Basic Info
IFM Investments Ltd ADR (CTC) Dividend Info
IFM Investments Ltd ADR (CTC) dividend growth in the last 12 months is 44934.09%
The trailing 12-month yield of IFM Investments Ltd ADR is 123.84%. its dividend history:
Dividend Growth History for IFM Investments Ltd ADR (CTC)
Year
|
Payout Amount
|
Year Start Yield
|
Annual Payout Growth (YoY)
|
CAGR to 2015
|
---|---|---|---|---|
2015 | $0.525 | 8.90% | -64.06% | - |
2014 | $1.4609 | 71.26% | - | -64.06% |
2013 | $0 | 0.00% | -100.00% | - |
2012 | $0.035 | 10.00% | - | 146.62% |
2008 | $0.425 | 5.74% | -21.44% | 3.06% |
2007 | $0.541 | 6.73% | 170.50% | -0.37% |
2006 | $0.2 | 2.28% | -76.25% | 11.32% |
2005 | $0.842 | 7.57% | -4.10% | -4.61% |
2004 | $0.878 | 5.73% | 769.31% | -4.57% |
2003 | $0.101 | 1.05% | - | 14.72% |
2000 | $0.07 | 0.39% | -88.80% | 14.38% |
1999 | $0.625 | 3.17% | -78.30% | -1.08% |
1998 | $2.88 | 11.34% | 216.14% | -9.53% |
1997 | $0.911 | 4.60% | 13.58% | -3.02% |
1996 | $0.8021 | 1.15% | 23.55% | -2.21% |
1995 | $0.6492 | 1.06% | 0.43% | -1.06% |
1994 | $0.6464 | 0.85% | 18.22% | -0.99% |
1993 | $0.5468 | 1.26% | 65.15% | -0.18% |
1992 | $0.3311 | 1.15% | 28.04% | 2.02% |
1991 | $0.2586 | 2.36% | 441.00% | 2.99% |
1990 | $0.0478 | 0.45% | - | 10.06% |
Dividend Growth Chart for IFM Investments Ltd ADR (CTC)
IFM Investments Ltd ADR (CTC) Historical Returns And Risk Info
From 07/23/1990 to 03/30/2015, the compound annualized total return (dividend reinvested) of IFM Investments Ltd ADR (CTC) is -27.342%. Its cumulative total return (dividend reinvested) is -99.949%.
From 07/23/1990 to 03/30/2015, the Maximum Drawdown of IFM Investments Ltd ADR (CTC) is 100.0%.
From 07/23/1990 to 03/30/2015, the Sharpe Ratio of IFM Investments Ltd ADR (CTC) is NA.
From 07/23/1990 to 03/30/2015, the Annualized Standard Deviation of IFM Investments Ltd ADR (CTC) is NA.
From 07/23/1990 to 03/30/2015, the Beta of IFM Investments Ltd ADR (CTC) is 0.86.
Last 1 Week* | 1 Yr | 3 Yr | 5 Yr | 10 Yr | 15 Yr | 20 Yr | Since 07/23/1990 |
2015 | 2014 | 2013 | 2012 | 2011 | 2010 | 2009 | 2008 | 2007 | 2006 | 2005 | 2004 | 2003 | 2002 | 2001 | 2000 | 1999 | 1998 | 1997 | 1996 | 1995 | 1994 | 1993 | 1992 | 1991 | 1990 | |
---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
Annualized Return(%) | -96.8 | 1217.9 | NA | NA | -60.8 | -48.7 | -37.0 | -26.5 | 38.2 | -99.9 | 117.1 | 0.0 | 0.0 | 0.0 | -100.0 | -11.6 | -1.6 | -6.1 | -15.2 | -18.4 | 57.2 | -28.8 | 2.0 | -27.4 | -6.5 | -10.4 | 26.2 | 27.7 | 10.4 | -19.8 | 78.7 | 55.0 | 160.8 | 2.6 |
Sharpe Ratio | NA | 1.17 | NA | NA | NA | NA | NA | NA | 0.15 | -0.13 | 1.35 | NA | 1.0 | 1.0 | NA | -0.22 | -0.13 | -0.32 | -0.8 | -0.45 | 2.02 | -0.93 | -0.01 | -0.8 | -0.25 | -0.28 | -0.74 | 1.59 | 0.19 | -0.61 | 4.14 | 2.12 | 5.69 | 0.04 |
Draw Down(%) | NA | 99.8 | 100.0 | 100.0 | 100.0 | NA | NA | 100.0 | 99.8 | 100.0 | 46.4 | 16.2 | NA | NA | 100.0 | 38.7 | 24.6 | 32.8 | 26.1 | 44.0 | 17.3 | 49.8 | 43.8 | 45.3 | 43.9 | 48.7 | 30.1 | 7.0 | 38.5 | 40.4 | 9.3 | 21.9 | 23.7 | 21.0 |
Standard Deviation(%) | NA | 1040.3 | 713.9 | 555.7 | NA | NA | NA | NA | 1920.7 | 787.5 | 86.5 | 26.9 | NA | NA | NA | 57.2 | 35.8 | 29.7 | 21.7 | 43.1 | 28.0 | 32.1 | 31.1 | 39.2 | 39.2 | 49.2 | 39.2 | 15.1 | 33.9 | 37.0 | 18.4 | 24.5 | 27.4 | 26.3 |
Treynor Ratio | NA | 0.46 | NA | NA | -0.62 | NA | NA | -0.35 | 0.04 | -0.17 | 2.35 | -161371261417.7 | NA | NA | 0.32 | -0.32 | -0.04 | -0.07 | -0.28 | -0.2 | 0.89 | -0.53 | 0.0 | -0.47 | -0.13 | -0.11 | -0.25 | 0.61 | 0.06 | -0.22 | 1.82 | 4.85 | 3.81 | 0.03 |
Alpha | NA | 41.66 | 13.97 | 8.63 | 4.8 | NA | NA | 1.86 | 145.86 | 6.32 | 0.39 | 0.1 | 0.0 | 0.0 | -3.03 | 0.07 | -0.01 | -0.09 | -0.07 | -0.09 | 0.13 | -0.07 | 0.05 | -0.09 | -0.06 | -0.13 | 0.02 | 0.06 | -0.07 | -0.07 | 0.22 | 0.17 | 0.34 | 0.04 |
Beta | NA | 26.53 | 9.19 | 3.18 | 0.99 | NA | NA | 0.86 | 74.02 | 5.97 | 0.5 | -0.06 | 0.0 | 0.0 | -3.1 | 0.39 | 1.21 | 1.37 | 0.63 | 0.96 | 0.64 | 0.57 | 0.67 | 0.66 | 0.73 | 1.25 | 1.16 | 0.39 | 1.01 | 1.03 | 0.42 | 0.11 | 0.41 | 0.32 |
RSquare | NA | 0.0 | 0.0 | 0.0 | 0.0 | NA | NA | 0.0 | 0.01 | 0.0 | 0.0 | 0.0 | 0.0 | 0.0 | 0.28 | 0.07 | 0.29 | 0.21 | 0.09 | 0.07 | 0.15 | 0.22 | 0.22 | 0.14 | 0.11 | 0.26 | 0.29 | 0.09 | 0.05 | 0.08 | 0.04 | 0.0 | 0.05 | 0.06 |
Yield(%) | N/A | 123.8 | 96.2 | 5.8 | 3.6 | 1.5 | 1.0 | N/A | 8.9 | 71.3 | 0.0 | 10.0 | 0.0 | 0.0 | 0.0 | 5.7 | 6.7 | 2.3 | 7.6 | 5.7 | 1.1 | 0.0 | 0.0 | 0.4 | 3.2 | 11.3 | 4.6 | 1.1 | 1.1 | 0.9 | 1.3 | 1.2 | 2.4 | 0.4 |
Dividend Growth(%) | N/A | 44934.1 | N/A | 0.6 | -40.5 | N/A | N/A | N/A | -64.1 | N/A | -100.0 | N/A | N/A | N/A | -100.0 | -21.4 | 170.5 | -76.2 | -4.1 | 769.3 | N/A | N/A | -100.0 | -88.8 | -78.3 | 216.1 | 13.6 | 23.6 | 0.4 | 18.2 | 65.1 | 28.1 | 440.8 | N/A |
Return Calculator for IFM Investments Ltd ADR (CTC)
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IFM Investments Ltd ADR (CTC) Rolling Returns Charts
A rolling return for a period such as 5-year, as of a specific date, represents the investment’s performance over the preceding five years leading up to that date. In the 5-year rolling chart, the value on any given date corresponds to the annualized return for the preceding 5 years up to that very date. Thus, for instance, the chart value on 8/28/2015 reflects the annualized return from 8/28/2010 to 8/28/2015. A 5-year rolling return chart for an investment (stock, fund or portfolio) depicts the return sequence of 5-year trailing returns for the dates in the chart.
These rolling returns contrast with the most recent 3, 5, 10, and 15-year returns, as they solely depict the returns for those respective periods leading up to the most recent date, without encompassing every date in the historical record.
Rolling return charts offer a more precise insight into a portfolio’s risk and return stability (including funds or individual stocks). This is particularly true when focusing on the minimal return points within a rolling return chart as a measure of a fund or a portfolio's risk. A well-known observation, often attributed to ‘Murphy’s law’, is that it tends to perform poorly when investors decide to follow an investment due to its recent strong returns. Sound familiar? Information regarding minimum rolling returns could help mitigate this predicament. Investors can opt for an investment showcasing high minimum rolling returns within their preferred holding durations. In fact, merely possessing knowledge of such minimum rolling period returns can anchor investors’ expectations.
For instance, let’s consider an investor who follows a model portfolio (or even simply purchases and holds a fund like VFINX or SPY) for 10 years. Armed with knowledge of this portfolio’s minimum 10-year rolling return since its inception date or the fund’s inception (in the case of VFINX, recognizing that the minimum 10-year rolling return since 1987 could be as low as -2.24%), the investor should reasonably anticipate the potential for the portfolio to incur losses over the forthcoming 10 years.
Minimum rolling return for a period such as 10-year offers a different and often better historical risk and return metric than other popular risk and return metrics such as Sharpe ratio, standard deviation (volatility) or maximum drawdown.
See Portfolio Calculator and Rolling Returns for more detailed description.
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