例句與造句

1. For example, 1 / 3 is represented as a non-terminating decimal as follows
2. It may come as a surprise that terminating decimal fractions can have repeating expansions in binary.
3. In the standard decimal representation, almost all real numbers do not have a terminating decimal representation.
4. The terminating decimal representation is usually preferred, contributing to the misconception that it is the only representation.
5. Decimal fractions have terminating decimal representations and other fractions have repeating decimal representations, whereas irrational numbers have infinite non-repeating decimal representations.
6. It's difficult to find terminating decimal in a sentence. 用terminating decimal造句挺難的
7. Since 1 / 3 can't be described as a terminating decimal, we allude to it by describing a sequence of terminating decimals that approaches it.
8. Since 1 / 3 can't be described as a terminating decimal, we allude to it by describing a sequence of terminating decimals that approaches it.
9. Informally, non-terminating decimals are easily understood, because it is clear that a real number can be approximated to any required degree of precision by a terminating decimal.
10. Informally, non-terminating decimals are easily understood, because it is clear that a real number can be approximated to any required degree of precision by a terminating decimal.
11. From this definition, it is clear that positive integers and positive rational numbers with terminating decimal expansions will have terminating 10-adic expansions that are identical to their decimal expansions.
12. Recurring decimals only exist because in the base system we have chosen ( denary-base 10 ), because two integers have been divided and the result is not a terminating decimal.
13. Every nonzero, terminating decimal ( with infinitely many trailing 0s ) has an equal twin representation with infinitely many trailing 9s ( for example, 8.32 and 8.31999 & ).
14. The article's claim is just false; " regular number " is not a standard name for a number with a terminating decimal expansion .-- Trovatore 14 : 52, 7 July 2006 ( UTC)
15. As shown in the section on the existence of Liouville numbers, this number, as well as any other non-terminating decimal with its non-zero digits similarly situated, satisfies the definition of a Liouville number.
16. If the repetend is a zero, this decimal representation is called a "'terminating decimal "'rather than a repeating decimal, since the zeros can be omitted and the decimal terminates before these zeros.
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