📖 Uncategorized

Arbitrage Opportunity

AD admin3 · 📅 28 March 2025 · ⏱ 2 min read
🎓 Need help with your assignment? Get expert quotes in minutes — free to submit, no commitment. ✍️ Get Writing Help FREE

The current price of ABC stock is $50. The term structure of interest rates (continuously compounded) is flat at 10%. What is the six-month forward price of the stock?  Denote this as F. The six-month call price at strike F is equal to $8. The six-month  put price at strike F is equal to $7. Explain why there is arbitrage opportunity given  these prices.

Das, Sanjiv; Rangarajan Sundaram. Derivatives (The Mcgraw-hill/Irwin Series in Finance, Insureance and Real Estate) (p. 214). McGraw-Hill Higher Education. Kindle Edition.

arbitrage opportunity

We will determine the six-month forward price of ABC stock, FF, and then analyze whether an arbitrage opportunity exists given the call and put option prices.

Step 1: Calculate the Six-Month Forward Price

The forward price is given by the standard formula:

F=S0erTF = S_0 e^{rT}

where:

  • S0=50S_0 = 50 (current stock price),

  • r=0.10r = 0.10 (continuously compounded risk-free rate),

  • T=0.5T = 0.5 years (six months).

F=50e0.10×0.5F = 50 e^{0.10 times 0.5} F=50e0.05F = 50 e^{0.05}

Approximating e0.05≈1.05127e^{0.05} approx 1.05127,

F≈50×1.05127=52.56F approx 50 times 1.05127 = 52.56

So, the six-month forward price is $52.56$.


Step 2: Check Put-Call Parity

Put-call parity states:

C−P=S0−Ke−rTC – P = S_0 – Ke^{-rT}

where:

  • C=8C = 8 (call price),

  • P=7P = 7 (put price),

  • K=F=52.56K = F = 52.56,

  • S0=50S_0 = 50,

  • r=0.10r = 0.10,

  • T=0.5T = 0.5.

Calculate the present value of KK:

Ke−rT=52.56e−0.05K e^{-rT} = 52.56 e^{-0.05}

Approximating e−0.05≈0.95123e^{-0.05} approx 0.95123,

Ke−rT≈52.56×0.95123=50K e^{-rT} approx 52.56 times 0.95123 = 50

Now, check the put-call parity equation:

8−7=50−508 – 7 = 50 – 50 1=01 = 0

This contradiction means that put-call parity is violated, which creates an arbitrage opportunity.


Step 3: Construct an Arbitrage Strategy

Since the left-hand side of the equation ( C−P=1C – P = 1 ) is greater than the right-hand side, we exploit this mispricing as follows:

  1. Sell the call for $8.

  2. Buy the put for $7.

  3. Buy the stock for $50.

  4. Short the forward contract at $F = 52.56 (which means agreeing to sell the stock in six months at this price).

  5. Finance the stock purchase by borrowing $50 at 10% continuous compounding.

Cash Flow at Initiation:

  • Buying the stock: −50-50

  • Selling the call: +8+8

  • Buying the put: −7-7

  • No cost to enter the forward contract

  • Net cash flow: −50+8−7=−49-50 + 8 – 7 = -49

Cash Flow at Expiry (Six Months Later):

  • The stock is delivered at $52.56 under the forward contract.

  • The borrowed amount grows to:

    50e0.05≈52.5650 e^{0.05} approx 52.56

  • The put and call will cancel each other since they are at-the-money.

Final Profit Calculation:

  • Receive $52.56 from forward contract.

  • Repay $52.56 loan.

  • Initial arbitrage gain: $1.

Thus, we earn a risk-free arbitrage profit of $1 per share.


Conclusion

Since put-call parity is violated, there exists an arbitrage opportunity. By using a combination of put and call options, stock ownership, and a forward contract, we can lock in a risk-free profit.

The post Arbitrage Opportunity appeared first on Nursing Depo.

Expert Academic Help

Get Expert Help With Your Assignment — On Your Terms

  • All subjects — UK, USA & Australia specialists
  • 100% Original — Plagiarism report on request
  • Deadline from 3 hours
  • Unlimited free revisions
  • Free to submit — compare quotes
AD
Written by
admin3

Academic writing specialist and subject matter expert at GeekScholars. Helping students achieve their best academic results since 2018.

Still Struggling With Your Assignment?

Our expert writers are ready. Submit your brief now — free, confidential, and with quotes arriving in minutes.

Place My Order Free

🔒 Confidential  ·  ✅ Plagiarism-Free  ·  ⚡ Fast Delivery