Fight Finance

(a) Junior debt is the safest. Preference shares have the highest expected returns.

(b) Preference shares are the safest. Ordinary shares have the highest expected returns.

(c) Senior debt is the safest. Ordinary shares have the highest expected returns.

(d) Junior debt is the safest. Ordinary shares have the highest expected returns.

(e) Senior debt is the safest. Junior debt have the highest expected returns.

(a) Preferred stock only.

(b) The senior and junior bonds only.

(c) Common stock only.

(d) The senior and junior bonds and the preferred stock.

(e) No payments on any security is required since the firm made a loss.

(a) Sole traders.

(b) Partnerships.

(c) Corporations.

(d) All of the above.

(e) None of the above

(a) Alice has $6,000 cash, owes $10,000 credit card debt due immediately and 100% owns a sole tradership business with assets worth $10,000 and liabilities of $3,000.

(b) Billy has $10,000 cash, owes $6,000 credit card debt due immediately and 100% owns a corporate business with assets worth $3,000 and liabilities of $10,000.

(c) Carla has $6,000 cash, owes $10,000 credit card debt due immediately and 100% owns a corporate business with assets worth $10,000 and liabilities of $3,000.

(d) Darren has $10,000 cash, owes $6,000 credit card debt due immediately and 100% owns a sole tradership business with assets worth $3,000 and liabilities of $10,000.

(e) Ernie has $1,000 cash, lent $3,000 to his friend, and doesn't have any personal debt or own any businesses.

(a) Joe Bloggs

(b) Jane Doe

(c) Bloggs and Doe

(d) Bloggs Ltd

(e) Doe Pty Ltd

(a) ##0≤p<∞## and ##0≤r< 1##

(b) ##0≤p<∞## and ##-1≤r< ∞##

(c) ##0≤p<∞## and ##0≤r< ∞##

(d) ##0≤p<∞## and ##-∞≤r< ∞##

(e) ##-∞<p<∞## and ##-∞<r< ∞##

You deposit cash into your bank account. Have you or your money?

You deposit cash into your bank account. Have you or debt?

You deposit cash into your bank account. Have you or debt?

You deposit cash into your bank account. Does the deposit account represent a debt or to you?

You owe money. Are you a or a ?

You are owed money. Are you a or a ?

You own a debt asset. Are you a or a ?

You buy a house funded using a home loan. Have you or debt?

You buy a house funded using a home loan. Have you or debt?

(a) Receive cash at the start and promise to pay cash in the future, as set out in the debt contract.

(b) Are debtors.

(c) Owe money.

(d) Are funded by debt.

(e) Buy debt.

(a) Are long debt.

(b) Invest in debt.

(c) Are owed money.

(d) Provide debt funding.

(e) Have debt liabilities.

(a) Buy debt.

(b) Are debtors.

(c) Have debt assets.

(d) Provide debt funding.

(e) Are lenders.

(a) Buy debt.

(b) Own debt.

(c) Are owed money.

(d) Write debt.

(e) Have debt assets.

(a) Are a lender.

(b) Issued debt.

(c) Bought debt.

(d) Are a debt holder.

(e) Own a debt asset.

(a) The home loan is a debt liability to the bank.

(b) The bank invested in your debt.

(c) You are indebted to the bank.

(d) You owe the bank principal and interest payments.

(e) You sold your promise to the bank to pay the principal and interest.

(a) You have a debt asset.

(b) The bank sold you its promise to pay back interest and principal payments.

(c) The bank is exposed to your credit risk, it’s afraid that you’ll default on your debt.

(d) The interest income you’re paid is taxable income for you.

(e) The interest expense that the bank pays is tax-deductible for the bank.

(a) -100%

(b) -50%

(c) -12.5%

(d) -10%

(e) -8%

(a) -1,000%

(b) -150%

(c) -100%

(d) -15%

(e) -10%

(a) The beta of equity is 5 and the expected return on equity is 30% pa.

(b) The beta of equity is 4.2 and the expected return on equity is 26% pa.

(c) The beta of equity is 0.86 and the expected return on equity is 9.3% pa.

(d) The beta of equity is 1 and the expected return on equity is 10% pa.

(e) The beta of equity is 0.6 and the expected return on equity is 8% pa.

(a) $1000 of Australian federal government bonds.

(b) $2 million of Australian federal government bonds.

(c) A $1 million residential house asset.

(d) A home loan secured on a $1 million residential house asset with an LVR of 80%.

(e) Equity (the deposit) in a $1 million residential house asset with an LVR of 80%.

(a) Buy an investment property with low expected future capital gains and high rental income, funded using a low proportion of debt (mortgage loan).

(b) Rent the investment property to a tenant;

(c) Negative gearing is achieved when the property investment’s annual taxable profit is negative, due to the loan’s interest expense being greater than the net rent (rental revenue less the renting expenses such as maintenance);

(d) Deduct the property’s income loss from the investor’s separate personal wage from labour. This means that the investor will pay less personal income tax than if they didn’t make the levered property investment;

(e) The investment property will be a positive-NPV investment if the capital gains are greater than the income losses on an after-tax, risk-adjusted, present-value basis.

(a) Negative gearing provides benefits by increasing the investor’s personal pre-tax income in the current year.

(b) Negative gearing works best when the investor has a high personal income so they're in a high personal marginal income tax bracket.

(c) Negative gearing works best when the asset makes large capital gains but has low income (such as rent).

(d) The more leverage, the bigger the interest tax shield benefit of negative gearing.

(e) Real estate and shares can be negatively geared.

(a) Lev’s annual interest expense would have been $40,000.

(b) Lev’s annual loss before tax on the investment property was $10,000

(c) Lev’s annual loss after tax on the investment property was $5,500

(d) Lev’s personal tax saving due to the investment property was $5,500.

(e) Nolev’s personal tax payable due to the investment property was $13,500.

(a) Gear’s total annual interest expense would have been $200,000.

(b) Gear’s total annual loss before tax on the investment properties was $50,000

(c) Gear’s total annual loss after tax on the investment properties was $27,500

(d) Gear’s total personal tax saving due to the investment properties was $22,500.

(e) Nogear’s total personal tax payable due to the investment property was $16,500.

(a) The EPS is $5.

(b) The market capitalisation of equity is $1.2 billion.

(c) The share price is $60.

(d) The market capitalisation of debt is $0.72 billion.

(e) The debt-to-assets ratio is 40%.

(a) $431.111m

(b) $444.444m

(c) $485m

(d) $515.464m

(e) $1600m

(a) $515.464m

(b) $500m

(c) $485m

(d) $444.444m

(e) $431.111m

(a) The WACC before tax is 6.46% pa.

(b) The WACC after tax is 5.50% pa.

(c) The current levered asset value including tax shields is $603.839k.

(d) The current debt value is $600k and the interest tax shield benefit over the first year is $7.2k (at t=1).

(e) The current share price is $1.50.

(a) $200m is the levered firm's asset value.

(b) $100 is the share price.

(c) $5m is the interest expense over the first year.

(d) $2m is the cash flow to debt holders in one year.

(e) $1.8m of bonds must be bought back in one year.

(a) 1, 3, 5, 7, 9.

(b) 2, 4, 6, 8, 10.

(c) 1, 4, 6, 8, 10.

(d) 2, 3, 5, 7, 9.

(e) 1, 3, 5, 8, 10.

(a) $55.6364

(b) $54.5455

(c) $40.8

(d) $40

(e) $37.5

(a) $256.41

(b) $317.46

(c) $363.64

(d) $416.67

(e) $1,333.33

(a) 5% pa

(b) 7.5% pa

(c) 10% pa

(d) 12.5% pa

(e) 20% pa

(a) 5% pa

(b) 8.5% pa

(c) 9% pa

(d) 10% pa

(e) 12% pa

(a) Asset A is underpriced.

(b) Asset B has a negative alpha (a negative excess return or abnormal return).

(c) Buying asset C would be a positive NPV investment.

(d) Asset D has less systematic variance than the market portfolio (M).

(e) Asset E is fairly priced.

(a) Asset A has the same systematic risk as asset B.

(b) Asset A has more total variance than asset B.

(c) Asset B has zero idiosyncratic risk. Asset B must be a portfolio of half the market portfolio and half government bonds.

(d) If risk-averse investors were forced to invest all of their wealth in a single risky asset, so they could not diversify, every investor would logically choose asset A over the other three assets.

(e) Assets M and B have the highest Sharpe ratios, which is defined as the gradient of the capital allocation line (CAL) from the government bonds through the asset on the graph of expected return versus total standard deviation.

(a) Systematic risk increases.

(b) Idiosyncratic risk increases.

(c) Total risk increases.

(d) Systematic risk decreases.

(e) Idiosyncratic risk decreases.

(a) The risk free security has zero systematic variance and zero idiosyncratic variance.

(b) The market portfolio has zero idiosyncratic variance.

(c) Any portfolio comprised of the market portfolio and risk free security has zero idiosyncratic variance.

(d) Portfolios that plot on the CML must only be comprised of the risk free security and the market portfolio.

(e) Portfolios that plot on the CML have some idiosyncratic variance and some systematic variance.

(a) Systematic risk.

(b) Diversifiable risk.

(c) Total risk.

(d) Credit risk.

(e) Foreign exchange risk.

(a) Market value of assets is $1m.

(b) Firm’s debt-to-assets ratio is 25%.

(c) Asset beta is 1 and required return on assets (or WACC before tax) is 8% pa.

(d) Equity beta is 1.4 and equity required return is 10% pa.

(e) Required return on debt is 3.5% pa.

(a) $0.25m decrease in loans to zero and cash to $0.25m.

(b) Rise in the asset beta to 1.333333 and required return on assets (or WACC before tax) to 9.666667% pa.

(c) Rise in the equity beta to 2 and required return on equity to 13% pa.

(d) Fall in the debt-to-assets ratio to zero.

(a) Interest expenses and principal repayments are called hedge units.

(b) Interest expenses only are called speculative units.

(c) Neither interest expenses nor principal repayments are called Ponzi units.

(d) Neither interest expenses nor principal repayments will be forced to immediately default.

(a) The "authorities [that] attempt to exorcise inflation by monetary constraint" would be central banks raising interest rates.

(b) "Speculative units will become Ponzi units" if their debt funding has a floating or variable coupon rate and their investment assets have a fixed coupon rate.

(c) "Net worth" refers to equity which equals assets less liabilities.

(d) "The net worth of previously Ponzi units will quickly evaporate" due to forced fire sales of assets to meet interest and principal payments.

(e) The "collapse of asset values" is caused by an increase in the demand for assets.

(a) Supply of the assets, forcing the price up.

(b) Supply of the assets, forcing the price down.

(c) Demand for the assets, forcing the price down.

(d) Demand for the assets, forcing the price up.

(a) Is the weighted average time that an asset’s cash flows are received.

(b) Is measured in units of time, usually years.

(c) Of a zero-coupon bond is equal to the bond’s maturity.

(d) Of a fixed-coupon-paying bond will be more than the bond’s maturity.

(e) Of a portfolio is an arithmetic average of the Macaulay durations of the assets in the portfolio, weighted by their prices.

(a) 1.925669 years

(b) 1.951087 years

(c) 2 years

(d) 2.048913 years

(e) 2.074331 years

(a) 1.925669 years

(b) 1.951087 years

(c) 2 years

(d) 2.048913 years

(e) 2.074331 years

(a) Is the weighted average time that an asset’s cash flows are received, usually measured in years.

(b) Divided by (1+y) equals the modified duration, where y is the yield to maturity given as an effective annual rate and duration is measured in years.

(c) Of a zero-coupon bond is equal to the bond’s maturity.

(d) Of a fixed-coupon-paying bond will be less than the bond’s maturity.

(e) Of a portfolio is an arithmetic average of the Macaulay durations of the assets in the portfolio, weighted by their face values.

(a) Bond holders like convexity, it’s good for them.

(b) Bond issuers like convexity, it’s good for them.

(c) If yields rise, convex bonds lose less value than non-convex bonds of equal duration.

(d) If yields fall, convex bonds gain more value than non-convex bonds of equal duration.

(a) Consumer staple stocks with high payout ratios such as shares in supermarkets.

(b) Fast-growing technology stocks with low payout ratios such as shares in software companies.

(c) Fixed coupon 3 year government bonds that were just issued and pay semi-annual coupons.

(d) Floating coupon 3 year corporate bonds that were just issued and pay semi-annual coupons.

(e) 90 day certificate of deposit.

(a) 13.75 years

(b) 14.333333 years

(c) 19.545455 years

(d) 35 years

(e) Infinity

(a) 6% pa is the stock's required return.

(b) $75 is the stock's fair price.

(c) 26.5 years is the stock's Macaulay duration.

(d) If the market portfolio were to fall 1% today, the stock is expected to fall by 0.5%.

(e) If the Treasury bond yield were to fall 1 percentage point today, then the stock price is expected to fall by 25% approximately, ceteris paribus.

(a) Coupon rate is equal to the benchmark rate plus a premium.

(b) Premium is also commonly called a spread or margin.

(c) Premium rate is fixed. The number is written in the bond contract and does not change.

(d) Benchmark rate is fixed. The number is written in the bond contract and does not change.

(e) Paying quarterly US dollar coupons often use the 90-day USD LIBOR rate as the benchmark.

(a) 1 year

(b) 5 years

(c) 10 years

(d) 15 years

(e) 20 years

(a) I and II.

(b) III and IV.

(c) I and III.

(d) II and IV.

(e) II and III.

(a) Residential real estate.

(b) Listed shares.

(c) Bank bills.

(d) Government bonds.

(e) Futures on the stock index.

(a) Pay more than the fair value.

(b) Pay the fair value.

(c) Pay less than the fair value.

(d) Debit their cash at bank and credit their revenue.

The 'futures price' in a futures contract is paid at the start when the futures contract is agreed to. or ?

(a) ##f_{LF,T}=S_T+K_T##

(b) ##f_{LF,T}=-S_T-K_T##

(c) ##f_{LF,T}=S_T-K_T##

(d) ##f_{LF,T}=K_T-S_T##

(e) ##f_{LF,T}=S_T##

(a) Futures quotes displayed on the exchange change continuously.

(b) Futures prices written in existing futures contracts are fixed, they do not change since they’re written in the legal contract.

(c) One year futures quotes equal the market’s expectation of the underlying asset price in one year. For this reason futures markets are a good predictor of the underlying asset prices.

(d) Futures prices can be calculated based on the spot price of the underlying asset compounded forward at the total opportunity cost of capital, less any storage costs and plus any income yields such as dividends.

(e) The futures price quote and the underlying asset's spot price will converge over time. At the future's expiry they’ll be equal.

(a) ##f_{SF,T}=S_T+K_T##

(b) ##f_{SF,T}=-S_T-K_T##

(c) ##f_{SF,T}=S_T-K_T##

(d) ##f_{SF,T}=K_T-S_T##

(e) ##f_{SF,T}=S_T##

(a) Obligation to buy the underlying oil at $38.94 per barrel.

(b) Obligation to sell the underlying oil at $38.94 per barrel.

(c) Right to buy the underlying oil at $38.94 per barrel if she wants.

(d) Right to sell the underlying oil at $38.94 per barrel if she wants.

(e) Obligation to buy the underlying oil $38.94 per barrel if her counter party chooses to sell it.

(a) Obligation to buy the underlying oil at $38.94 per barrel.

(b) Obligation to sell the underlying oil at $38.94 per barrel.

(c) Right to buy the underlying oil at $38.94 per barrel if she wants.

(d) Right to sell the underlying oil at $38.94 per barrel if she wants.

(e) Obligation to buy the underlying oil $38.94 per barrel if the counter party chooses to sell it.

(a) Equity futures prices tend to be higher than spot prices. This is called contango.

(b) Equity futures prices tend to be equal to spot prices.

(c) Equity futures are generally under-priced.

(d) Equity futures are generally over-priced.

(e) Long equity futures traders tend to make more money than short equity futures traders.

(a) The futures price quote ##(F_T)## is 'fair'. It's neither over- nor under-priced to the long or short trader.

(b) The futures price quote ##(F_T)## equals the expected underlying asset price at maturity.

(c) The futures price quote ##(F_0)## is initially zero.

(d) The value of the future ##(V_0)## is initially zero to both the long and short trader.

(e) If the value of the future ##(V_0)## rises for the long trader, it must have fallen for the short trader, and vice versa.

(a) Buyers of futures are required to pay an initial margin at the start.

(b) Futures are a zero-sum game in the sense that the winner gains at the expense of the loser.

(c) Buyers of futures have to pay the futures price at the start.

(d) Buyers of futures do not care about the credit risk of the original future seller since the contract is novated by the exchange.

(e) Speculators who sell futures hope that the underlying asset price falls.

(a) $10

(b) $3

(c) $2.8037

(d) $2.7273

(e) $0

(a) Markets are weak and semi-strong form efficient but strong-form inefficient.

(b) Markets are weak form efficient but semi-strong and strong-form inefficient.

(c) Chartists make negative excess returns.

(d) Insiders make positive excess returns.

(e) Insiders make negative excess returns.

(a) 2.7% pa.

(b) 3.0% pa.

(c) 3.5% pa.

(d) 3.3% pa.

(e) 3.8% pa.

The 'option price' in an option contract is paid at the start when the option contract is agreed to. or ?

The 'option strike price' in an option contract, also known as the exercise price, is paid at the start when the option contract is agreed to. or ?

(a) Sell all existing stock that you own.

(b) Short sell the stock.

(c) Buy put options on the stock.

(d) Sell put options on the stock.

(e) Sell call options on the stock.

(a) Long call options.

(b) Short call options.

(c) Long put options.

(d) Short put options.

(e) No option positions have the possibility of unlimited potential losses.

(a) Bought the right to buy the underlying asset from her at maturity if he wants.

(b) Bought the right to sell the underlying asset to her at maturity if he wants.

(c) Sold the right that allows her to buy the underlying asset from him at maturity if she wants.

(d) Sold the right that allows her to sell the underlying asset to him at maturity if she wants.

(e) Sold a contract that obliges him to buy the underlying asset from her at maturity if she wants.

(a) ##\max(S_T - K, 0)##.

(b) ##\max(S_T - K, K)##.

(c) ##\max(K-S_T, 0)##.

(d) ##\max(K-S_T, K)##.

(e) ##\min(K-S_T, 0)##.

(a) ##\max(S_T - K, 0)##.

(b) ##\max(S_T - K, K)##.

(c) ##\max(K-S_T, 0)##.

(d) ##\max(K-S_T, K)##.

(e) ##\min(K-S_T, 0)##.

(a) ##\min(S_T - K, 0)##.

(b) ##-\min(S_T - K, 0)##.

(c) ##\max(K-S_T, 0)##.

(d) ##-\max(K-S_T, 0)##.

(e)##-\max(S_T-K, 0)##.

(a) ##\max(S_T - K, 0)##.

(b) ##-\max(S_T - K, 0)##.

(c) ##\max(K-S_T, 0)##.

(d) ##-\max(K-S_T, 0)##.

(e) ##-\min(S_T - K, 0)##.

(a) ##\min(S_0 - K, 0)##.

(b) ##\min(K-S_0, 0)##.

(c) ##\max(S_0-K, 0)##.

(d) ##\max(K-S_0, 0)##.

(e) ##\max(K, S_0)##.

(a) Option premium is another name for option price.

(b) An option contract's price is always changing.

(c) Strike price is another name for exercise price.

(d) An option contract's strike price is always changing.

(e) Call and put option premiums are paid at the start when the option is bought. Call option exercise prices are paid when they are exercised, usually at maturity.

(a) Long call option there must be a short call option.

(b) Long put option there must be a short put option.

(c) Long option there must be a short option.

(d) Call option there must be a put option.

(e) Option trader who gains there must be one or more option traders who lose.

(a) Long a call option.

(b) Long a put option.

(c) Short a call option.

(d) Short a put option.

(e) Neither long or short a call or a put option.

(a) Sell any of the firm's shares that you already own.

(b) Short-sell the firm's shares.

(c) Sell futures written on the shares.

(d) Buy put options written on the shares.

(e) Buy call options written on the shares.

(a) ##f_{LC,T}=max⁡(S_T-X_T,0)##

(b) ##f_{LC,T}=max⁡(X_T-S_T,0)##

(c) ##f_{LC,T}=-max⁡(S_T-X_T,0)##

(d) ##f_{LC,T}=-max⁡(X_T-S_T,0)##

(e) ##f_{LC,T}=min⁡(X_T-S_T,0)##

(a) ##f_{SC,T}=max⁡(S_T-X_T,0)##

(b) ##f_{SC,T}=max⁡(X_T-S_T,0)##

(c) ##f_{SC,T}=-max⁡(S_T-X_T,0)##

(d) ##f_{SC,T}=-max⁡(X_T-S_T,0)##

(e) ##f_{SC,T}=min⁡(X_T-S_T,0)##

(a) ##f_{LP,T}=max⁡(S_T-X_T,0)##

(b) ##f_{LP,T}=max⁡(X_T-S_T,0)##

(c) ##f_{LP,T}=-max⁡(S_T-X_T,0)##

(d) ##f_{LP,T}=-max⁡(X_T-S_T,0)##

(e) ##f_{LP,T}=min⁡(X_T-S_T,0)##

(a) ##f_{SP,T}=max⁡(S_T-X_T,0)##

(b) ##f_{SP,T}=max⁡(X_T-S_T,0)##

(c) ##f_{SP,T}=-max⁡(S_T-X_T,0)##

(d) ##f_{SP,T}=-max⁡(X_T-S_T,0)##

(e) ##f_{SP,T}=min⁡(X_T-S_T,0)##

(a) Long call contracts.

(b) Short call contracts.

(c) Long put contracts.

(d) Short put contracts.

(e) Short future contracts.

(a) Obligation to buy the underlying oil at $44 per barrel.

(b) Obligation to sell the underlying oil at $44 per barrel.

(c) Right to buy the underlying oil at $44 per barrel if she wants.

(d) Right to sell the underlying oil at $44 per barrel if she wants.

(e) Obligation to buy the underlying oil at $44 per barrel if her counter party chooses to sell it.

(a) ##\pi_{LC}=max⁡(S_T-X_T,0) + f_{LC,0}##

(b) ##\pi_{LC}=max⁡(X_T-S_T,0) + f_{LC,0}##

(c) ##\pi_{LC}=-max⁡(S_T-X_T,0) + f_{LC,0}##

(d) ##\pi_{LC}=max⁡(X_T-S_T,0) - f_{LC,0}##

(e) ##\pi_{LC}=max(S_T-X_T,0) - f_{LC,0}##

(a) ##\pi_{SC}=max⁡(S_T-X_T,0) + f_{LC,0}##

(b) ##\pi_{SC}=-max⁡(S_T-X_T,0) + f_{LC,0}##

(c) ##\pi_{SC}=max⁡(X_T-S_T,0) + f_{LC,0}##

(d) ##\pi_{SC}=-max⁡(S_T-X_T,0) - f_{LC,0}##

(e) ##\pi_{SC}=-max(X_T-S_T,0) - f_{LC,0}##

(a) ##\pi_{LP}=-max⁡(S_T-X_T,0) - f_{LP,0}##

(b) ##\pi_{LP}=-max⁡(X_T-S_T,0) + f_{LP,0}##

(c) ##\pi_{LP}=max⁡(S_T-X_T,0) - f_{LP,0}##

(d) ##\pi_{LP}=max⁡(X_T-S_T,0) + f_{LP,0}##

(e) ##\pi_{LP}=max(X_T-S_T,0) - f_{LP,0}##

(a) ##\pi_{SP}=-max⁡(S_T-X_T,0) - f_{LP,0}##

(b) ##\pi_{SP}=-max⁡(X_T-S_T,0) + f_{LP,0}##

(c) ##\pi_{SP}=max⁡(S_T-X_T,0) - f_{LP,0}##

(d) ##\pi_{SP}=max⁡(X_T-S_T,0) + f_{LP,0}##

(e) ##\pi_{SP}=max(X_T-S_T,0) - f_{LP,0}##

(a) Obligation to buy the underlying oil at $44 per barrel.

(b) Obligation to sell the underlying oil at $44 per barrel.

(c) Right to sell the underlying oil at $44 per barrel if she wants.

(d) Obligation to buy the underlying oil $44 per barrel if the counterparty chooses to sell it.

(e) Obligation to sell the underlying oil at $44 per barrel if the counterparty chooses to buy it.

(a) Obligation to sell the underlying oil at $44 per barrel.

(b) Right to buy the underlying oil at $44 per barrel if she wants.

(c) Right to sell the underlying oil at $44 per barrel if she wants.

(d) Obligation to buy the underlying oil $44 per barrel if the counterparty chooses to sell it.

(e) Obligation to sell the underlying oil at $44 per barrel if the counterparty chooses to buy it.

(a) The long trader paid the option premium at the start.

(b) The option is 'out of the money' at the start.

(c) The long trader wishes for the underlying CBA stock price to fall.

(d) The option can only be exercised at maturity.

(e) If the stock price falls to $60 at maturity, then the long trader can buy the underlying stock for $60, exercise his option to sell the underlying stock to his counterparty for $75, making a payoff at maturity of $15 and a profit of $13.

Will the price of a call option on equity or if the standard deviation of returns (risk) of the underlying shares becomes higher?

Will the price of an out-of-the-money put option on equity or if the standard deviation of returns (risk) of the underlying shares becomes higher?

Two call options are exactly the same, but one matures in one year and the other matures in two years. Which option would you expect to have the higher price, the option which matures or , or should they have the price?

Two call options are exactly the same, but one has a low and the other has a high exercise price. Which option would you expect to have the higher price, the option with the or exercise price, or should they have the price?

Two put options are exactly the same, but one has a low and the other has a high exercise price. Which option would you expect to have the higher price, the option with the or exercise price, or should they have the price?

(a) Only (i) is true.

(b) Only (ii) is true.

(c) Only (iii) is true.

(d) Only (i) and (ii) is true.

(e) All statements (i), (ii) and (iii) are true.

(a) 1: short call, 2: long call, 3: short put, 4: long put.

(b) 1: long call, 2: long put, 3: short call, 4: short put.

(c) 1: short put, 2: long put, 3: short call, 4: long call.

(d) 1: long put, 2: short put, 3: long call, 4: short call.

(e) 1: long put, 2: short call, 3: short put, 4: long call.

(a) You have bought the right to buy a BHP share for $40 in 6 months.

(b) You have bought the right to sell a BHP share for $40 in 6 months.

(c) You have bought the obligation to sell a BHP share for $40 in 6 months.

(d) You have sold the right that allows your counterparty to buy a BHP share from you for $40 in 6 months. This means that you have the obligation to sell a BHP share to your counterparty for $40 in 6 months if he wants to buy it.

(e) You have sold the right that allows your counterparty to sell a BHP share to you for $40 in 6 months. This means that you have the obligation to buy a BHP share from your counterparty for $40 in 6 months if he wants to sell it.

(a) Buy calls on grain, buy calls on cattle livestock.

(b) Buy calls on grain, buy puts on cattle livestock.

(c) Buy puts on grain, buy calls on cattle livestock.

(d) Buy puts on grain, buy puts on cattle livestock.

(e) Statements (a) and (d) are both correct.

(a) $0.287263739

(b) $0.398141032

(c) $1.142227853

(d) $1.667914067

(e) $2.193600281

(a) $1.550849674

(b) $0.982509295

(c) $0.666414943

(d) $0.287263739

(e) $0.055037262

(a) 162.83 points

(b) 220.56 points

(c) 226.43 points

(d) 230.91 points

(e) 317.45 points

(a) ##N[d_1]##

(b) ##N[d_2]##

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(e) ##N[−d_2]##

(a) ##N[d_1]##

(b) ##N[d_2]##

(c) ##−N[−d_1]##

(d) ##−N[−d_2]##

(e) ##N[−d_2]##

(a) ##N[d_1]##

(b) ##N[d_2]##

(c) ##−N[−d_1]##

(d) ##−N[−d_2]##

(e) ##N[−d_2]##

(a) ##N[d_1]##

(b) ##N[d_2]##

(c) ##−N[−d_1]##

(d) ##−N[−d_2]##

(e) ##N[−d_2]##

(a) If the underlying stock price suddenly rose by $0.01, the put option price would be expected to fall by less than $0.00552034777953178.

(b) If the underlying stock price suddenly fell by $0.01, the put option price would be expected to rise by more than $0.00552034777953178.

(c) If the underlying stock price suddenly rose by $0.01, the call option price would be expected to rise by more than $0.00888138404936379.

(d) To Delta hedge the 1000 long put options, long 552.0348 stocks.

(e) To Delta and Gamma hedge the 1000 long put options, long 2078.4226 call options and short 2397.9617 stocks.

(a) Label a represents the market value of equity ##(E)## at t=0 on the red curved line or t=1 on the blue crooked line.

(b) Label b represents the market value of equity now ##(E_0)##.

(c) Label c represents the market value of equity if the assets were liquidated right now.

(d) Label d represents the face value of debt at maturity ##(F_1)##.

(e) Label e represents the market value of debt ##(D)## at t=0 on the red curved line or t=1 on the blue crooked line.

(a) Label a represents the market value of equity ##(E)## at t=0 on the red curved line or t=1 on the blue crooked line.

(b) Label b represents the face value of debt at maturity ##(F_1)##.

(c) Label c represents the market value of debt now ##(D_0)##.

(d) Label d represents the face value of debt at maturity ##(F_1)##.

(e) Label e represents the market value of assets ##(V)## at t=0 on the red curved line or t=1 on the blue crooked line.

(a) ##max(V_1 - F_1, 0)##.

(b) ##max(V_1 - D_1, 0)##.

(c) ##max(F_1 - V_1, 0)##.

(d) ##max(D_1 - V_1, 0)##.

(e) ##-min(F_1 - V_1, 0)##.

(a) Buying the company's assets.

(b) Buying a call option on the company's assets.

(c) Buying a put option on the company's assets.

(d) Buying the company's assets and buying a call option on those assets.

(e) Buying the company's assets and buying a put option on those assets.

(a) Prefer more to less, meaning that they will always like to have more wealth.

(b) Be risk averse, meaning that they dislike risk as measured by the standard deviation of wealth.

(c) Have a positively sloped utility function, so the gradient or first derivative of the utility function is always positive.

(d) Have a utility function that increases at a diminishing rate. So the shape is concave down like a frown, or the second derivative is always negative.

(e) Have a utility function that rises until it reaches the satiation point, then it falls because too much wealth causes problems.

(a) All rational people prefer more wealth to less.

(b) Mr Blue is risk averse.

(c) Miss Red is risk neutral.

(d) Mrs Green is risk averse.

(e) Mrs Green may enjoy gambling.

(a) Mr Blue prefers more wealth to less. Mrs Green enjoys losing wealth.

(b) Miss Red has the same utility no matter how much wealth she has.

(c) Mr Blue is risk averse.

(d) Miss Red is risk averse.

(e) Mrs Green is risk loving.

(a) Mr Blue and Miss Red prefer more wealth to less.

(b) Mrs Green enjoys losing wealth.

(c) Mr Blue is risk averse.

(d) Miss Red is risk neutral.

(e) Mrs Green is risk averse.

(a) Neither Miss Red nor Mrs Green would appear rational to an economist.

(b) Mrs Green is satiated when she has $25 of wealth. That is her bliss point.

(c) Mrs Green is risk loving when she has between zero and $25 of wealth, same as Mr Blue.

(d) Mrs Green is risk averse when she has between $25 and $50 of wealth.

(e) Mrs Green is risk loving when she has between $50 and $100 of wealth, same as Mr Blue.

(b) Mrs Green would prefer to invest her wealth in a single stock rather than a well diversified portfolio of stocks, assuming that all stocks had the same total risk and return.

(c) The popularity of insurance only makes sense if people are similar to Mr Blue.

(d) CAPM theory only makes sense if people are similar to Miss Red.

(e) The popularity of casino gambling and lottery tickets only make sense if people are similar to Mrs Green.

(a) Mr Blue is as happy with zero wealth as he is with $1,000. Similarly for Miss Red and Mrs Green.

(b) All of the people would appear irrational to an economist. Though Mr Blue appears to be rational when he has more than $192 in wealth.

(c) Mr Blue is risk averse. Miss Red is risk neutral. Mrs Green is risk loving.

(d) Miss Red is totally indifferent to how much wealth she has. She doesn't care about gaining or losing money.

(e) Mr Blue prefers more to less up to a wealth of around $192. At about $192 he is the happiest he can be. This is his bliss point. With more than $192 he becomes less happy.

(a) Mr Blue's expected utility of wealth from gambling is 7.5 while refusing is 8.54. So the gamble makes him less happy.

(b) Miss Red's expected utility of wealth from gambling is 5 and refusing is also 5. So the gamble doesn't affect her happiness at all.

(c) Mr Blue's certainty equivalent of the risky gamble is $25. This is less than his current wealth which is why he would refuse.

(d) Miss Red's certainty equivalent of the risky gamble is any wealth. She's indifferent since she always has the same level of happiness.

(e) Mrs Green's certainty equivalent of the risky gamble is $25. This is less than her current wealth which is why she would refuse.

(a) 230.258509% pa

(b) 10.536052% pa

(c) 10.517092% pa

(d) 10.468982% pa

(e) 9.531018% pa

(a) 30% pa

(b) 26.236426% pa

(c) 10.254219% pa

(d) 10.25% pa

(e) 10% pa

(a) Prices, ##P_1##.

(b) Gross discrete returns per annum, ##r_{\text{gdr 0 }\rightarrow \text{ 1}} = \dfrac{P_1}{P_0} ##.

(c) Effective annual returns per annum also known as net discrete returns, ##r_{\text{eff 0 }\rightarrow \text{ 1}} = \dfrac{P_1 - P_0}{P_0} = \dfrac{P_1}{P_0}-1##.

(d) Continuously compounded returns per annum, ##r_{\text{cc 0 }\rightarrow \text{ 1}} = \ln \left( \dfrac{P_1}{P_0} \right)##.

(e) Annualised percentage rates compounding per month, ##r_{\text{apr comp monthly 0 }\rightarrow \text{ 1 mth}} = \left( \dfrac{P_1 - P_0}{P_0} \right) \times 12##.

(a)##Red \sim \mathcal{N}(\mu, \sigma^2)##,   ##Green \sim \mathcal{N}(\mu, \sigma^2)##   and   ##Blue \sim \mathcal{N}(\mu, \sigma^2)##

(b) ##Red \sim \mathcal{N}(\mu, \sigma^2)##,   ##Green \sim \mathcal{N}(\mu, \sigma^2)##   and   ##Blue \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##

(c) ##Red \sim \mathcal{N}(\mu, \sigma^2)##,   ##Green \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##   and   ##Blue \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##

(d) ##Red \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##,   ##Green \sim \mathcal{N}(\mu, \sigma^2)##   and   ##Blue \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##

(e) ##Red \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##,   ##Green \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##   and   ##Blue \sim \mathbf{ln} \mathcal{N}(\mu, \sigma^2)##

(a)##-1 < \text{Red} < \infty## if Red is log-normally distributed.

(b) ##-2 < \text{Green} < 2## if Green is normally distributed.

(c) ##0 < \text{Blue} < \infty## if Blue is log-normally distributed.

(d) If the Green distribution is normal, then the mode = median = mean.

(e) If the Red and Blue distributions are log-normal, then the mode < median < mean.

(a) Green is a stock's continuously compounded rate of return, also called the log gross discrete return. ##r_\text{cc} = \ln(P_1/P_0)##

(b) Blue is a stock's future price, ##P_1##

(c) Blue is a stock's gross discrete return. ##\text{GDR} = P_1/P_0##

(d) Blue is a stock's effective rate of return. ##r_\text{eff} = (P_1-P_0)/P_0##

(e) Red is a stock's net discrete return. ##\text{NDR} = \text{GDR}-1##

(a) The returns ##r_\text{t monthly}## are continuously compounded monthly returns and are likely to be normally distributed, so the mean, median and mode of these continuously compounded returns are all equal to 1% per month.

(b) The annualised average continuously compounded return is ##\bar{r}_\text{cc annual}=12×0.01=0.1=12\%\text{ pa}##. The annualised standard deviation is ##\sigma_\text{annual} = \sqrt{12}×0.05=0.173205081=17.32\%\text{ pa}##.

(c) Over the next 10 years the mean, median and mode continuously compounded 10 year returns will all equal ##0.01 \times 12 \times 10 = 120\%##.

(d) Over the next 10 years the expected mean gross discrete 10 year return is ##e^{(0.01 - 0.05^2/2)×12×10} = 2.857651118## and the median gross discrete 10 year return is ##e^{(0.01 + 0.05^2/2)×12×10}=3.857425531##.

(e) If the current price of the CBA shares is $75, then in 10 years they’re expected to have a mean value of ##75×e^{(0.01 + 0.05^2/2)×12×10} = 289.3069148## and a median value of ##75×e^{0.01×12×10}=249.0087692##.

If a stock's future expected continuously compounded annual returns are normally distributed, what will be bigger, the stock's or continuously compounded annual return? Or would you expect them to be ?

If a stock's expected future prices are log-normally distributed, what will be bigger, the stock's or future price? Or would you expect them to be ?

(a) P1median = $1.105171,   P1mean = $1.521962

(b) P1median = $1.1,             P1mean = $1.42

(c) P1median = $1.521962,   P1mean = $1.105171

(d) P1median = $0.802519,   P1mean = $1.105171

(e) P1median = $1.42,           P1mean = $1.1

(a) $0.332871, $1.648721

(b) $8.16617, $1.648721

(c) $1.61051, $1.648721

(d) $1.61051, $5.773534

(e) $1.648721, $8.16617

(a) The geometric average of the gross discrete returns (GAGDR) equals 1.04075 which is 104.075%.

(b) ##\exp \left( \text{GAGDR} \right) = \text{AALGDR}##. The natural exponent of the GAGDR equals the arithmetic average of the logarithms of the gross discrete returns (AALGDR).

(c) ##\text{GAGDR}^T = \left( P_T/P_0 \right)##. The GAGDR raised to the power of the number of time period that it's measured over equals the ratio of the first and last prices.

(d) ##\text{GAGDR} = \exp \left( \text{AALGDR} \right)##. This is always true, regardless of the distribution of the prices or returns. The logarithm of the geometric average of the gross discrete returns (LGAGDR) is always equal to the arithmetic average of the logarithm of the gross discrete returns (AALGDR).

(e) ##\text{AAGDR} \approx \exp \left( \text{AALGDR} + \text{SDLGDR}^2/2 \right)##. This is only approximately true and depends on the distribution of the prices and returns. It's asymptotically true as the time period that the returns are measured over reaches infinity.

(a) A's Arithmetic Average Gross Discrete Return (AAGDR) is the highest.

(b) B's Geometric Average Gross Discrete Return (GAGDR) is the lowest.

(c) C's GAGDR is higher than its AAGDR.

(d) D's AAGDR and GAGDR are equal since it's volatility is zero.

(e) C's expected utility of wealth would be the highest for an investor with a log utility function.

(a) 23.17 years.

(b) 41.31 years.

(c) 134.19 years.

(d) 536.75 years.

(e) Never.

(a) The zero coupon bond liabilities are currently priced at $0.835270 billion.

(b) If the hedge fund were to immediately liquidate all shares and repay all bond liabilities, it would have $0.264730 billion of assets now.

(c) The hedge fund's current market capitalisation of equity would be worth $0.341971 billion.

(d) The probability that the hedge fund's share assets are worth less than its liabilities when the bond matures is 58.406040% in a risk-neutral world where all assets earn the risk free rate.

(e) The probability that the hedge fund's share assets are worth less than its liabilities when the bond matures is 22.339580% in the risk-averse world where investors earn the higher returns on stocks for bearing risk.