So utilizing Fibonacci retracements alone with out different tools or affirmation signals (like worth bounce-off) won’t give a concrete estimation as as to if and when the worth is going to proceed with the development. You can figure out which kind of reversal is happening when you have an understanding of how retail traders think when they’re participating in a trending market. Upon touching the 50% level the market produced a bearish engulf candlestick, whereas not finest engulf ever seen in phrases of characteristics it was still possible to put a sell trade based mostly on this engulf.
![how to use fibonacci retracement in forex](data:image/jpg;base64,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)
One cause why Fibonacci retracements are so well-liked is that they’re future-facing, unlike many different tools for plotting assist and resistance which depend on past data. As quickly as a move is completed, you can use the software to plot possible support or resistance ranges, without waiting for extra knowledge. To use Fibonacci retracement in your trading, you plot the place potential assist or resistance levels may land primarily based on a current vital transfer and plan your method accordingly. The software merely takes the entirety of the trendline you’ve drawn and calculates retracement levels utilizing the share forms of the Fibonacci ratios.
And Turn Out To Be An Expert Foreign Exchange Dealer
Don’t fear, we’ll clarify retracements, extensions, and most importantly, how to grab some pips utilizing the Fibonacci software within the following classes. ” moment when he found a easy collection of numbers that created ratios describing the pure proportions of issues in the universe. Later on, round July 14, the market resumed its upward move and finally broke via the swing excessive. Then, for downtrends, click on on the Swing High and drag the cursor to the newest Swing Low.
![how to use fibonacci retracement in 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)
This is often seen as crucial Fibonacci ratio, and has makes use of throughout mathematics – not simply in trading. The golden ratio has been recorded showing in every thing from classical art to bee populations to plant seed formations. Using our first ratio above, we would predict that the following retracement will end at sixty one.8% of the original move – or in other words, that gold might fall 61.8 factors to $1,838.2 before resuming its rally. Fibonacci retracements may additionally be used to add further weight to certain chart patterns, or even in Elliott wave theory. 38.2% -This ratio is discovered by dividing a quantity in the sequence by the number two places to its proper. Though the concept behind it’s rooted in 13th-century arithmetic, understanding Fibonacci retracements doesn’t need to be sophisticated.
Firstly, you have to have a glance at a price chart and select two worth points – one excessive price level and one low worth point. It’s essential to make sure that there are no greater highs or decrease lows. If you establish them mistakenly, your calculations will be wrong and you’ll miss the best retracements ranges. Then, as soon as you’ve discovered the excessive and the low, you should use these two numbers in the formulation and calculate retracement levels for this specific value Understanding Share Retracements In Stock Markets Finschool motion sector. It’s essential so that you can perceive, though a lot of the examples I’ve proven you over the second half of this article have been taken from big trends available in the market like EUR/USD – USD/JPY the concepts described apply to developments you discover on any time frame. A deep pullback on the 1 minute chart is the same as a deep pullback on the weekly chart like we noticed within the USD/JPY example, the only distinction is the amount of merchants who might be placing trades on the pullback movement.
I’ll launch an article quickly detailing the use of the 76.4% level and clarify to you why its essential for spotting market reversals. First it touched the 50% level which triggered a slight down-move after which it tapped the 61.8% stage which ended up inflicting the reversal. The method you draw Fibonacci retracements on down-swings is by locating the swing excessive and swing low of the swing down, then draw your Fibonacci ranges from the swing high all the finest way right down to the swing low.
Blueberry Markets supplies you with a set of a quantity of timeframe charts that you ought to use to analyse the market movement and decide your preferred Fibonacci retracement stage and make profitable market entry and exit choices. There may be some retracements inside a development, after which the value returns again on monitor.
Information To Forex Trading Indicators
In order to find these Fibonacci retracement ranges, you must discover the current vital Swing Highs and Swings Lows. And to go brief (or sell) on a retracement at a Fibonacci resistance stage when the market is trending DOWN. When a pattern is reversing the market will come again to both the decrease levels – 23.6% – 38.2% or the higher ranges – 50% – sixty one.8% relying on which sort of reversal is happening. You can see on the picture the Fibonacci grid accommodates a fifth stage which I didn’t show you earlier.
![how to use fibonacci retracement in forex](data:image/jpg;base64,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)
While Fibonacci ratios are highly valued by many traders, they aren’t foolproof indicators. The first step is to confirm the overarching pattern and determine if the market is in an total uptrend or downtrend. Fibonacci tools might look slightly completely different from one charting platform to the following, but they principally all perform in the same method. You also wants to check if the tool’s preset levels embody all of the ratios you’re interested in.
22.6%, 38.2%, 50%, sixty one.8% and 78.6% are the preferred and formally used retracement ranges. The finest time-frame to establish Fibonacci retracements is a 30-to-60-minute candlestick chart, because it allows you to focus on the every day market swings at regular intervals.
What Are Fibonacci Retracement Levels?
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- This helps merchants see at which point the value could return again to a previous stage earlier than continuing on with the pattern.
- Later on, round July 14, the market resumed its upward transfer and eventually broke by way of the swing excessive.
- However, if the inventory breaks via these levels, merchants could contemplate exiting their positions, as this could signal that the inventory is losing momentum.
- Unfortunately the dealer is wrong, the market hasn’t reversed due to it hitting the 76.8 stage, its reversed because the market has moved down sufficient to make retail traders consider the downtrend is going to continue.
- We trade Fibonacci retracements in an analogous approach to how we trade different technical evaluation tools like help and resistance and supply and demand.
Now that you realize the formulation for Fibonacci retracement levels, you’ll find a way to learn to truly calculate them. Do not make the identical mistake as many traders and draw them from the swing high to the swing low, the degrees won’t be correct. Of course, how these levels apply to your chart will rely upon whether or not you’re plotting retracements on an upward or downward move. You’ll at all times need the zero level in your drawing to be at the beginning of the retracement – so $1,900 on our gold example. The 100 percent stage, however, is firstly of the preliminary important move ($1,800 above). These strains are seen as potential areas of future help or resistance, indicating when the retracement of your unique move might finish.
Breakout traders, on the other hand, might use Fibonacci extensions to resolve when a development might ultimately peter out – once more, so as to spot a possible exit or plan danger vs reward. Fibonacci and Oscillators – Oscillators like RSI or Stochastic help establish overbought/oversold conditions. If the RSI exhibits oversold situations and the price retraces to a key Fibonacci degree, it strengthens the likelihood of a reversal taking part in out.
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In this case, Fibonacci retracement ranges can show you when the price is more doubtless to encounter support and resistance and proceed shifting with the general trend. You can use this data to find essentially the most suitable time to enter a trade and even set up automated entry points at the retracement ranges. Fibonacci retracement is a way utilized in technical evaluation to foretell future areas of support or resistance after a big market move. It entails utilizing a drawing tool that highlights doubtlessly important worth action levels based on Fibonacci principle. These Fibonacci retracement strains can then be used to establish areas where the worth could potentially experience assist or resistance.
These 4 ranges present you what proportion the market has moved back into the swing, when you had drawn a retracement on a up-swing and you see the market fall to the 50% Fibonacci degree, it means the market has pulled back midway of the whole up-swing. These platforms mirror real buying and selling actions, however they don’t engage with genuine cash or property. Any earnings, income, or losses experienced within this simulated trading context don’t translate to actual financial outcomes and cannot be claimed or actualized beyond this instructional context. It’s not a dealer, and it doesn’t ‎market for any brokerage providers.‎ CTI FZCO doesn’t act as or conduct services as a custodian. All program fees are used for operation costs including, but not limited to, staff, expertise and other business-related bills. Information on this website just isn’t directed at residents in any country or jurisdiction the place such distribution or use can be opposite to native law or regulation.