repeating decimal वाक्य

"repeating decimal" हिंदी मेंrepeating decimal in a sentence

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It is necessary for F to be coprime to 10 in order that is a repeating decimal without any preceding non-repeating digits ( see multiple sections of Repeating decimal ).
Therefore, 1 Torr is equal to | 760 } } Pa . The decimal form of this fraction ( ) is an infinitely long, periodically repeating decimal ( repetend length : 18 ).
First, even though rational numbers all have a finite or ever-repeating decimal expansion, irrational numbers don't have such an expression making them impossible to completely describe in this manner.
It proves that, although we can't look at every digit of Pi, if we could, we would not see a really really long repeating decimal, we'd just see randomness.
Does it really matter that . 333 . . . is a repeating decimal in deciding whether to call it a limit or not ?-- talk ) 13 : 33, 12 July 2009 ( UTC)
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.
Although all decimal fractions are fractions, and thus it is possible to use a rational data type to represent it exactly, it may be more convenient in many situations to consider only non-repeating decimal fractions ( fractions whose denominator is a power of ten ).
So the value of " 0.333 . . . " is defined by the limit simply because it is a repeating decimal, which is equivalent-by definition-to an infinite series .-- talk ) 16 : 31, 12 July 2009 ( UTC)
While the expression of a single series with vinculum on top is adequate, the intention of the above expression is to show that the six cyclic permutations of 006993 can be obtained from this repeating decimal if we select six consecutive digits from the repeating decimal starting from different digits.
While the expression of a single series with vinculum on top is adequate, the intention of the above expression is to show that the six cyclic permutations of 006993 can be obtained from this repeating decimal if we select six consecutive digits from the repeating decimal starting from different digits.
:: : Yes, I'm a great fan of the continued fraction method for " approximations ", but if you know the period of a repeating decimal the approach suggested by the series is better . talk ) 17 : 14, 5 November 2008 ( UTC)
So this particular repeating decimal corresponds to the fraction 1 / ( 10 " n " & minus; 1 ), where the denominator is the number written as " n " digits 9 . Knowing just that, a general repeating decimal can be expressed as a fraction without having to solve an equation.
So this particular repeating decimal corresponds to the fraction 1 / ( 10 " n " & minus; 1 ), where the denominator is the number written as " n " digits 9 . Knowing just that, a general repeating decimal can be expressed as a fraction without having to solve an equation.
Every terminating decimal representation can be written as a decimal fraction, a fraction whose divisor is a 0.999 & } } and 1.584999 & } } are two examples of this . ( This type of repeating decimal can be obtained by long division if one uses a modified form of the usual division algorithm .)
If you start with, " What is 32 / 7 you are going to get monsters like 4.571428571428 and unless that's what you want ( to demonstrate the repeating decimals of numbers divided by 7 ) it's a monster to deal with gradewise . talk ) 22 : 29, 20 October 2014 ( UTC)
It follows that any repeating decimal with period " n ", and " k " digits after the decimal point that do not belong to the repeating part, can be written as a ( not necessarily reduced ) fraction whose denominator is ( 10 " n " & minus; 1 ) 10 " k ".
For arithmetic, Bhrat + K [ cGa gives several algorithms for whole number multiplication and division, ( flag or straight ) division, fraction conversion to repeating decimal numbers, calculations with measures of mixed units, summation of a series, squares and square roots ( duplex method ), cubes and cube roots ( with expressions for a digit schedule ), and divisibility ( by osculation ).
A decimal may be a terminating decimal, which has a finite fractional part ( e . g . 15.600 ); a repeating decimal, which has an infinite ( non-terminating ) fractional part made up of a repeating sequence of digits ( e . g . 5.123 144 ); or an infinite decimal, which has a fractional part that neither terminates nor has an infinitely repeating pattern ( e . g . 3.14159265 . . . ).
I am basing this on the rule that, to convert a repeating decimal to a fraction, you just take only the group of numbers that repeats over a number of " 9's " equaling the number of numbers that repeats, i . e ., . 732732 . . . ( Repeating ) = 732 / 999 . And, if so, then what number comes right before . 9 ( Repeating ) in terms of size ? Preceding contribs ) 20 : 10, 8 November 2007 ( UTC)
:: : : : The worst case scenario is going to be an irrational whose decimal remainder is something like . 213456, which will lie half way between our options of . 142857 and . 285714-- in which case we can change from fractions over 7 to more suitable higher prime denominators such as 17 with its 16 repeating decimals : 1 / 17 = 0.0588235294117647 and its 16 more precise . 05, . 11, . 17, . 23, . 29, etc . ) optional remainders.

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