P1 Focus Review 7th of 8: Valuation (continued)
The FRM exam does like to test a basic understanding of the binomial tree used to price an option. Please make sure you understand the mechanics:
I have noticed that GARP easily switches back and forth--and therefore can assume either--between either version of the asset process reviewed in Hull's binomial chapter:
Also, be prepared to apply the MAX() rule in the case of an American (can be early exercised) option: at interim nodes, the value of the node is the MAX(intrinsic value, discounted expected value).
Option Valuation (BSM)
A very common BSM-related question in our forum is, do I need to memorize Black-Scholes? Well, here are the AIMs, so according to GARP you should be able to ...
Our historical sample includes questions for all the Greeks, in some form or another. Most questions are about: delta, gamma or vega. At a minimum, in my opinion, you should memorize:
c = S*exp(-qT)*[N(d1) = delta] - K*exp(-rT)*[N(d2) = risk-neutral probability of expiration in-the-money]
Option Greeks (Hedge)
I think hedging with Greeks just requires a few practice question to get the hang of it. Whe know what to expect: a question will ask you to hedge or neutralize a position with respect to one or two of the Greeks; e.g., neutralize delta, or delta and gamma with two trades.
As I mentioned here (http://forum.bionicturtle.com/threads/l1-t4-7-dynamic-delta-hedging.4839/), I think this is easier if you keep in mind that you want to neutralize the position Greek. For example,
Among the remaining T4 topics, the most important for the exam are the following:
- The 7th (of 8) Part 1 Focus Review video (Valuation) is located here at https://learn.bionicturtle.com/frm-...valuation-and-risk-models-focus-review-2-of-2
- Option Valuation (Binomial Trees)
- Option Valuation (BSM)
- Option Greeks (Delta, Gamma, Vega …)
- Option Greeks (Hedge)
- Other
The FRM exam does like to test a basic understanding of the binomial tree used to price an option. Please make sure you understand the mechanics:
- The asset price is mapped out into the future nodes, and
- The nodes are weighted and discounted back to the present value (so-called backward induction)
I have noticed that GARP easily switches back and forth--and therefore can assume either--between either version of the asset process reviewed in Hull's binomial chapter:
- Where (u) and (d) are symmetrical (akin to a normal price distribution); e.g., asset can jump up or down 20%, such that u = 1.2 and d = 0.80; or
- Where u = exp[volatility*SQRT[T]) and d = 1/u, which assumes the price is lognormal (i.e., log returns are normal) and converges to BSM. In this model, if u = 1.2, then d = 1/1.2 = 0.833
Also, be prepared to apply the MAX() rule in the case of an American (can be early exercised) option: at interim nodes, the value of the node is the MAX(intrinsic value, discounted expected value).
Option Valuation (BSM)
A very common BSM-related question in our forum is, do I need to memorize Black-Scholes? Well, here are the AIMs, so according to GARP you should be able to ...
- "Compute the value of a European option using the Black-Scholes-Merton model on a dividend paying stock."
- "Use Black's Approximation to compute the value of an American call option on a dividend-paying stock."
- Just memorize the outer BSM: c = S*exp(-qT)*N(d1) - K*exp(-rT)*N(d2) and p = K*exp(-rT)*N(-d2) - S*exp(-qT)*N(-d1). For P1, the exam probably will not go deeper than this outer BSM. As neither the TI BAII+ nor the HP 12c can calculate N(.), you will be given N(d1) and N(d2); or, worst case, a lookup table from which to retrieve them.
- If you have a more time, explore d2 due to its essential similarity to distance to default (DD) in Merton credit risk (P2)
- Put-call parity (as previously discussed) is highly testable. Practice it, please
- BSM assumes log (continuous) returns are normal such that the asset price, or ratio of S(t)/S(0), is lognormal
- N(d2) is the risk-neutral probability that a call option will be struck; i.e., expire in-the-money. So, a good test question would be: what is the same for a put option?
- The lower and upper bounds; e.g., lower bound of Euro call is the BSM with the N(.)s removed, or equivalently, assuming zero volatility
- American call option: if no dividends, never optimal; if dividends, might be optimal immediately before the ex-dividend date
- American put option: often desirable
Our historical sample includes questions for all the Greeks, in some form or another. Most questions are about: delta, gamma or vega. At a minimum, in my opinion, you should memorize:
- The shape of delta; e.g. deeply ITM calls have (percentage) delta approaching 1.0, deeply OTM calls have delta approaching zero
- How the shape of delta informs gamma (1st derivative of delta): at both OTM/ITM extremes gamma tends toward zero and therefore peaks ATM
- Why (percentage) gamma and vega are always positive such that long option positions (call or put) are long gamma and long vega
- call option delta = exp(-qT)*N(d1) and put option delta = exp(-qT)*[(d1)-1]; for non-dividend-paying stocks, call delta = N(d1) and put delta = [N(d1)-1]
c = S*exp(-qT)*[N(d1) = delta] - K*exp(-rT)*[N(d2) = risk-neutral probability of expiration in-the-money]
Option Greeks (Hedge)
I think hedging with Greeks just requires a few practice question to get the hang of it. Whe know what to expect: a question will ask you to hedge or neutralize a position with respect to one or two of the Greeks; e.g., neutralize delta, or delta and gamma with two trades.
As I mentioned here (http://forum.bionicturtle.com/threads/l1-t4-7-dynamic-delta-hedging.4839/), I think this is easier if you keep in mind that you want to neutralize the position Greek. For example,
- Consider a position in 100 call options with per-option (percentage) delta of 0.6. This Percentage Delta is 0.6. It is the unitless first partial derivative, dc/dS
- The Position Delta is 60 because Position Delta = Quantity * Percentage Delta.
- If we are long, we use (+) quantity: Position Delta (long 100 calls) = +100 * 0.6 = +60; if we are short , we use (-) quantity: Position Delta (short 100 calls) = -100 * 0.6 = -60
- To neutralize is to get the position Greek to zero; for example to delta neutralize 100 long call options with per-option (percentage) delta of +60, we need a trade that creates an offsetting -60 position delta. This can be achieved with a short potion in 60 shares: -60 * 1.0 (percentage) delta per share. Or, a long position in 150 put option with percentage delta each of -0.40 because +150 * -0.40 = -60. Or, a short position in 200 OTM call options with percentage delta per share of 0.30 because -200*0.30 = -60.
Among the remaining T4 topics, the most important for the exam are the following:
- Applying a one-year credit rating transition (aka, migration) matrix
- Definitions of investment versus non-investment (speculative) ratings
- Through-the-cycle versus at-the-point approaches
- Ong's expected loss (EL) is a popular test question
- While it is a good idea to memorize Ong's formula for unexpected loss (UL), most likely is a qualitative question; e.g., unlike EL, UL is non-linear with EDF
- Please note the EDF or PD is a Bernoulli, which is a special case of the binomial with n = 1, and therefore variance(PD) = PD*(1-PD)
- Dowd's weaknesses of VaR, especially: VaR is not sub-additive (can you given an example?) and therefore VaR is not coherent. But ES is coherent.
- Expected shortfall (ES): you should understand how ES is a conditional average and you should be able to calculate x% ES given the worst (n) losses in historical window.
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