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Fibonacci retracement is a popular tool that technical traders use to help identify strategic places for transactions, stop losses or target prices to help traders get in at a good price. The main idea behind the tool is the support and resistance values for a currency pair trend at which the most important breaks or bounces can appear.
A Fibonacci 31 bit linear feedback shift register with taps at positions 28 and 31, giving it a maximum cycle and period at this speed of nearly 6.7 years. The bit positions that affect the next state are called the taps. In the diagram the taps are [16,14,13,11]. The rightmost bit of the LFSR is called the output bit, which is always also a tap.
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Fibonacci retracement is a pseudo-scientific technique on a par with financial astrology, Gann theory, ermanometry etc. This ABSOLUTELY needs to be stated in the article. — Preceding unsigned comment added by 82.210.144.211 ( talk ) 20:09, 10 February 2011 (UTC) [ reply ]
Retracement in finance is a complete or partial reversal of the price of a security or a derivative from its current trend, thereby creating a temporary counter-trend. Not to be confused with Fibonacci Retracement , market correction and/or market reversal , which are the most popular types of retracements.
The usual Fibonacci numbers are a Fibonacci sequence of order 2. The cases n = 3 {\displaystyle n=3} and n = 4 {\displaystyle n=4} have been thoroughly investigated. The number of compositions of nonnegative integers into parts that are at most n {\displaystyle n} is a Fibonacci sequence of order n {\displaystyle n} .
The reciprocal Fibonacci constant ψ is the sum of the reciprocals of the Fibonacci numbers: = = = + + + + + + + +. Because the ratio of successive terms tends to the reciprocal of the golden ratio, which is less than 1, the ratio test shows that the sum converges.
As with the Fibonacci numbers, each Lucas number is defined to be the sum of its two immediately previous terms, thereby forming a Fibonacci integer sequence. The first two Lucas numbers are L 0 = 2 {\displaystyle L_{0}=2} and L 1 = 1 {\displaystyle L_{1}=1} , which differs from the first two Fibonacci numbers F 0 = 0 {\displaystyle F_{0}=0 ...