Brompton Wellington Square Etf Market Value
| BBBB Etf | 19.84 0.05 0.25% |
| Symbol | Brompton |
Brompton Wellington 'What if' Analysis
In the world of financial modeling, what-if analysis is part of sensitivity analysis performed to test how changes in assumptions impact individual outputs in a model. When applied to Brompton Wellington's etf what-if analysis refers to the analyzing how the change in your past investing horizon will affect the profitability against the current market value of Brompton Wellington.
| 10/28/2025 |
| 01/26/2026 |
If you would invest 0.00 in Brompton Wellington on October 28, 2025 and sell it all today you would earn a total of 0.00 from holding Brompton Wellington Square or generate 0.0% return on investment in Brompton Wellington over 90 days.
Brompton Wellington Upside/Downside Indicators
Understanding different market momentum indicators often help investors to time their next move. Potential upside and downside technical ratios enable traders to measure Brompton Wellington's etf current market value against overall market sentiment and can be a good tool during both bulling and bearish trends. Here we outline some of the essential indicators to assess Brompton Wellington Square upside and downside potential and time the market with a certain degree of confidence.
| Downside Deviation | 0.3218 | |||
| Information Ratio | (0.28) | |||
| Maximum Drawdown | 1.41 | |||
| Value At Risk | (0.30) | |||
| Potential Upside | 0.3559 |
Brompton Wellington Market Risk Indicators
Today, many novice investors tend to focus exclusively on investment returns with little concern for Brompton Wellington's investment risk. Other traders do consider volatility but use just one or two very conventional indicators such as Brompton Wellington's standard deviation. In reality, there are many statistical measures that can use Brompton Wellington historical prices to predict the future Brompton Wellington's volatility.| Risk Adjusted Performance | 0.0284 | |||
| Jensen Alpha | 0.0014 | |||
| Total Risk Alpha | (0.02) | |||
| Sortino Ratio | (0.19) | |||
| Treynor Ratio | 0.0904 |
Brompton Wellington January 26, 2026 Technical Indicators
| Cycle Indicators | ||
| Math Operators | ||
| Math Transform | ||
| Momentum Indicators | ||
| Overlap Studies | ||
| Pattern Recognition | ||
| Price Transform | ||
| Statistic Functions | ||
| Volatility Indicators | ||
| Volume Indicators |
| Risk Adjusted Performance | 0.0284 | |||
| Market Risk Adjusted Performance | 0.1004 | |||
| Mean Deviation | 0.135 | |||
| Semi Deviation | 0.1851 | |||
| Downside Deviation | 0.3218 | |||
| Coefficient Of Variation | 1425.2 | |||
| Standard Deviation | 0.2223 | |||
| Variance | 0.0494 | |||
| Information Ratio | (0.28) | |||
| Jensen Alpha | 0.0014 | |||
| Total Risk Alpha | (0.02) | |||
| Sortino Ratio | (0.19) | |||
| Treynor Ratio | 0.0904 | |||
| Maximum Drawdown | 1.41 | |||
| Value At Risk | (0.30) | |||
| Potential Upside | 0.3559 | |||
| Downside Variance | 0.1036 | |||
| Semi Variance | 0.0343 | |||
| Expected Short fall | (0.16) | |||
| Skewness | (0.91) | |||
| Kurtosis | 4.7 |
Brompton Wellington Backtested Returns
As of now, Brompton Etf is very steady. Brompton Wellington secures Sharpe Ratio (or Efficiency) of 0.063, which signifies that the etf had a 0.063 % return per unit of risk over the last 3 months. We have found twenty-eight technical indicators for Brompton Wellington Square, which you can use to evaluate the volatility of the entity. Please confirm Brompton Wellington's Risk Adjusted Performance of 0.0284, mean deviation of 0.135, and Downside Deviation of 0.3218 to double-check if the risk estimate we provide is consistent with the expected return of 0.0141%. The etf shows a Beta (market volatility) of 0.0619, which signifies not very significant fluctuations relative to the market. As returns on the market increase, Brompton Wellington's returns are expected to increase less than the market. However, during the bear market, the loss of holding Brompton Wellington is expected to be smaller as well.
Auto-correlation | 0.23 |
Weak predictability
Brompton Wellington Square has weak predictability. Overlapping area represents the amount of predictability between Brompton Wellington time series from 28th of October 2025 to 12th of December 2025 and 12th of December 2025 to 26th of January 2026. The more autocorrelation exist between current time interval and its lagged values, the more accurately you can make projection about the future pattern of Brompton Wellington price movement. The serial correlation of 0.23 indicates that over 23.0% of current Brompton Wellington price fluctuation can be explain by its past prices.
| Correlation Coefficient | 0.23 | |
| Spearman Rank Test | 0.36 | |
| Residual Average | 0.0 | |
| Price Variance | 0.0 |
Pair Trading with Brompton Wellington
One of the main advantages of trading using pair correlations is that every trade hedges away some risk. Because there are two separate transactions required, even if Brompton Wellington position performs unexpectedly, the other equity can make up some of the losses. Pair trading also minimizes risk from directional movements in the market. For example, if an entire industry or sector drops because of unexpected headlines, the short position in Brompton Wellington will appreciate offsetting losses from the drop in the long position's value.The ability to find closely correlated positions to Brompton Wellington could be a great tool in your tax-loss harvesting strategies, allowing investors a quick way to find a similar-enough asset to replace Brompton Wellington when you sell it. If you don't do this, your portfolio allocation will be skewed against your target asset allocation. So, investors can't just sell and buy back Brompton Wellington - that would be a violation of the tax code under the "wash sale" rule, and this is why you need to find a similar enough asset and use the proceeds from selling Brompton Wellington Square to buy it.
The correlation of Brompton Wellington is a statistical measure of how it moves in relation to other instruments. This measure is expressed in what is known as the correlation coefficient, which ranges between -1 and +1. A perfect positive correlation (i.e., a correlation coefficient of +1) implies that as Brompton Wellington moves, either up or down, the other security will move in the same direction. Alternatively, perfect negative correlation means that if Brompton Wellington moves in either direction, the perfectly negatively correlated security will move in the opposite direction. If the correlation is 0, the equities are not correlated; they are entirely random. A correlation greater than 0.8 is generally described as strong, whereas a correlation less than 0.5 is generally considered weak.
Correlation analysis and pair trading evaluation for Brompton Wellington can also be used as hedging techniques within a particular sector or industry or even over random equities to generate a better risk-adjusted return on your portfolios.