Hedging, Insurance and Diversifying

1. Chapter Eleven Hedging, Insurance and Diversifying

2. Chapter Outline • Using Forwards And Futures • Hedging Foreign Exchange Risk With SWAP • A comparison : Insurance VS Hedging & no action • Diversification Principle (Portfolio Theory) • Computing –Correlation Coefficient • The Perfekt Diversification • An Alternative Calculation of Portfolio Variance

3. Using Forwards And Futures • Forwards • A contract between any two person, obligates one to sell and the other to buy an assetin the futureat a fixed P( FORWARD Prices, F). • Price of immediate delivery (called Spot price, Pt) • No money is paid now by either party. • The face value of the contract ( Q * F) • The buyer is said to take long position • The Seller is said to take short position • Forwards reduce risks for both buyers and sellers. • Futures (more liquid) • Standardized (quantity and quality)- • Traded in organized exchange • Sellers and buyers has separate contract (with future exchange market not with each other).

4. Example - Futures • A farmer wants to sell wheat (Q = 100 000k) . F = $2K Face value = $200 000…..in one month time. • Three transactions : • 1- Sign standardized Futures contract with future exchange (Q = 100 000k at F =$2 per k) at time (t). • 2- In a month time, the farmer sell to his own distributor and the buyer gets wheat from his supplier at the Pt+1 • 3- Each party pays (gets) the difference from the stock Exch. • Assume (Pt+1=$1.5) • Stage 2 the farmer gets ($1.5x 100 000=150 000) • Stage 3 the farmer gets( 50 000) • The opposite for the buyer

5. Hedging Foreign Exchange Risk With SWAP Contracts • Swap; 2 parties exchanging (Swapping) a series of cash flows at specific interval over specific period. It is a series of Future. • No immediate payment: goods, currencies and securities or interest rate. • counterparty • Ex. A Swedish exporter will get $100 000 a year over the next 10 years from a Chinese Company. You want to eliminate exchange rate risk. Assume: Et = F = 10 k/$. • Stage (1): You enter a currency swap now (time t) exchange $ with SEK (national amount) • Stage (2): Assume Et+1= SEK 9/$1 • The exporter recive : $100 000 (9) = 900 000SEK • Stage (3): the exporter gets 100 000 SEK from stock Exchange

6. A comparison : Insurance VS Hedging & no action • 1-Future: The Farmer can Sell using Future . F = $2 . Short position • 2-insurance: to grantee a min Pt+1 of $2. Premium = $20000. • if Pt+1 > $ • if Pt+1< $2. use the insurance (gets $180 000). • 3-No action. • If he knows for sure Pt+1 $400 $300 $200 $100 $0 No Action Insurance Hedging $0 $1.5 $2.0 $3.0 $4.0

7. Diversification Principle (Portfolio Theory) • Diversify: splitting an investment among many risky assets • Diversification Principle; Diversification can sometimesrisk exposure without E( R). • Uncorrelated assets and the right weight • EX. You have $100 000. Two stocks. For each asset if succeed = 4 times and if fail = 0. Probability 0.5(succeed) and 0.5(fail ). The current price is $1 per share • Expected Return & Variance if you by Either (A) or (B) • (1) • E (R ) = .5(0) + .5($400 000) = $ 200 000 • (2) • = 0.5(0-200 000)2+ 0.5(400 000 –200 000)2 = 40 000 000 000 • σ = √40 000 000 000 = 200 000(3)

8. Diversification Principle (Portfolio Theory) • Expected Return & Variance if a Portfolio (50% ----50%) • E( R)P = w A(E(R)A) +w B ( E (R )B) + w C (E(R)C) + (4) • E ( R)P = 0.5 (200 000) + 0.5(200 000) = 200 000 same • Variance if we know correlation( ρ): • (5) • (6) • Assume(ρ=0), usingequation(5) : • (0.5)2 (40 000 000 000)2+(0.5)2 (40000000000)2 =20000000000 • Then, σ=√20 000 000 000 = 141 421

9. Correlation • So far, we assumed that assets were uncorrelated. • In practice, assets are highly correlated ( rec. and boom) • This limit the success of diversification • When mixing 2-risky assets, correlation & the weights will determine the SD of the portfolio.

10. Example- Singel Asset or a portfolio • You have $100 000 to invest. Two stocks ( SAAB and VOLVO). You are indifferent of whether to : • buy only 1 stock, which? Or • invest in a portfolio of two? • You are given the flowing:

11. Example- Singel Asset or a portfolio • Case (1) : if you invested the $100 000 on only one stock. Which one you have to choose? • We know that

12. Example- Singel Asset or a portfolio • Case (2): What happens if we combine both? Portfolio • Put $50 000 on SAAB and $50 000 on Volvo. • Assume ρ=-1. • E( R)P = w1(E(R)1) +w2 ( E (R )2) + …. • = 0.5 (.14) +.5(.02) = 8% Regardless business cycle • = (0.5)2 (0.04) + (0.5)2 (0.04) + 2 (0.5)(0.5) (-1) (0.20)(0.20) • = 0.25 (0.04) + 0.25(0.04) – 0.02 = 0.02 -0.02 = 0 • = 0 • All risk is eliminated because (1) A NEGATIVE PERFECT CORRELATION (-1), and (2) Optimal weight

13. Computing –Correlation Coefficient • How to Calculate Correlation Coefficient? • Two steps: • Calculate the Covariance between two stocks: • = -1 (.20)(.20)=-0.04 (1) • Calculate the Correlation Coefficient (  rho): • = -04/(0.20)(0.20)= -1 (2) • IF we don’t know the Covariance. Apply : • (3) • = 1/3(.385-0.14)(-.225-0.02) + 1/3(.140-0.14)(0.02-0.020) + 1/3(-.105-.14)(.265-0.02) = - 0.04 • Asset A=SAAB, Asset B (VOLVO). (1): Strong, (2) normal, 3(weak)

14. The Perfekt Diversification • 1- Negative Correlation (ideal -1) • Assume two stocks (A och B) with : • σ A = 4 σ B = 3 and youInvest 50% on each. Calculate the risk in such portfolio. • If ρ = +1: • If ρ = +0.5: • If ρ = 0: • If ρ = -1:

15. The Perfekt Diversification • 2- Choose the Optimal Weights : • If two stocks : the optimal weight for stock (A): • That is: • The optimal weight is 0.4 286 for (a) and the rest (0.5714) for stock (B) • Try Now: • = (0.4286)2(4)2+(0.5714)2(3)2+2(0.4286)(0.5714)(-1)(4)(3) = 0

16. Example: Portfolio Weights • Suppose you have $15,000 to invest and you have purchased securities in the following amounts. What are your portfolio weights in each security? • $2000 of DCLK • $3000 of KO • $4000 of INTC • $6000 of KEI • DCLK: 2/15 = .133 • KO: 3/15 = .2 • INTC: 4/15 = .267 • KEI: 6/15 = .4

17. An Alternative Calculation of Portfolio Variance • Compute the expected return for each single stock under each state of the economy. • IF Two states (1(boom) & 2(recessio)) & 2 stocks (A &B) • E(R)A= Pr.1(R1) + Pr.2( R2) • E(R)B= Pr.1(R1) + Pr.2( R2) • Compute the expected portfolio return using: • E(R)P = w A (E(R)A+ w B (E(R)B • Compute the portfolio return for each state: • RP 1 = wARA + wBRB + boom • RP 2 = wARA + wBRB + … recession • Compute the portfolio variance and standard deviation

18. An Alternative Calculation of Portfolio Variance Three stocks with the following • Calculate portfolio Expected Returns and the variances if you invest 50% of your money on stock (A), 25% on stock (b) and 25% on stock (C ). • E(R) for each individual stock under two states: • E(R)A= Pr.1(R1) + Pr.2( R2) = .40(.10) + .60(.08) = 8.8% • E(R)B= Pr.1(R1) + Pr.2( R2) = .40(.15) + .60(.04) = 8.4% • E(R)C= Pr.1(R1) + Pr.2( R2) = .40(.20) + .60(0) = 8 % • E(R)P if wA=50% w B=25% w C=25% • E(R)P = w A (E(R)A+ w B (E(R)B + w C (E(R)C • = .5(.088) + .25(.084) + .25( .08) = 0,044 + 0,021 + 0,02 = 8.5% • The Portfolio Return: • RP= 0.50 (.10)+ .25(.15) + .25(.20) = 13.75 % If BOOM • RP= 0.50 (.08)+ .25(.0.04) + .25(0) = 5% If Recession • σ2 = .40 (.1375-0.085)2 + .60 (0.05-0.085)2 = 0.0018375 σ =

19. Example – Calculating a Portfolio’s Variance • Consider the following information • State Probability X Z • Boom .25 15% 10% • Normal .60 10% 9% • Recession .15 5% 10% • What is the expected return and standard deviation for a portfolio with an investment of $6000 in asset X and $4000 in asset Y? if you have to choose only one of these two, which one you choose? • E(R) for each individual stock under 3 states: • E(R)X=.25(.15) + .60(.10) +.15(.05) = 0,105 • E(R)Z=.25(.10) + .60(.09) +.15(.10) = 0,094 • E(R)P if wX=60% w Z=40% • E(R)P = w X (E(R)X+ w Z (E(R)Z =.60(.105) + .40(.094)= 0,1006 • The Portfolio Return: • Portfolio return in Boom: .6(15) + .4(10) = 13% • Portfolio return in Normal: .6(10) + .4(9) = 9.6% • Portfolio return in Recession: .6(5) + .4(10) = 7% • σ2P= .25(13-10.06)2 +.6(9.6-10.06)2 + .15(7-10.06)2 = 3.6924 & σ P = 1.92%

20. Example-Calculating Return-to-risk ratio • Calculation the variance for a single asset • Comparison between X and z