Repeating decimal - Wikipedia, the free encyclopedia
A decimal representation of a real number is called a repeating decimal (or recurring decimal ) if at some point it becomes periodic: there is some finite sequence of digits that is repeated indef...
en.wikipedia.org/wiki/Repeating_decimal
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Fractions and Repeating/Recurring Decimals ... Converting Repeating Decimals to Fractions I know .333333333333 is 1/3, but what is the trick to it? ... Fractions for Repeating Decimals Convert 3.04050505.... into a fraction.
mathforum.org/library/drmath/sets/select/dm_repeat_deci... mathforum.org/library/drmath/sets/select/dm_repeat_decimal.html
A repeating decimal, also called a recurring decimal, is a number whose decimal representation eventually becomes periodic (i.e., the same sequence of ...
mathworld.wolfram.com/RepeatingDecimal.html mathworld.wolfram.com/RepeatingDecimal.html
Repeating Decimals (PDF File)
REPEATING DECIMALS; THEA Handout #1; THIS HANDOUT ASSUMES YOU ARE ALREADY FAMILIAR WITH DECIMALS AND OPERATIONS WITH DECIMALS. If not, you may want to work through the material in Chapter 3 of Basic College Mathematics by Aufmann/Barker before going on.
www.utexas.edu/student/utlc/learning_resources/math_han... www.utexas.edu/student/utlc/learning_resources/math_handouts/repeating_decimals.pdf
Subject: Occuring pattern in repeating decimals ... The theory I choose was "When turned into a fraction, a repeating decimal has a denometor that is a multiple of three." I have a couple of questions about this topic. My first question is, have you ever heard of this, and what can you tell me about it?
mathcentral.uregina.ca/QQ/database/QQ.09.00/sarah2.html
Someone with a lot more time on their hands than we have has determined that all rational numbers (fractions) may be represented as either a terminating decimal or a repeating decimal. ... Calculate the decimal equivalents of the unit fractions: 1/13 through 1/25. Looking at the decimals you calculated from above,
www.hawkeye.cc.ia.us/faculty/lolson/repeatdecimal.htm www.hawkeye.cc.ia.us/faculty/lolson/repeatdecimal.htm
Many years ago I read some interesting articles in a British school mathematics journal about the various patterns that can be found in the decimal expansions of repeating decimal forms of certain rational numbers [aka fractions].
www.trottermath.net/numthry/repdecls.html
The way that people don't understand what repeating decimals mean. In particular, the way that people will insist that 0.9999999... != 1. As a CS geek, I tend to see this as an issue of how people screw up syntax and semantics.
scienceblogs.com/goodmath/2006/06/good_math_repeating_d... scienceblogs.com/goodmath/2006/06/good_math_repeating_decimals_a.php
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Add, subtract, multiply, divide, convert to fractions, so much more!
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