Pair Correlation Between Straits Tms and Swiss Mrt

This module allows you to analyze existing cross correlation between Straits Tms and Swiss Mrt. You can compare the effects of market volatilities on Straits Tms and Swiss Mrt and check how they will diversify away market risk if combined in the same portfolio for a given time horizon. You can also utilize pair trading strategies of matching a long position in Straits Tms with a short position of Swiss Mrt. See also your portfolio center. Please also check ongoing floating volatility patterns of Straits Tms and Swiss Mrt.
Investment Horizon     30 Days    Login   to change
Symbolsvs
 Straits Tms  vs   Swiss Mrt
 Performance (%) 
      Timeline 

Pair Volatility

Given the investment horizon of 30 days, Straits Tms is expected to generate 0.95 times more return on investment than Swiss Mrt. However, Straits Tms is 1.06 times less risky than Swiss Mrt. It trades about 0.09 of its potential returns per unit of risk. Swiss Mrt is currently generating about -0.05 per unit of risk. If you would invest  334,980  in Straits Tms on October 21, 2017 and sell it today you would earn a total of  3,258  from holding Straits Tms or generate 0.97% return on investment over 30 days.

Correlation Coefficient

Pair Corralation between Straits Tms and Swiss Mrt
0.02

Parameters

Time Period1 Month [change]
DirectionPositive 
StrengthInsignificant
Accuracy90.48%
ValuesDaily Returns

Diversification

Significant diversification

Overlapping area represents the amount of risk that can be diversified away by holding Straits Tms and Swiss Mrt in the same portfolio assuming nothing else is changed. The correlation between historical prices or returns on Swiss Mrt and Straits Tms is a relative statistical measure of the degree to which these equity instruments tend to move together. The correlation coefficient measures the extent to which returns on Straits Tms are associated (or correlated) with Swiss Mrt. Values of the correlation coefficient range from -1 to +1, where. The correlation of zero (0) is possible when the price movement of Swiss Mrt has no effect on the direction of Straits Tms i.e. Straits Tms and Swiss Mrt go up and down completely randomly.
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Comparative Volatility

 Predicted Return Density 
      Returns