, the relationship must allocate a unique element in the codomain (range). Many elements in the domain can be mapped to the same element in the codomain but not the other way around. Such a relationship is a function.
How would you use domain and range to determine whether a relation is a function?
Each element in the domain must be mapped to one and only one element in the range. If that condition is satisfied then the mapping (or relationship) is a function. Different elements in the domain can be mapped to the same element in the range. Some elements in the range may not have any elements from the domain mapped to them. These do not matter for the mapping to be a function. They do matter in terms of the function having an inverse, but that is an entirely different matter. As an illustration, consider the mapping from the domain [-10, 10] to the range [-10, 100] with the mapping defined by y = x2.
How does the domain relate to a function?
Any function is a mapping from a domain to a codomain or range. Each element of the domain is mapped on to a unique element in the range by the function.
A function is a relation in which each element in the input is mapped to how many elements in the output?
It can be mapped to only one value.
What are functional relationships?
Humans need relationships with other people to be happy for the most part.
How do you find if a relation is a function?
A relationship is a function if every element in the domain is mapped onto only one element in the codomain (range). In graph terms, it means that any line parallel to the vertical axis can meet the graph in at most one point.
Do you use the 0 when finding the range of a set of numbers?
If there is an element of the domain that is mapped on to 0 then yes, else no.
What makes a relation a function?
A relation is a mapping from one set to another. It is a function if elements of the first set are mapped to only one element from the second set. So, for example, square root is not a function because 9 can be mapped to -3 and 3.
What is a relation in which each element of the first set is paired with exactly one element of the second set?
If every element of the first set is paired with exactly one element of the second set, it is called an injective (or one-to-one) function.An example of such a relation is below.Let f(x) and x be the set R (the set of all real numbers)f(x)= x3, clearly this maps every element of the first set, x, to one and only one element of the second set, f(x), even though every element of the second set is not mapped to.
