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- For example, to do1/5 -2/3 do 2/3 -1/5 to get 7/15 and read the answer as -7/15 A reduced fraction is a common fraction in its simplest possible form. To get this, both the top and bottom numbers of the fraction are divided by the SAME NUMBER, and this is repeated if necessary until it is impossible to do so anymore. For example, to reduce 150/240.
- Note: A newer security-fix release, 3.2.6, is currently available.Its use is recommended. Python 3.2 was released on February 20th, 2011. Python 3.2 is a continuation of the efforts to improve and stabilize the Python 3.x line.
- ENZYME entry: EC 3.2.1.26. Accepted Name; Beta-fructofuranosidase. Alternative Name(s) Beta-fructosidase. Reaction catalysed; Hydrolysis of terminal non-reducing beta-D-fructofuranoside residues in beta-D-fructofuranosides: Comment(s) Substrates include sucrose. Also catalyzes fructotransferase reactions.
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First six summands drawn as portions of a square.
The geometric series on the real line.
In mathematics, the infinite series1/2 + 1/4 + 1/8 + 1/16 + ··· is an elementary example of a geometric series that converges absolutely.
There are many different expressions that can be shown to be equivalent to the problem, such as the form: 2−1 + 2−2 + 2−3 + ..
The sum of this series can be denoted in summation notation as:
Proof[edit]
As with any infinite series, the infinite sum
is defined to mean the limit of the sum of the first n terms
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as n approaches infinity.
Multiplying sn by 2 reveals a useful relationship:
Subtracting sn from both sides,
As n approaches infinity, sntends to 1.
History[edit]
Zeno's paradox[edit]
This series was used as a representation of many of Zeno's paradoxes, one of which, Achilles and the Tortoise, is shown here.[1] In the paradox, the warrior Achilles was to race against a tortoise. The track is 100 meters long. Achilles could run at 10 m/s, while the tortoise only 5. The tortoise, with a 10-meter advantage, Zeno argued, would win. Achilles would have to move 10 meters to catch up to the tortoise, but by then, the tortoise would already have moved another five meters. Achilles would then have to move 5 meters, where the tortoise would move 2.5 meters, and so on. Zeno argued that the tortoise would always remain ahead of Achilles.
The Eye of Horus[edit]
The parts of the Eye of Horus were once thought to represent the first six summands of the series.[2]
In a myriad ages it will not be exhausted[edit]
'Zhuangzi', also known as 'South China Classic', written by Zhuang Zhou. In the miscellaneous chapters 'All Under Heaven', he said: 'Take a chi long stick and remove half every day, in a myriad ages it will not be exhausted.'
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See also[edit]
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References[edit]
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- ^Wachsmuth, Bet G. 'Description of Zeno's paradoxes'. Archived from the original on 2014-12-31. Retrieved 2014-12-29.
- ^Stewart, Ian (2009). Professor Stewart's Hoard of Mathematical Treasures. Profile Books. pp. 76–80. ISBN978 1 84668 292 6.
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