OHLC Tool allows you to display Current or Historical OHLC Values as horizontal lines that extend to the right on your chart. Features Variable Lookback to display a specific historical bar's values. Default = 1 (Previous Candle) Customizable Timeframe to view HTF Candle values. Custom Line Colors, Styles, and Thicknesses. Price Scale Value Display...
Hello traders. I created this simple indicator to use as a FILTER. He does not provide any operational signals but tells us if we are in a period of volatility compression or expansion and it can work on all market. This filter works great for all strategies that work on breakouts The concept is this: I will enter at breakout of a price level that I consider...
-shows week-on-week % change, and 10yr averages of these % changes -scan across the 10yr averages to get a good idea of the seasonality of an asset -best used on commodities with strong seasonal tendencies (Gold, Wheat, Coffee, Lean hogs etc) -works only on daily timeframe -by default it will compare SMA(length) in the following way, BTC: Sunday cf previous Sunday...
💡 Objective This script is a rebuild of the pre-existing ATR indicator, with improvements and fine-tuning. 🪄Improvements 1. Normalization option (range 0 to 100) 2. Optional calculation of the ratio between current volatility and average volatility 3. Optional smoothing 4. Show a moving average 5. Show Bollinger Bands with 3 bands 6. Change bar...
A quick and easy "at a glance" display for the viewable candles. It does repaint, but that is a non-issue, as it is simply a quick and handy tool to visually see a quick peek at the visible range. The highest, lowest, and average are displayed, with labels for the percentage distance from the current close value and total range. Automatic color for each based on...
This indicator shows the expected range of movement of price given the assumption that price is log-normally distributed. This includes 3 multiples of standard deviation and 1 user selected level input as a multiple of standard deviation. Expected assumes that volatility remains static on the next bar. In reality, this may or may not be the case, so use caution...
Displays the Implied Volatility, which is usually calculated from options, but here is calculated indirectly from spot price directly, either using a model or model-free using the VIXfix. The model-free VIXfix based approach can detect times of high volatility, which usually coincides with panic and hence lowest prices. Inversely, the model-based approach can...
Multi-Panel: Trade-Volatility-Probability shows user selected and volatility-based price levels and probabilities on the chart. This is useful for both options and all styles of up/down trading methods that rely on volatility. Trading Panel: Shows trading information to take profits and stop-loss based on multiples of volatility. Also shows equity inputs by...
When it comes to forecasting volatility, it seems that the old axiom about weather is applicable: "Everyone talks about it, but no one can do much about it!" Volatility cones are a tool that may be useful in one’s attempt to do something about predicting the future volatility of an asset. A "volatility cone" is a plot of the range of volatilities within a fixed...
↕ ATR - Average True Range + Dynamic Trend w/ Signals | by Octopu$ What is ATR? ATR stands for Average True Range A Technical Analysis Indicator that measures market volatility by decomposing the range of a Security Price in a specific period. The ATR can be used as a High Low Spectrum, As well as a variation of a Moving Average, considering the ranges on a...
dear fellows, this indicator is an effort to determine the range where the prices are likely to fall within in the current candle. how it is calculated 1. obtain a. gain from the open to the high b. loss from the open to the low in the last 20 (by default) candles and in the last 200 (10*20 by default) candles 2. perform a. the geometric average (sma of the...
This indicator is for educational purposes to lay the groundwork for future closed/open source indicators. Some of thee future indicators will employ parameter estimation methods described below, others will require complex solvers such as the Nelder-Mead algorithm on log likelihood estimations to derive optimal parameter values for omega, gamma, alpha, and beta...
For a reset option type 2, the strike is reset in a similar way as a reset option 1. That is, the strike is reset to the asset price at a predetermined future time, if the asset price is below (above) the initial strike price for a call (put). The payoff for such a reset call is max(S - X, 0), and max(X - S, 0) for a put, where X is equal to the original strike X...
These options can be exercised at their initial maturity date /I but are extended to T2 if the option is out-of-the-money at ti. The payoff from a writer-extendible call option at time T1 (T1 < T2) is (via "The Complete Guide to Option Pricing Formulas") c(S, X1, X2, t1, T2) = (S - X1) if S>= X1 else cBSM(S, X2, T2-T1) and for a writer-extendible put is ...
In a reset call (put) option, the strike is reset to the asset price at a predetermined future time, if the asset price is below (above) the initial strike price. This makes the strike path-dependent. The payoff for a call at maturity is equal to max((S-X)/X, 0) where is equal to the original strike X if not reset, and equal to the reset strike if reset....
A fade-in call has the same payoff as a standard call except the size of the payoff is weighted by how many fixings the asset price were inside a predefined range (L, U). If the asset price is inside the range for every fixing, the payoff will be identical to a plain vanilla option. More precisely, for a call option, the payoff will be max(S(T) - X, 0) X 1/n...
A log contract, first introduced by Neuberger (1994) and Neuberger (1996), is not strictly an option. It is, however, an important building block in volatility derivatives (see Chapter 6 as well as Demeterfi, Derman, Kamal, and Zou, 1999). The payoff from a log contract at maturity T is simply the natural logarithm of the underlying asset divided by the strike...
A log option introduced by Wilmott (2000) has a payoff at maturity equal to max(log(S/X), 0), which is basically an option on the rate of return on the underlying asset with strike log(X). The value of a log option is given by: (via "The Complete Guide to Option Pricing Formulas") e^−rT * n(d2)σ√(T − t) + e^−rT*(log(S/K) + (b −σ^2/2)T) * N(d2) where N(*) is...