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Math vocabularyRepeating decimals are rational numbers in decimal with numbers, some women appear duplicated without end that duplicate numbers may occur before or after the decimal point, and a cross or the duplicate numbers may be just a single digit only. For example, 1/3 = 0.333333 ... three point zero (read. Three repeats)For example, the decimal number from 0 to the last write is not unique to just be treated as decimal, decimal positions because duplicates will end before the last number 0, because completing the number 0 is not unique so it is not necessary is not made up of a number of changes from the original, such as 0.56000000 ... = 0.56.In the special case of unnecessary repeated decimal, but sometimes it can be useful, it is only one of the 9 number 9 number in which all the duplicate can be discarded and add up to one or more preceding principles such as 1.77999999 or 1 = 0.999999 ... ... = 1.78 in General. The format of the number 9 is used to describe how many are coming, however, or to illustrate an interesting relationships, such as 1 = 3/3 = 3 × 1/3 = 3 × 0.333333 ... = 0.999999 ... see 0.999 ...There are other types of decimals in integer, decimal, decimal and endlessly unique.Decimals is the number of studies the rational knowledge can be represented by minimum fractions written in formats that the numerator and denominator are integers, and the denominator is equal to zero.Non-repeating decimal endlessly is irrational, which can't be written instead by the ratio of two integers.Contents [Hide] 1 notation2 the fraction with the denominator as a specific amount.3 create a fraction from repeating decimal3.1 how to shortcut.4 other sourcesNotation [solved]To write the decimal repeats, in easy-to-read format. To do this, fill the horizontal tick (vinculum) above duplicate numbers, such as group or a dot above the numeric group duplicates. At the beginning and end, however, the use of dots 3 dots (...) is the easiest way to repeating decimal presentations. Although there is no suggestion that the repeat number set must be written before a few times. For example,1/9 = 0.111111111111 ...1/7 = 0.142857142857 ...1/3 = 0.333333333333 ...1/81 = 0.0123456790 ...2/3 = 0.666666666666 ...7/12 = 0.58333333333 ...In Europe there are other notation is used differently. Is to use parentheses around the set of digits that repeat, such as?2/3 = 0. (6)1/7 = 0. (142857)7/12 = 0.58 (3)A fraction whose denominator is the number of only 850.In a fraction, the denominator is the number is low, only one of the 2 p and 5 (which is double the number of 10 's) is always a repeating decimal, which range in the figures of 1/p is p − 1 (the one) or equivalent to one denominator of p − 1 (this is the second group) one.For example the fraction in the first group are as follows:1/7 = 0.142857 ... 6; Duplicate master1/17 = 0.0588235294117647 ...; 16 Duplicate master1/19 = 0.0526315789473684 ...; 18 Duplicate master1/23 = 0.0434782608695652 ...; 22 Duplicate master1/29 = 0.0344827586206897 ...; 28 Duplicate masterThe fraction 1/47, 1/1/59, 61, 109, 1/1/97, etc.Multiplying fractions is one of the groups on the displayed one of the special features of interest, such as.2/7 = 2 × 0.285714 = 0.142857 ... ...3/7 = 3 × 0.428571 = 0.142857 ... ...4/7 = 4 × 0.571428 = 0.142857 ... ...5/7 = 0.142857 × 5 ... = 0.714285 ...6/7 = 0.142857 × 6 ... = 0.857142 ...Which seems to duplicate numbers in the product is derived from the moving loop of 1/7, but why cause the behavior to move the cycle comes from arithmetic in decimal digits only. Which fraction in a group that one of the other options, such as 1/17, 1/19, 1/23, etc. will have these special properties as well.In the second group, the fraction is a fraction that, apart from the group, one of the conditions in the beginning, such as.1/3 = 0.333 ...; 1 Duplicate master, a Division 1 of 21/11 = 0.090909 ... 2; Duplicate master 2, which is a division of 10.1/13 = 0.076923 ...; 6 Duplicate master which is 6 a divisor of 12.Note that multiplying fractions 1/13 was able to move a loop in the duplicate numbers and are divided into two sets. The first set are as follows:1/13 = 0.076923 ...3/13 = 0.230769 ...4/13 = 0.307692 ...9/13 = 0.692307 ...10/13 = 0.769230 ...12/13 = 0.923076 ...And another one:2/13 = 0.153846 ...5/13 = 0.384615 ...6/13 = 0.461538 ...13/7 = 0.538461 ...8/13 = 0.615384 ...11/13 = 0.846153 ...To create a repeating decimal fraction from 850.On any repeated decimal can be calculated to be changed in a fraction. So, for example,Or another exampleAnd when repeating decimal can be written as a fraction. Repeating decimals, rational numbers, it is always.Shortcut method [solved]If the repeating decimal value between 0.1 to 1 and the number of duplicate numbers n digits to the right of the decimal point. We will write a fraction, the numerator by a series of numbers that repeats, and the denominator is the number 9. n.0.444444 ... = 4/9 due to the unique number series is "4", which has a 1.0.565656 ... = 56/99, because the collection is a unique number "56" with 2.0.789789 ... = 789/999 because a duplicate number series is parent with 3 "789"If the repeating decimal between 0 and 0.1 and 0 number of k digits is preceded the main set of n unique number (all must be located to the right of the decimal point) Thus, the numerator is the repeat number set and the components with 9 number number number number n and k with 0 down.0.000444 ... = 4/9000 series, repeat figures because it is "4", and with "0" number 3.0.005656 ... = 56/9900 Series is duplication because of the number "56" and with "0" number 2.0.0789789 ... = 789/9990 series is duplication because of the number "0" and the heartfelt "789" number 1.For this other than decimal can be written as the sum of the decimal a decimal with end-to-end knowledge in one of the formats described. So, for example,1.23444 ... = + 1.23 0.00444 123/4 + 100 = .../900 = 1107/900 + 4 = 1111/900/900.0.3789789 ... = 0.3 + 0.0789789 = 3/10 ... + = 9990 9990/2997/789 + 789/9990 9990/3786 unreserved = 631/1665.However, using the shortcut method will not result in a minimum fraction, which must continue to degrade by itself.Note that 0.999999999 cannot be written as a fraction, except one.

Math Vocabulary
repeating decimal Is a rational number in hexadecimal. Some numbers are repeated without end. The number of repeats may occur before or after. Or across the decimal And a unique set of numbers might be just a single number, for example: 1/3 = 0.333333 ... (read as zero point three three iterations) for places to write a unique number 0 last indefinitely. Not considered a repeating decimal As for the number of places will end before the end because of the addition of 0, 0 unique indefinitely. Unnecessary Is made ​​up of a number of changes, such as 0.56000000 ... = 0.56 in case one of the unique places unnecessary. But sometimes it is useful That is the repetition of a single number 9, number 9, which can leave it all up and add values ​​to the previous one as 0.999999 ... = 1 or 1.77999999 ... = 1.78, in general. Pattern repeat of the 9 describes the number is, however. Or to show the relationship of interest, such as 1 = 3/3 = 3 × 1/3 = 3 × 0.333333 ... = 0.999999 ... see more at 0.999 ... places in all other places I know. and endless places unique places to finish. Is a rational number can be written as a fraction at least in form. The numerator and denominator are integers. And the denominator is nonzero endless unique places. Is irrational Which can not be written as a ratio of two integers to Contents [hide]  1 Notation 2 fractions whose denominator is the number 3. Creating a repeating decimal fractions of 3.1 Shortcut 4 External notation [edit] Writing repeating decimal into a format that is easy to read. Achieved by the addition of Horizontal (vinculum) over the same number as the number or fill spots over and over. The start position and end position as the use of the three dots (...) is the easiest way to present the repeating decimal. Although there is no suggestion that there would be a series of numbers that are repeated many times before. For example: 1/9 = 0.111111111111 ... 1/7 = 0.142857142857 ... 1/3 = 0.333333333333 ... 1/81 = 0.0123456790 ... 2/3 = 0.666666666666 ... 7/12 = 0.58333333333 ... in Europe have used the notation otherwise. differ Is using braces surround a set number of iterations as 2/3 = 0. (6) 1/7 = 0. (142857) 7/12 = 0.58 (3) fractions with denominator is prime [edit] The fractions. The lower the denominator is the only one of p, the addition of 2 and 5 (which is double the number of 10) will always be a repeating decimal. The range of unique in the number of 1 / p is p - 1 (as a group) or equal to the denominator, one of p - 1 (the second group), one sample fractions in the first group. are as follows: 1/7 = 0.142857 ...; 6-digit unique 1/17 = 0.0588235294117647 ...; 16 digit unique .052631578947368421 1/19 = ...; 18 digit unique 0.0434782608695652173913 1/23 = ...; 22 digit unique 1/29. 0.0344827586206896551724137931 ...; 28 digit unique , including fractions, 1/47, 1/59, 1/61, 1/97, 1/109, etc. on multiplying fractions in one group. One special feature is interesting as 2 × 2/7 = .142857 ... = 0.285714 ... = 3 × 3/7 = .428571 .142857 ... ... 4/7 = 4 × .142857 .571428 ... ... = 5/7 = 5 × .142857. ... = 0.714285 ... 6/7 = 6 × 0.142857 ... = .857142 ... which seems. The duplicate numbers in the matrix are derived from Circular shift of 1/7, but the cause of the behavior of a drop in numbers after the decimal arithmetic calculations only. The fractions in one group, such as 1/17, 1/19, 1/23, etc., will have these special features as well fractions in the second group. Fractions is in addition to the one stated in the beginning, such as 1/3 = 0.333 ...; 1 digit unique where 1 is a divisor of 2 1/11 = 0.090909 ...; 2 digit unique that 2 is a divisor of 10. 1/13 = 0.076923 ...; 6-digit unique where 6 is the denominator. 12 Note that Multiplying fractions of 1/13, it can cause a drop in numbers is unique. And is divided into two sets. The first set include = 0.076923 ... 1/13 ... 3/13 = 0.230769 = 0.307692 ... 4/13 ... 9/13 = 0.692307 0.769230 ... 10/13 = 12/13 = 0.923076 ... and one is 2/13 = 0.153846 ... = 0.384615 ... 5/13 ... 6/13 = 0.461538 0.538461 ... 7/13 = 8/13 = 0.615384 ... 11/13 = 0.846153 ... to create a repeating decimal fractions of [the] on any repeating decimal. Can be calculated to be converted into a fraction. As an example, or another example , when repeating decimal fractions can be written in the form. Repeating decimal is always rational shortcut [edit] If the repeating decimal is between 0.1 to 1 and n is the number of unique numbers on the right of the decimal point. We will write a fraction, the numerator by providing a unique set of numbers. And fill the denominator is the number 9 n elements such as 0.444444 ... = 4/9 since the repeating is "4", which is one main 0.565656 ... = 56/99 since the repeating is "56", which has two main 0.789789 ... =. 789/999 since the repeating is "789", a 3-digit repeating decimal if the value is between 0 and 0.1 and with just 0 k n the repeating digit prefix digit (all are to the right of the decimal point), so. the numerator is the repeating. And a section containing n elements and adding the number 9 0 k down as 0.000444 ... = 4/9000 since the repeating is "4" and a "0" 3-digit number 0.005656 ... = 56/9900 due. the repeating is "56" and a "0" for 2 main 0.0789789 ... = 789/9990 since the repeating is "789" and a "0" for 1 digit for places other than this. Can be written as a sum of places to finish. The repeating decimal in any form, as already mentioned. For example ... 1.23444 0.00444 ... = 123/100 = 1.23 +: +: + 4/900 4/900 = 1107/900 1111/900 = 0.3 + 0.0789789 0.3789789 ... = ... = 3/10 + 789/9990 = 2997/9990 + 789. / 3786/9990 = 9990 = 631/1665 , however. Using shortcuts will not give at least a fraction. They are to be reduced to their own notes 0.999999999 not be written as fractions. Except for the part

The vocabulary of mathematics
.Repeating decimal is rational one in number. With some figures series is repeated without end. The repetition of numbers may occur before or after or straddle the decimal point.For example, 1 / 3 = 0.