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Q: What does non-terminating irrational decimal mean?

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They are irrational.

an irrational number

It is an infinite non-repeating decimal which represents an irrational number.

Yes.

Yes

a terminating decimal is one that has an end like 1/2 is 0.5 nonterminating does not end like 1/3 is 0.33333333333333333333333333333333333333333... where there are an infinite number of 3s on the end. 1/4 is 0.25 so it is also terminating pi is a nonterminating number it is 3.14159265359... it also doesn't have a set pattern to go by so its not only a nonterminating decimal, but it is an irrational number. Hope that helps

Yes.

No, they are not. Recurring decimals are rational.

Nonterminating Decimal: A decimal that continues without end.For example:The square root of 2 = 1.414213562… Therefore, the square root of 2 is a nonterminating decimal.

The square root of 325, 18.027756377319946465596106337352…, is an irrational number because its decimal expansion is nonterminating and nonperiodic.

A nonterminating number does not end. An example is the fraction 1/3. When written as a decimal, it is a nonterminating number. Also pi is a nonterminating number. Some nonterminating numbers are repeating, some are nonrepeating. But they just don't end.

Irrational numbers.