The term domain has (at least) three different meanings in mathematics.
The term domain is most commonly used to describe the set of values for which a function (map, transformation, etc.) is defined. For example, a function that is defined for real values has domain , and is sometimes said to be "a function over the reals." The set of values to which is sent by the function is then called the range.
The domain (in its usual established mathematical sense) of a probability function (and therefore also its distribution function) is implemented as Domain[dist] in the Mathematica add-on package Statistics`Common` (which can be loaded with the command <
The meaning of "domain" in topology is a connected open set.
Another meaning of "domain" is what is more properly known as an integral domain, i.e., a ring that is commutative under multiplication, has an identity element, and no divisors of 0.
2007-02-01 23:10:44
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answer #1
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answered by Anonymous
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Domain refers to all possible x-values. Whithout a specific equation, I can't tell you what the domain is.
Normally equation with fractions with x in the denominator have restricted domains, because a value of x that results in 0 in the denominator is undefined.
Further equations in which the square root of x or an x term is a factor have restricted domains, because the square root of a negative number is imaginary.
2007-02-01 23:11:28
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answer #2
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answered by mirramai 3
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its that and a computer net work like at school or a workspace a home computer will not have one set up unless you have 5 or 6 accounts
there be a administrator sets every thing.
then if a user can do some things like lock an computer and loge on and off.
there should be more info at Help And Support.
2007-02-01 23:11:07
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answer #3
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answered by DRAGON 5
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when a relation is defined from set a to set b the x co ordinates is called the domain
2007-02-02 01:39:24
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answer #4
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answered by nisanth v 1
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first you may complete your question
2007-02-01 23:18:16
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answer #5
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answered by Thava 1
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