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Is the set of prime numbers well defined?
The set is well defined. Whether or not a given integer belongs to the set of prime numbers is clearly defined even if, for extremely large numbers, it may prove impossible to determine the status of that number.
Is the set of prime numbers is well defined or not and why?
The set is well defined. Whether or not a given integer belongs to the set of prime numbers is clearly defined even if, for extremely large numbers, it may prove impossible to determine the status of that number.
How does calculating the average reading help to get a more accurate set of data?
This is due to the Law of Large Numbers. According to this law, the average of a set of numbers is more likely to be closer to the true average.
What are the multiplies of 1000?
They are elements of the infinitely large set of numbers of the form 1000*k where k is an integer.
What are examples of infinity sets?
Many infinite sets appear in mathematics: the set of counting numbers; the set of integers; the set of rational numbers; the set of irrational numbers; the set of real numbers; the set of complex numbers. Also, certain subsets of these, such as the set of square numbers, the set of prime numbers, and others.
Is the set of prime numbers well defined?
The set is well defined. Whether or not a given integer belongs to the set of prime numbers is clearly defined even if, for extremely large numbers, it may prove impossible to determine the status of that number.
Is the set of prime numbers is well defined or not and why?
The set is well defined. Whether or not a given integer belongs to the set of prime numbers is clearly defined even if, for extremely large numbers, it may prove impossible to determine the status of that number.
What is the largest set of numbers that includes all the numbers you have ever used?
For me, the biggest set of numbers is the set of REAL numbers. That includes every single number - positive, negative, whole, fraction, decimal, rational, irrational, numbers like pi and 'e' - except for IMAGINARY numbers. The set of REAL numbers is infinitely large and you can't get any bigger than that.
What is the function of large set of numbers?
There is no single function. In fact there are infinitely many possible functions.
How does calculating the average reading help to get a more accurate set of data?
This is due to the Law of Large Numbers. According to this law, the average of a set of numbers is more likely to be closer to the true average.
What must you know about a data set before you can use the empirical rule?
The data set must be unbiased, the outcomes of the trials leading to the data set must be independent. The data set must be large enough to allow the Law of Large Numbers to be effective.
What are the multiplies of 1000?
They are elements of the infinitely large set of numbers of the form 1000*k where k is an integer.
Is the intersection of the set of rational numbers and the set of whole numbers is the set of rational numbers?
No, it is not.
What are examples of infinity sets?
Many infinite sets appear in mathematics: the set of counting numbers; the set of integers; the set of rational numbers; the set of irrational numbers; the set of real numbers; the set of complex numbers. Also, certain subsets of these, such as the set of square numbers, the set of prime numbers, and others.
What is the set of numbers including all irrational and rational numbers?
real numbers
What is A set of numbers that is larger than the set of real numbers?
In a certain sense, the set of complex numbers is "larger" than the set of real numbers, since the set of real numbers is a proper subset of it.
What are the multiples of 100000?
They are elements of an infinitely large set of numbers of the form 100000*k where k is an integer.
