Die Zeit für den Endspurt ist gekommen, denn die Prüfungen zu den drei Leveln des Chartered Financial Analysts (CFA) finden am kommenden Samstag (7. Juni) zeitgleich u.a. in Frankfurt, München, Zürich und an zwei Standorten in Genf statt. Die 300 Stunden empfohlene Vorbereitungszeit für jede der Prüfungen sollten die Kandidaten also schon weitgehend abgearbeitet haben.
Für diejenigen, die noch ein wenig Training benötigen, haben wir einige einschlägige Fragen zusammengestellt. Dazu haben wir die CFA-Trainingsinstitute gebeten uns die schwierigsten Fragen des CFA zur Verfügung zu stellen und einige Tipps zur Beantwortung zu geben. Da die CFA-Prüfungen vollständig auf Neudeutsch erfolgen, haben wir auf eine Übersetzung verzichtet:
1. Level I: Jane Acompora is calculating equivalent annualized yields based on the 1.3% holding period yield of a 90-day loan. The correct ordering of the annual money market yield (MMY), effective yield (EAY), and bond equivalent yield (BEY) is:
A. MMY < EAY < BEY.
B. MMY < BEY < EAY.
C. BEY < EAY < MMY.
“The key is that this question can be answered without doing any numerical calculations if you understand the differences in how the yields are calculated.
No calculations are really necessary here because the MMY involves no compounding and a 360-day year, the BEY requires compounding the quarterly HPR to a semiannual rate and doubling that rate, and the EAY requires compounding for the entire year based on a 365-day year.
A numerical example of these calculations based on a 90-day holding period yield of 1.3% is: the money market yield is 1.3% × 360 / 90 = 5.20%, the bond equivalent yield is 2 × [1.013182.5 / 90 – 1] = 0.0531 = 5.31%, which is two times the effective semiannual rate of return, and the effective annual yield is 1.013 365 / 90 – 1 = 0.0538 = 5.38%. Calculating the semiannual effective yield using 180 days instead of 182.5 does not change the order.”
2. Level I: A semi-annual pay floating-rate note pays a coupon of Libor + 60bps, with exactly three years to maturity. If the required margin is 40 bps and Libor is quoted today at 1.20% then the value of the bond is closest to:
A. 99.42
B. 100.58
C. 102.33
“Floating rate bonds are pretty difficult to value accurately, as they are an essential component to swaps. However, there is an approximation provided in the CFA curriculum, and a rather neat Quartic short-cut too.
A floating-rate note can be (roughly) valued on a coupon date by discounting current Libor + quoted margin (think of this as the regular coupon) at current Libor + required margin (think of this as the discount rate). In other words, we discount what we get (PMT) at the rate that we need (I/Y).
On the calculator: N = 6, I/Y = (1.2 + 0.4) ÷ 2 = 0.8, PMT = (1.2 + 0.6) ÷ 2 = 0.9, FV = 100 è PV = 100.58.
There are short-cuts you can use. Firstly, note that if a bond is paying exactly what is required (i.e. quoted margin = required margin) then the bond will trade at par on each coupon date. In this question, the bond is paying 20 bps per year more than required. This means that we should pay a 20 bp premium per year. Three year maturity means a 60 bp premium. Hence our quick “guess” is that the bond should trade at 100 plus a 60 bp premium, or 100.60. Answer B is the only possible answer.
3. Level I: The following details (all annual equivalent) are collected from Treasury securities:
Years to maturity | Spot rate |
2.0 | 1.0% |
4.0 | 1.5% |
6.0 | 2.0% |
8.0 | 2.5% |
Which of the following rates is closest to the two-year forward rate six years from now (i.e. the “6y2y” rate)?
A. 2.0%
B. 3.0%
C. 4.0%
“Calculating forward rates from spot rates and spots from forwards can be done easily, and quite accurately, with the banana method, which we’ll come to below.
Note that the six-year spot rate (say, z6) is 2% and the eight-year spot rate (z8) is 2.5%. Let’s call the 6y2y rate F, to keep notation easy.
To solve this, draw a horizontal timeline from 0 to 8, marking time 6 on the top. To avoid arbitrage, investing for six years at z6 then two years at F must be the same as investing for eight years at the z8 rate. Mark above your timeline “z6 = 2%” (between T = 0 and T = 6) and “F = ?” (between T = 6 and T = 8), and below the timeline “z8 = 2.5%”.
Algebraically we can say that: (1 + z6)6 x (1 + F)2 = (1 + z8)8.
With a bit of effort, this solves as: F = [(1 + z8)8 ÷ (1 + z6)6]0.5 – 1 = [1.0258 ÷ 1.026]0.5 – 1 = 4.01%.
Here’s our banana method, though. Just below the timeline you have drawn, write down how many bananas (or any other inanimate object) you have received if you get 2.5 per year for eight years. Answer: 20. Now write down, above the timeline, how many you get in the first six years, at 2 per year. Answer: 12. Now calculate how many bananas you must have got in the last two years. Answer: 20 – 12 = 8. This is over two years, hence 4 per year, answer C. Banana method gives 4.00%; accurate method gives 4.01%. Close enough!”
4. Level II: Using the information in Exhibit 1, which of the following is closest to the value of a European call option with a strike price of $100?
Exhibit 1: Input for Black Scholes (European) Options | |
Stock Price (S) | 100 |
Strike Price (X) | 100 |
Interest Rate (r) | 0.07 |
Dividend Yield (q) | 0.00 |
Time to Maturity (years) (t) | 1.00 |
Volatility (Std. Dev.)(Sigma) | 0.20 |
Black-Scholes Put Option Value | $4.7809 |
Exhibit 2: European Option Sensitivities | ||
Sensitivity | Call | Put |
Delta | 0.6736 | -0.3264 |
Gamma | 0.0180 | 0.0180 |
Theta | -3.9797 | 2.5470 |
Vega | 36.0527 | 36.0527 |
Rho | 55.8230 | -37.4164 |
A. $4.78
B. $5.55
C. $11.54
“This is a three-minute question that can take you less than one minute if you get through the initial shock of not having memorized the Black-Scholes Model. On the other hand, if you had memorized the Black-Scholes model, it would take you 20 minutes to reverse engineer the data to get to the value of the call option. The trick is that you are given all the information for put-call parity. This result can be obtained using put-call parity in the following way:
Call Value = Put Value − Xe−rt + S = $4.78 − $100.00e(−0.07 × 1.0) + 100 = $11.54
The incorrect value of $4.78 does not discount the strike price in the put-call parity formula.”
5. Level II: (Excerpt from item set)
Financial information on a company has just been published including the following:
Net income | $240 million |
Cost of equity | 12% |
Dividend payout rate (paid at year end) | 60% |
Common stock shares in issue | 20 million |
Dividends and free cash flows will increase a growth rate that steadily drops from 14% to 5% over the next four years, then will increase at 5% thereafter.
The intrinsic value per share using dividend-based valuation techniques is closest to:
A. $121
B. $127
C. $145
“The H-model is frequently required in Level II item sets on dividend or free cash flow valuation.
The model itself can be written as V0 = D0 ÷ (r – gL) x [(1 + gL) + (H x (gS – gL))] where gS and gL are the short-term and long-term growth rates respectively, and H is the “half life” of the drop in growth.
For this question, the calculation is: dividend D0 = $240m x 0.6 ÷ 20m = $7.20 per share.
V0 = $7.20 ÷ (0.12 – 0.05) x [1.05 + 2 x (0.14 – 0.05)] = $126.51, answer B.
However, there is a neat shortcut for remembering the formula. Sketch a graph of the growth rate against time: a line decreasing from short-term gS down to long-term gL over 2H years, then horizontal at level gL. Consider the area under the graph in two parts: the ‘constant growth’ part, and the triangle.
If you look at the formula, the ‘constant growth’ component uses the first part of the square bracket, i.e. D0 ÷ (r – gL) x [(1 + gL) …], which is your familiar D1 ÷ (r – gL). For the triangle, what is its area? Half base x height = 0.5 x 2H x (gS – gL) = H x (gS – gL). This is the second part of the square bracket.
Hence the H-model can be rewritten as V0 = D0 ÷ (r – gL) x [(1 + gL) + triangle].”
6. Level III: Terry Bowers, an analyst at MDU Investments, observes that China bonds offer a comparable interest rate to U.S. bonds. In contrast, short-term U.S. interest rates are currently 3% higher than short-term China rates.
The forward currency market is active and efficiently priced, and Bowers expects that the current China bond spread over comparable Treasuries will remain the same should the Federal Reserve increase interest rates 75 basis points as forecasted. An analytical firm has furnished a country beta of 0.36 for China with the United States, and a particular China bond issue that Bowers is interested in has a duration of 3.8.
Assume Bowers is correct that U.S. interest rates will increase 75 basis points and the nominal spread between U.S. and China bonds will not change. Further assume Bowers believes the U.S. dollar will depreciate 2% over the year against the Chinese (CNY) currency, Bowers’s optimal strategy to maximize total return is to buy the:
A. U.S. bond.
B. China bond and buy the USD forward.
C. China bond and then sell the CNY in one year.
“Investing in the foreign market (China bonds) exposes Bowers to two sources of return: the RFC of the bonds and the change in the CNY, the RFX. Bowers is assuming the nominal spread in the bonds will not change (i.e., the yield of both bonds will increase 75 basis points). (He is assuming a yield beta of 1.00). The assumption in this type of analysis is the two bonds have equivalent duration.
Thus, both will decline equally in price and will have equal RFC. The RFX of the U.S. bond is zero; there is no currency exposure. For the China bond, the expected decline in the USD of 2% is equivalent to an approximate 2% appreciation of the CNY. This means purchase of the China bond will be superior to the U.S. bond for Bowers.
However, he must also consider any premium or discount currency hedging will earn to determine if an unhedged or hedged currency exposure is optimal. The forward premium or discount depends on the differential in short-term interest rates. The U.S. short-term rate is 3% higher, which means the CNY will sell at a forward premium of 3%. Bowers should buy the USD forward (sell CNY forward) buying future dollars at the 3% discount.”
7. Level III: (Excerpt from item set)
The P&S 400 Index has a current value of 1200. It has a continuous dividend yield of 2% and the risk-free rate is 5% on a continuous basis. The price of a nine-month forward on the P&S 400 Index is closest to:
A. 1173
B. 1227
C. 1237
“The basic rule for pricing forward contracts is:
Forward price FP = spot plus cost of carry minus benefit of carry.
The cost of carry includes interest: hence for most contracts the spot is multiplied by (1 + RF)T or eRcT. Other contracts (e.g. commodities) may include storage and insurance. Benefits of carry include dividends (discrete or continuous), coupons, convenience yield (for commodities), or the foreign interest rate (for currency forwards).
In the case of an equity index forward, you may be able to do the entire calculation in your head.
In this question the spot price is 1200. The cost of carry is 5% and the benefit of carry is 2%. Never mind the continuous nature of these rates, for the moment. We can say that the net cost is 3% per year, or 2.25% for nine months. 2.25% of 1200 is 27, hence our estimate of the forward price is 1227, answer B.
If we do this accurately, we get:
FP = S0 x e(Rc - dc)T = 1200 x e(0.05 – 0.02) x 0.75 = 1200 x e0.0225 = 1227.31. Good guess!”
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