David, in the answer given in Q19.2 of the GARP Practice Exam Questions, it makes reference to the Variance of EDF being the square root of p*(1-p) and provides a link to Wikipedia: http://en.wikipedia.org/wiki/Bernoulli_distribution.
19.2 Assume both credits (credit A & credit B) have the same parameters: Commitment = $4 million; Outstanding (OS) = $2 million; usage given default (UGD) = 50%; probability of default (PD or EDF) = 2%; loss given default (LGD) = 60%; and standard deviation of LGD = 25%. What is the expected loss (EL) and unexpected loss (UL) of each credit? Adjusted exposure (AE) = $2 MM OS + $2 MM unused * 50% UGD = $3 MM
Variance of EDF = SQRT(98%*2%). Did you remember that the variance of a Bernoulli is p*q or p*(1-p)?
However, the Wiki article that makes no mention of the variance of a Bernoulli being the square root. I'm confused. Is that a typo?
Thanks.
19.2 Assume both credits (credit A & credit B) have the same parameters: Commitment = $4 million; Outstanding (OS) = $2 million; usage given default (UGD) = 50%; probability of default (PD or EDF) = 2%; loss given default (LGD) = 60%; and standard deviation of LGD = 25%. What is the expected loss (EL) and unexpected loss (UL) of each credit? Adjusted exposure (AE) = $2 MM OS + $2 MM unused * 50% UGD = $3 MM
Variance of EDF = SQRT(98%*2%). Did you remember that the variance of a Bernoulli is p*q or p*(1-p)?
However, the Wiki article that makes no mention of the variance of a Bernoulli being the square root. I'm confused. Is that a typo?
Thanks.
