W. D. Gann, RN Elliott, and L. Fibonacci, all have developed methods that may be useful for designing future areas that may be significant both for the price, and for the time. Some of the following statements can be for someone seem controversial, as many of the methods have not been validated in terms of theoretical academic standards. Counter-argument would be that a specific reason that the principles could be of some value, is that they can provide the trader profits. DP Morgan was a very successful trader, perhaps one of the greatest of all time. From his records we can conclude that he agrees with the methods Hanna, Elliott and Fibonacci. He said, "Anyone can become a millionaire, but if you want to become a millionaire, then you need astronomer. I think he meant the ratio of price and time that have been associated as a "spatial correlation".
Fibonacci found that a number of numbers, which increased 1,618 times, is very important. He found that this series has been almost universal in nature, from the structure or composition of plants and animals. A number consists of 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, etc. What is interesting - is that the ratio can be achieved many different ways and still come to the same outcome. The following will show that the time and price are directly linked. But first, a small mathematical puzzle.
Record on the sheet of paper, any two numbers. Start the Fibonacci sequence by adding the first number by the second number to create a third. Continue to add pairs of numbers to get the next number in sequence. For example: 72, 81, 153, 234, 387, 621, 1008, 1629, 2637, 4266, etc. (note that this is not the usual Fibonacci numbers). Large numbers in a row, regardless of what numbers are used as a starting point, lead to a ratio of 1.618 (ie 2637 * 1.618 = 4266).
Fibonacci found that this ratio - 1.618 is of great importance, and use it everywhere in his works. Please note the following:
0,382 * 1,618 = 0,618
0,618 * 1,618 = 1,000
1,000 * 1,618 = 1,618
1,618 * 1,618 = 2,618
With regard to the first schedule, please note the use of the ratio of 1.618 as follows:On the left side of the existing scale reconstruction, depicting the range of the Fibonacci from 173,374 to 177,242. Using the principles of Fibonacci expansion, the subsequent maximum 179,633 would be an area which can be regarded as essential for the observation. Pay attention to the Fibonacci circles, using the same ratio. These instruments are functioning and back and forth in time and price. Gann and Fibonacci ratios are a few that are more significant than the other 90, 180, 270, and 360 degrees of rotation can be noted as a point of interest on the price and on time. If the tool shows at least two of these points of interaction, it has the potential to be significant in the third or fourth place. Please note that each time the price came in contact with the circle was a change in the direction of market movement. These interactions may hold the price in advance or rewind through many of the subsequent quarters.
On this chart the same building used by the previous minimum, and again shows multiple points of interaction as a significant advance, and back in time and price. Circles can be placed on the schedule in advance in anticipation of significant areas, using the Fibonacci tool circles.A number of the Fibonacci numbers to be used in the circles and the restoration of Fibonacci. RN Elliot used the same sequence as the cornerstone in the development of Elliott waves. Elliott found that several models have been very ordinary, which show these relationships. It is necessary to bear in mind one very important thing - is that there are many continuous interactions at various levels. The same or opposite structure can exist at 1-minute, 15-minute, 45-minute, day, week, or monthly schedule. The interaction of various structures of the schedule may be important because it can reaffirm the point or area that may be essential for further movement.
This graph shows the Fibonacci series using the ratio of 1.618. Please note, as a tool to identify important areas for further movement. The first line in the bar 8 is located close to the first peak. Line 13 indicates the end of accumulation and the beginning of the next wave up to the line 21 and another peak. Please note, as some continue to be effective in indication of the future of important areas in bars 34, 55 and 89.
This figure represents the daily schedule of $ Compq. Shown in the chart the Fibonacci levels are built from each visually significant peak or minimum. Shows two reconstruction, one measures the distance of the maximum 24.01.01g. to minimize 04.04.01g. Another measures the distance from minimum 04.04.01g. to the most recent peak 22.05.01g. Whenever there is a restoration of a minimum price movement in 38.2%, the point from which recovery must mention the effective range for the Fibonacci point. Look at this graph that the minimum 04.04.01g. is the starting point of the circle, which uses a maximum 22.05.01g. as the range of 1.000. Other terms may be constructed from the maximum 24.01.01g. Which uses a minimum 22.04.01g. as a range of 1.000.
This graph shows the Hanna Square, beginning at the previous minimum, which shows many points of interaction with a fan-line as the price movement. Squares generally best to build a visually significant maxima or minima. Although many shapes and sizes of the square can be used and be useful, some have demonstrated more consistent results. These parameters include the height to width (increasing to intervals) 1x1, 1x5, 5x1, 10x1 and 1x10. (For more information, see "Geometry Hanna" in the number 21)Another method of construction is to use a square of nine Hanna, to compute the natural sizes. (For more information, see "Numerology Hanna" at number 28)
I believe that each of the 8 allegations can be tested and proved if there is sufficient desire, time and resources. Obviously, this is a rather bold claim, but inspection of individual parts of the approval of the academic theorists ceased significant results.
1. Time predicts time. Time can be used to offer future significant area, by calculating the different time series. Some of the possible use include: a maximum to a minimum, at least to the maximum, maximum and minimum to maximum to a minimum. Tools that are available for this task include the cycle, square and fan-Line Hanna; cycle, circles and arcs Fibonacci.
2. Price predicts price. Price can be used to offer future significant area, by calculating various price series. Some of the possible use include: maximum to maximum, minimum, to a minimum, maximum and minimum to maximum to a minimum. Tools that are available for this task include the square and the fan through Hanna, the restoration of the Fibonacci and Elliott Wave.
3. Time predicts price. Time can be used to propose a future point, re-level or increment in the price. Tools that are available for this task include the fan-line and squared Hanna, circles and arcs Fibonacci.
4. Price predicts time. Price can be used to propose a future point, re-level or the increment in time. Tools that are available for this task include the fan-line and squared Hanna, circles and arcs Fibonacci.
5. Time predicts the price and time. Time can be used to suggest future points in price and time. Tools that are available for this task include the fan-line and squared Hanna, circles and arcs Fibonacci.
6. Price predicts the cost and time. Price can be used to suggest future points in price and time. Tools that are available for this task include the fan-line and squared Hanna, circles and arcs Fibonacci.
7. Price and time are predicting the price. Price and Time may be used in combination to offer a future point in price. Tools that are available for this task include the fan-line and squared Hanna, circles and arcs Fibonacci.
8. Price and Time predict Time. Price and Time may be used in combination to offer a future point in time. Tools that are available for this task include the fan-line and squared Hanna, circles and arcs Fibonacci.
Numbers or number can be created by any of the following methods and in so doing may well be viable: addition, subtraction, multiplication, division, erection of a square or square root calculation.
Relationships can also be represented graphically in simple geometric shapes: circle, triangle, square. They can be submitted in two or three dimensions: from the square to the cube of the circle to the sphere, etc. Three-dimensional representations can often demonstrate the speed of the price.
I feel useful when multiple methods lead to the same result. This means that the identification of areas may become essential for the movement and can provide profitable opportunities for traders.
No comments:
Post a Comment