XFXX
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Try AutoTrade for free. We'll give you $100,000 in a Simulated Broker Account to AutoTrade XFXX.
Free AutoTradeJan  Feb  Mar  Apr  May  Jun  Jul  Aug  Sep  Oct  Nov  Dec  YTD  

2012  (5%)  (5.3%)                      (10%) 
2013                          0.0 
2014                          0.0 
2015                          0.0 
2016                          0.0 
2017          0.0 
Model Account Details
A trading strategy on Collective2. Follow it in your broker account, or use a free simulated trading account.
Advanced users may want to use this information to adjust their AutoTrade scaling, or merely to understand the magnitudes of the nearby chart.
Started  $5,000  
Buy Power  $5,000  
Cash  $5,000  
Equity  $0  
Cumulative $  $0  
Total System Equity  $5,000  
Margined  $0  
Open P/L  $0 
Open positions are hidden from nonsubscribers.
Statistics
 Strategy began1/3/2012
 Starting Unit Size$5,000
 Strategy Age (days)1935.1
 Age65 months ago
 What it trades
 # Trades0
 # Profitable0
 % Profitablen/a
 Avg trade duration
 Max peaktovalley drawdown%
 drawdown periodDec ,  Dec ,
 Annual return (compounded)0.0%
 Avg win
 Avg loss
 Model Account Values (Raw)
 Cash$5,000
 Margin Used$0
 Buying Power$5,000
 Ratios
 W:L ratio
 Sharpe Ratio
 Sortino Ratio18.547
 Calmar Ratio
 Return Statistics
 Ann Return (Compnd, No Fees)n/a
 Risk of Ruin (MonteCarlo)
 Chance of 10% account lossn/a
 Chance of 20% account lossn/a
 Chance of 30% account lossn/a
 Chance of 40% account lossn/a
 Chance of 50% account lossn/a
 Popularity
 Popularity (Today)0
 Popularity (Last 6 weeks)0
 TradesOwnSystem Certification
 Trades Own System?0
 TOS percentn/a
 Subscription Price
 Billing Period (days)30
 Trial Days7
 Win / Loss
 Avg Loss$0
 Avg Win$0
 # Winners0
 # Losers0
 Analysis based on MONTHLY values, full history
 RATIO STATISTICS
 Ratio statistics of excess return rates
 Statistics related to Sharpe ratio
 Mean0.00995
 SD0.00000
 Sharpe ratio (Glass type estimate)0.00000
 Sharpe ratio (Hedges UMVUE)0.00000
 df0.00000
 t0.00000
 p0.00000
 Lowerbound of 95% confidence interval for Sharpe Ratio0.00000
 Upperbound of 95% confidence interval for Sharpe Ratio0.00000
 Lowerbound of 95% CI (Gibbons, Hedeker & Davis approximation0.00000
 Upperbound of 95% CI (Gibbons, Hedeker & Davis approximation0.00000
 Statistics related to Sortino ratio
 Sortino ratio3.46410
 Upside Potential Ratio0.00000
 Upside part of mean0.00000
 Downside part of mean0.00995
 Upside SD0.00000
 Downside SD0.00287
 N nonnegative terms0.00000
 N negative terms18.00000
 Statistics related to linear regression on benchmark
 N of observations18.00000
 Mean of predictor0.37489
 Mean of criterion0.00995
 SD of predictor0.20597
 SD of criterion0.00000
 Covariance0.00000
 r0.00000
 b (slope, estimate of beta)0.00000
 a (intercept, estimate of alpha)0.00000
 Mean Square Error0.00000
 DF error0.00000
 t(b)0.00000
 p(b)0.00000
 t(a)0.00000
 p(a)0.00000
 Lowerbound of 95% confidence interval for beta0.00000
 Upperbound of 95% confidence interval for beta0.00000
 Lowerbound of 95% confidence interval for alpha0.00000
 Upperbound of 95% confidence interval for alpha0.00000
 Treynor index (mean / b)0.00000
 Jensen alpha (a)0.00000
 Ratio statistics of excess log return rates
 Statistics related to Sharpe ratio
 Mean0.00995
 SD0.00000
 Sharpe ratio (Glass type estimate)12873400000000000.00000
 Sharpe ratio (Hedges UMVUE)12295600000000000.00000
 df17.00000
 t15766700000000000.00000
 p1.00000
 Lowerbound of 95% confidence interval for Sharpe Ratio0.00000
 Upperbound of 95% confidence interval for Sharpe Ratio0.00000
 Lowerbound of 95% CI (Gibbons, Hedeker & Davis approximation16428500000000000.00000
 Upperbound of 95% CI (Gibbons, Hedeker & Davis approximation8162650000000000.00000
 Statistics related to Sortino ratio
 Sortino ratio3.46410
 Upside Potential Ratio0.00000
 Upside part of mean0.00000
 Downside part of mean0.00995
 Upside SD0.00000
 Downside SD0.00287
 N nonnegative terms0.00000
 N negative terms18.00000
 Statistics related to linear regression on benchmark
 N of observations18.00000
 Mean of predictor0.35025
 Mean of criterion0.00995
 SD of predictor0.19795
 SD of criterion0.00000
 Covariance0.00000
 r0.00000
 b (slope, estimate of beta)0.00000
 a (intercept, estimate of alpha)0.00995
 Mean Square Error0.00000
 DF error16.00000
 t(b)0.00000
 p(b)0.50000
 t(a)13539700000000000.00000
 p(a)1.00000
 Lowerbound of 95% confidence interval for beta0.00000
 Upperbound of 95% confidence interval for beta0.00000
 Lowerbound of 95% confidence interval for alpha0.00995
 Upperbound of 95% confidence interval for alpha0.00995
 Treynor index (mean / b)40787300000000002376801011630080.00000
 Jensen alpha (a)0.00995
 Risk estimates for a oneperiod unit investment (parametric)
 assuming log normal returns and losses (using central moments from Sharpe statistics)
 VaR(95%)0.00083
 Expected Shortfall on VaR0.00083
 assuming Pareto losses only (using partial moments from Sortino statistics)
 VaR(95%)0.00083
 Expected Shortfall on VaR0.00083
 ORDER STATISTICS
 Quartiles of return rates
 Number of observations18.00000
 Minimum1.00000
 Quartile 11.00000
 Median1.00000
 Quartile 31.00000
 Maximum1.00000
 Mean of quarter 11.00000
 Mean of quarter 21.00000
 Mean of quarter 31.00000
 Mean of quarter 41.00000
 Inter Quartile Range0.00000
 Number outliers low0.00000
 Percentage of outliers low0.00000
 Mean of outliers low0.00000
 Number of outliers high0.00000
 Percentage of outliers high0.00000
 Mean of outliers high0.00000
 Risk estimates for a oneperiod unit investment (based on Ex
 Extreme Value Index (moments method)0.00000
 VaR(95%) (moments method)0.00000
 Expected Shortfall (moments method)0.00000
 Extreme Value Index (regression method)0.00000
 VaR(95%) (regression method)0.00000
 Expected Shortfall (regression method)0.00000
 DRAW DOWN STATISTICS
 Quartiles of draw downs
 Number of observations0.00000
 Minimum0.00000
 Quartile 10.00000
 Median0.00000
 Quartile 30.00000
 Maximum0.00000
 Mean of quarter 10.00000
 Mean of quarter 20.00000
 Mean of quarter 30.00000
 Mean of quarter 40.00000
 Inter Quartile Range0.00000
 Number outliers low0.00000
 Percentage of outliers low0.00000
 Mean of outliers low0.00000
 Number of outliers high0.00000
 Percentage of outliers high0.00000
 Mean of outliers high0.00000
 Risk estimates based on draw downs (based on Extreme Value T
 Extreme Value Index (moments method)0.00000
 VaR(95%) (moments method)0.00000
 Expected Shortfall (moments method)0.00000
 Extreme Value Index (regression method)0.00000
 VaR(95%) (regression method)0.00000
 Expected Shortfall (regression method)0.00000
 COMBINED STATISTICS
 Annualized return (arithmetic extrapolation)0.00000
 Compounded annual return (geometric extrapolation)0.00000
 Calmar ratio (compounded annual return / max draw down)0.00000
 Compounded annual return / average of 25% largest draw downs0.00000
 Compounded annual return / Expected Shortfall lognormal0.00000
 0.00000
 0.00000
 Analysis based on DAILY values, full history
 RATIO STATISTICS
 Ratio statistics of excess return rates
 Statistics related to Sharpe ratio
 Mean0.00995
 SD0.00000
 Sharpe ratio (Glass type estimate)0.00000
 Sharpe ratio (Hedges UMVUE)0.00000
 df0.00000
 t0.00000
 p0.00000
 Lowerbound of 95% confidence interval for Sharpe Ratio0.00000
 Upperbound of 95% confidence interval for Sharpe Ratio0.00000
 Lowerbound of 95% CI (Gibbons, Hedeker & Davis approximation0.00000
 Upperbound of 95% CI (Gibbons, Hedeker & Davis approximation0.00000
 Statistics related to Sortino ratio
 Sortino ratio18.54720
 Upside Potential Ratio0.00000
 Upside part of mean0.00000
 Downside part of mean0.00995
 Upside SD0.00000
 Downside SD0.00054
 N nonnegative terms0.00000
 N negative terms544.00000
 Statistics related to linear regression on benchmark
 N of observations544.00000
 Mean of predictor0.40210
 Mean of criterion0.00995
 SD of predictor0.22398
 SD of criterion0.00000
 Covariance0.00000
 r0.00000
 b (slope, estimate of beta)0.00000
 a (intercept, estimate of alpha)
 Mean Square Error0.00000
 DF error0.00000
 t(b)0.00000
 p(b)0.00000
 t(a)0.00000
 p(a)0.00000
 Lowerbound of 95% confidence interval for beta0.00000
 Upperbound of 95% confidence interval for beta0.00000
 Lowerbound of 95% confidence interval for alpha0.00000
 Upperbound of 95% confidence interval for alpha0.00000
 Treynor index (mean / b)0.00000
 Jensen alpha (a)0.00000
 Ratio statistics of excess log return rates
 Statistics related to Sharpe ratio
 Mean0.00995
 SD0.00000
 Sharpe ratio (Glass type estimate)2028170000000000.00000
 Sharpe ratio (Hedges UMVUE)2025370000000000.00000
 df543.00000
 t2550490000000000.00000
 p1.00000
 Lowerbound of 95% confidence interval for Sharpe Ratio0.00000
 Upperbound of 95% confidence interval for Sharpe Ratio0.00000
 Lowerbound of 95% CI (Gibbons, Hedeker & Davis approximation2145820000000000.00000
 Upperbound of 95% CI (Gibbons, Hedeker & Davis approximation1904910000000000.00000
 Statistics related to Sortino ratio
 Sortino ratio18.54720
 Upside Potential Ratio0.00000
 Upside part of mean0.00000
 Downside part of mean0.00995
 Upside SD0.00000
 Downside SD0.00054
 N nonnegative terms0.00000
 N negative terms544.00000
 Statistics related to linear regression on benchmark
 N of observations544.00000
 Mean of predictor0.37680
 Mean of criterion0.00995
 SD of predictor0.22426
 SD of criterion0.00000
 Covariance0.00000
 r0.00000
 b (slope, estimate of beta)0.00000
 a (intercept, estimate of alpha)0.00995
 Mean Square Error0.00000
 DF error542.00000
 t(b)0.00000
 p(b)0.50000
 t(a)2537730000000000.00000
 p(a)1.00000
 Lowerbound of 95% confidence interval for beta0.00000
 Upperbound of 95% confidence interval for beta0.00000
 Lowerbound of 95% confidence interval for alpha0.00995
 Upperbound of 95% confidence interval for alpha0.00995
 Treynor index (mean / b)95457399999999983839431916257280.00000
 Jensen alpha (a)0.00995
 Risk estimates for a oneperiod unit investment (parametric)
 assuming log normal returns and losses (using central moments from Sharpe statistics)
 VaR(95%)0.00003
 Expected Shortfall on VaR0.00003
 assuming Pareto losses only (using partial moments from Sortino statistics)
 VaR(95%)0.00000
 Expected Shortfall on VaR0.00000
 ORDER STATISTICS
 Quartiles of return rates
 Number of observations544.00000
 Minimum1.00000
 Quartile 11.00000
 Median1.00000
 Quartile 31.00000
 Maximum1.00000
 Mean of quarter 11.00000
 Mean of quarter 21.00000
 Mean of quarter 31.00000
 Mean of quarter 41.00000
 Inter Quartile Range0.00000
 Number outliers low0.00000
 Percentage of outliers low0.00000
 Mean of outliers low0.00000
 Number of outliers high0.00000
 Percentage of outliers high0.00000
 Mean of outliers high0.00000
 Risk estimates for a oneperiod unit investment (based on Ex
 Extreme Value Index (moments method)0.00000
 VaR(95%) (moments method)0.00000
 Expected Shortfall (moments method)0.00000
 Extreme Value Index (regression method)0.00000
 VaR(95%) (regression method)0.00000
 Expected Shortfall (regression method)0.00000
 DRAW DOWN STATISTICS
 Quartiles of draw downs
 Number of observations0.00000
 Minimum0.00000
 Quartile 10.00000
 Median0.00000
 Quartile 30.00000
 Maximum0.00000
 Mean of quarter 10.00000
 Mean of quarter 20.00000
 Mean of quarter 30.00000
 Mean of quarter 40.00000
 Inter Quartile Range0.00000
 Number outliers low0.00000
 Percentage of outliers low0.00000
 Mean of outliers low0.00000
 Number of outliers high0.00000
 Percentage of outliers high0.00000
 Mean of outliers high0.00000
 Risk estimates based on draw downs (based on Extreme Value T
 Extreme Value Index (moments method)0.00000
 VaR(95%) (moments method)0.00000
 Expected Shortfall (moments method)0.00000
 Extreme Value Index (regression method)0.00000
 VaR(95%) (regression method)0.00000
 Expected Shortfall (regression method)0.00000
 COMBINED STATISTICS
 Annualized return (arithmetic extrapolation)0.00000
 Compounded annual return (geometric extrapolation)0.00000
 Calmar ratio (compounded annual return / max draw down)0.00000
 Compounded annual return / average of 25% largest draw downs0.00000
 Compounded annual return / Expected Shortfall lognormal0.00000
 0.00000
 0.00000
 Analysis based on DAILY values, last 6 months only
 RATIO STATISTICS
 Ratio statistics of excess return rates
 Statistics related to Sharpe ratio
 Mean0.00995
 SD0.00000
 Sharpe ratio (Glass type estimate)0.00000
 Sharpe ratio (Hedges UMVUE)0.00000
 df0.00000
 t0.00000
 p0.00000
 Lowerbound of 95% confidence interval for Sharpe Ratio0.00000
 Upperbound of 95% confidence interval for Sharpe Ratio0.00000
 Lowerbound of 95% CI (Gibbons, Hedeker & Davis approximation0.00000
 Upperbound of 95% CI (Gibbons, Hedeker & Davis approximation0.00000
 Statistics related to Sortino ratio
 Sortino ratio18.54720
 Upside Potential Ratio0.00000
 Upside part of mean0.00000
 Downside part of mean0.00995
 Upside SD0.00000
 Downside SD0.00054
 N nonnegative terms0.00000
 N negative terms172.00000
 Statistics related to linear regression on benchmark
 N of observations172.00000
 Mean of predictor0.24284
 Mean of criterion0.00995
 SD of predictor0.27437
 SD of criterion0.00000
 Covariance0.00000
 r0.00000
 b (slope, estimate of beta)0.00000
 a (intercept, estimate of alpha)0.00000
 Mean Square Error0.00000
 DF error0.00000
 t(b)0.00000
 p(b)0.00000
 t(a)0.00000
 p(a)0.00000
 Lowerbound of 95% confidence interval for beta0.00000
 Upperbound of 95% confidence interval for beta0.00000
 Lowerbound of 95% confidence interval for alpha0.00000
 Upperbound of 95% confidence interval for alpha0.00000
 Treynor index (mean / b)0.00000
 Jensen alpha (a)0.00000
 Ratio statistics of excess log return rates
 Statistics related to Sharpe ratio
 Mean0.00995
 SD0.00000
 Sharpe ratio (Glass type estimate)31576300000000000.00000
 Sharpe ratio (Hedges UMVUE)31437600000000000.00000
 df171.00000
 t22327800000000000.00000
 p1.00000
 Lowerbound of 95% confidence interval for Sharpe Ratio0.00000
 Upperbound of 95% confidence interval for Sharpe Ratio0.00000
 Lowerbound of 95% CI (Gibbons, Hedeker & Davis approximation34769500000000000.00000
 Upperbound of 95% CI (Gibbons, Hedeker & Davis approximation28105800000000000.00000
 Statistics related to Sortino ratio
 Sortino ratio18.54720
 Upside Potential Ratio0.00000
 Upside part of mean0.00000
 Downside part of mean0.00995
 Upside SD0.00000
 Downside SD0.00054
 N nonnegative terms0.00000
 N negative terms172.00000
 Statistics related to linear regression on benchmark
 N of observations172.00000
 Mean of predictor0.20512
 Mean of criterion0.00995
 SD of predictor0.27563
 SD of criterion0.00000
 Covariance0.00000
 r0.00000
 b (slope, estimate of beta)0.00000
 a (intercept, estimate of alpha)0.00995
 Mean Square Error0.00000
 DF error170.00000
 t(b)0.00000
 p(b)0.50000
 t(a)22244500000000000.00000
 p(a)1.00000
 Lowerbound of 95% confidence interval for beta0.00000
 Upperbound of 95% confidence interval for beta0.00000
 Lowerbound of 95% confidence interval for alpha0.00995
 Upperbound of 95% confidence interval for alpha0.00995
 Treynor index (mean / b)799184999999999955181563549843456.00000
 Jensen alpha (a)0.00995
 Risk estimates for a oneperiod unit investment (parametric)
 assuming log normal returns and losses (using central moments from Sharpe statistics)
 VaR(95%)0.00003
 Expected Shortfall on VaR0.00003
 assuming Pareto losses only (using partial moments from Sortino statistics)
 VaR(95%)0.00000
 Expected Shortfall on VaR0.00000
 ORDER STATISTICS
 Quartiles of return rates
 Number of observations172.00000
 Minimum1.00000
 Quartile 11.00000
 Median1.00000
 Quartile 31.00000
 Maximum1.00000
 Mean of quarter 11.00000
 Mean of quarter 21.00000
 Mean of quarter 31.00000
 Mean of quarter 41.00000
 Inter Quartile Range0.00000
 Number outliers low0.00000
 Percentage of outliers low0.00000
 Mean of outliers low0.00000
 Number of outliers high0.00000
 Percentage of outliers high0.00000
 Mean of outliers high0.00000
 Risk estimates for a oneperiod unit investment (based on Ex
 Extreme Value Index (moments method)0.00000
 VaR(95%) (moments method)0.00000
 Expected Shortfall (moments method)0.00000
 Extreme Value Index (regression method)0.00000
 VaR(95%) (regression method)0.00000
 Expected Shortfall (regression method)0.00000
 DRAW DOWN STATISTICS
 Quartiles of draw downs
 Number of observations0.00000
 Minimum0.00000
 Quartile 10.00000
 Median0.00000
 Quartile 30.00000
 Maximum0.00000
 Mean of quarter 10.00000
 Mean of quarter 20.00000
 Mean of quarter 30.00000
 Mean of quarter 40.00000
 Inter Quartile Range0.00000
 Number outliers low0.00000
 Percentage of outliers low0.00000
 Mean of outliers low0.00000
 Number of outliers high0.00000
 Percentage of outliers high0.00000
 Mean of outliers high0.00000
 Risk estimates based on draw downs (based on Extreme Value T
 Extreme Value Index (moments method)0.00000
 VaR(95%) (moments method)0.00000
 Expected Shortfall (moments method)0.00000
 Extreme Value Index (regression method)0.00000
 VaR(95%) (regression method)0.00000
 Expected Shortfall (regression method)0.00000
 COMBINED STATISTICS
 Annualized return (arithmetic extrapolation)0.00000
 Compounded annual return (geometric extrapolation)0.00000
 Calmar ratio (compounded annual return / max draw down)0.00000
 Compounded annual return / average of 25% largest draw downs0.00000
 Compounded annual return / Expected Shortfall lognormal0.00000
Strategy Description
Subscriptions not available
No subscriptions are currently available for this strategy because the strategy manager has capped the maximum number of subscribers.
Statistics
Latest
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Most values on this page (including the Strategy Equity Chart, above) have been adjusted by estimated trading commissions and subscription costs.
Some advanced users find it useful to see "raw" Model Account values. These numbers do not include any commissions, fees, subscription costs, or dividend actions.
Strategy developers can "archive" strategies at any time. This means the strategy Model Account is reset to its initial level and the trade list cleared. However, all archived track records are permanently preserved for evaluation by potential subscribers.
About the results you see on this Web site
Past results are not necessarily indicative of future results.
These results are based on simulated or hypothetical performance results that have certain inherent limitations. Unlike the results shown in an actual performance record, these results do not represent actual trading. Also, because these trades have not actually been executed, these results may have underor overcompensated for the impact, if any, of certain market factors, such as lack of liquidity. Simulated or hypothetical trading programs in general are also subject to the fact that they are designed with the benefit of hindsight. No representation is being made that any account will or is likely to achieve profits or losses similar to these being shown.
In addition, hypothetical trading does not involve financial risk, and no hypothetical trading record can completely account for the impact of financial risk in actual trading. For example, the ability to withstand losses or to adhere to a particular trading program in spite of trading losses are material points which can also adversely affect actual trading results. There are numerous other factors related to the markets in general or to the implementation of any specific trading program, which cannot be fully accounted for in the preparation of hypothetical performance results and all of which can adversely affect actual trading results.
Material assumptions and methods used when calculating results
The following are material assumptions used when calculating any hypothetical monthly results that appear on our web site.
 Profits are reinvested. We assume profits (when there are profits) are reinvested in the trading strategy.
 Starting investment size. For any trading strategy on our site, hypothetical results are based on the assumption that you invested the starting amount shown on the strategy's performance chart. In some cases, nominal dollar amounts on the equity chart have been rescaled downward to make current goforward trading sizes more manageable. In these cases, it may not have been possible to trade the strategy historically at the equity levels shown on the chart, and a higher minimum capital was required in the past.
 All fees are included. When calculating cumulative returns, we try to estimate and include all the fees a typical trader incurs when AutoTrading using AutoTrade technology. This includes the subscription cost of the strategy, plus any pertrade AutoTrade fees, plus estimated broker commissions if any.
 "Max Drawdown" Calculation Method. We calculate the Max Drawdown statistic as follows. Our computer software looks at the equity chart of the system in question and finds the largest percentage amount that the equity chart ever declines from a local "peak" to a subsequent point in time (thus this is formally called "Maximum Peak to Valley Drawdown.") While this is useful information when evaluating trading systems, you should keep in mind that past performance does not guarantee future results. Therefore, future drawdowns may be larger than the historical maximum drawdowns you see here.
Trading is risky
There is a substantial risk of loss in futures and forex trading. Online trading of stocks and options is extremely risky. Assume you will lose money. Don't trade with money you cannot afford to lose.