For a portfolio with a given safety-first ratio, the probability that its return will be less than RL is N(−SFRatio). Why the negative SFRatio give us the probability that its return will be less than RL?
For example,
Suppose an investor’s threshold return, RL, is 2 percent.
Portfolio 2 has an expected return of 14 percent with a standard deviation of 16 percent. The SFRatio is 0.75 = (14 − 2)/16 for Portfolios 2
the probability that portfolio return will be less than 2 percent is N(−0.75) = 1 − N(0.75) = 1 − 0.7734 = 0.227 or about 23 percent, assuming that portfolio returns are normally distributed.
I have also found that the probability that portfolio return will exceed 14 percent is P(Z ≥ 0.75) = 1.0 − P(Z ≤ 0.75)=N(−0.75) which mean the the probability that portfolio return will exceed 14 percent is same as the probability that portfolio return will be less than 2 percent. Am I correct?
For example,
Suppose an investor’s threshold return, RL, is 2 percent.
Portfolio 2 has an expected return of 14 percent with a standard deviation of 16 percent. The SFRatio is 0.75 = (14 − 2)/16 for Portfolios 2
the probability that portfolio return will be less than 2 percent is N(−0.75) = 1 − N(0.75) = 1 − 0.7734 = 0.227 or about 23 percent, assuming that portfolio returns are normally distributed.
I have also found that the probability that portfolio return will exceed 14 percent is P(Z ≥ 0.75) = 1.0 − P(Z ≤ 0.75)=N(−0.75) which mean the the probability that portfolio return will exceed 14 percent is same as the probability that portfolio return will be less than 2 percent. Am I correct?