answersLogoWhite

0


Best Answer

Repeating decimal.

* * * * *

It depends on the numbers! For example, 0.6 < 0.66... < 0.67

By the first inequality the repeatiing decimal is bigger, by the second the terminating one is bigger.

User Avatar

Wiki User

āˆ™ 13y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: Is a repeating or terminating decimal bigger?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

Does the sum of a repeating decimal and a terminating decimal equal a terminating decimal?

No, the sum of a repeating decimal and a terminating decimal is never a terminating decimal.


Is 0.66 a terminating or repeating decimal?

It is terminating - after two decimal digits.


Is 0.875 a terminating or a repeating decimal?

0.875 is a terminating decimal and as a fraction it is 7/8


What is the differencce between a terminating and a repeating decimal?

A terminating decimal is a decimal that ends. A repeating decimal is a decimal that goes on and on.


Is -0.061 a terminating or repeating decimal?

It is a terminating decimal.


Is 0.4 a repeating decimal or a terminating decimal?

Terminating.


Is 0.700 a repeating decimal or a terminating decimal?

Terminating.


What is non terminatin repeating decimal?

A terminating decimal is a rational number. A non-terminating, repeating decimal is a rational number. A non-terminating, non-repeating decimal is an irrational number.


Is 2.4545 a repeating decimal or a terminating decimal?

As shown, a terminating decimal.


Is 0.3125 a repeating or terminating decimal?

0.3125 is a terminating decimal.


What numbers can be expressed as a terminating or repeating decimal?

Rational numbers can be expressed as a terminating or repeating decimal.


Is 8.56909 a rational or irrational decimal?

Any terminating decimal is rational. So are repeating (periodic) decimals.Any terminating decimal is rational. So are repeating (periodic) decimals.Any terminating decimal is rational. So are repeating (periodic) decimals.Any terminating decimal is rational. So are repeating (periodic) decimals.