Put-Call-Forward Parity for European Options

Put-Call-Forward Parity for European Options

Another important concept in the pricing of options has to do with put-call-forward parity for European options. This involves buying a call and bond (fiduciary call) and a synthetic protective put, which requires buying a put option and a forward contract on the underlying that expires at the same time as the put option.

Put-Call-Forward Parity

An alternative structure for a protective put is to buy a forward contract and a risk-free bond in which the face value is the forward price rather than purchasing the underlying asset. As we have established that a fiduciary call is equivalent to a “regular” protective put, it holds that a fiduciary call must also be equivalent to a protective put with a forward contract.

The fiduciary call consists of a long call and a long position in a zero-coupon bond:

$$ \text{Value at inception} = c_0 + \frac{X}{(1+r)^T} $$

The synthetic protective put is made up of a long put and a long forward:

$$ \text{Value at inception} = p_0 + \frac{F_0(T)}{(1+r)^T} $$

As the two portfolios have precisely the same payoff, their original investments should be the same as well. By setting the fiduciary call equal to the synthetic protective put, we establish the put-call parity for options on forward contracts.

$$ c_0 + \frac{X}{(1+r)^T} = p_0 + \frac{F_0(T)}{(1+r)^T} $$

Solving for \(F_0(T)\), we acquire the equation for the forward price in terms of the call, put, and riskless bond.

$$ \frac{F_0(T)}{(1+r)^T} = c_0 + \frac{X}{(1+r)^T} – p_0 $$

Where \(\frac{F_0(T)}{(1+r)^T}\) is the value of the forward today multiplied by \((1+r)^T\) to get its value at expiration.

Therefore, a synthetic forward combines a long call, a short put, and a zero-coupon bond with a face value of \(X – F_0(T)\).

Question

A European put has an exercise price of $58 that expires in 120 days. The long forward is priced at $55 (also expires in 120 days) and makes no cash payments during the life of the options. The risk-free rate is 4.5% and the put is selling for $3.00. According to the put-call-forward parity, what is the price of a call option with the same strike price and expiration date as the put option?

A. $50.43

B. $3.31

C. $0.83

Solution

The correct answer is C.

c0 = p0 + Fo/(1 + r)T – X/(1 + r)T

c0 = 3.00 + 55/(1.045)120/365 – 58/(1.045)120/365

c0 = 0.043

Shop CFA® Exam Prep

Offered by AnalystPrep

Featured Shop FRM® Exam Prep Learn with Us

    Subscribe to our newsletter and keep up with the latest and greatest tips for success

    Shop Actuarial Exams Prep Shop Graduate Admission Exam Prep


    Sergio Torrico
    Sergio Torrico
    2021-07-23
    Excelente para el FRM 2 Escribo esta revisión en español para los hispanohablantes, soy de Bolivia, y utilicé AnalystPrep para dudas y consultas sobre mi preparación para el FRM nivel 2 (lo tomé una sola vez y aprobé muy bien), siempre tuve un soporte claro, directo y rápido, el material sale rápido cuando hay cambios en el temario de GARP, y los ejercicios y exámenes son muy útiles para practicar.
    diana
    diana
    2021-07-17
    So helpful. I have been using the videos to prepare for the CFA Level II exam. The videos signpost the reading contents, explain the concepts and provide additional context for specific concepts. The fun light-hearted analogies are also a welcome break to some very dry content. I usually watch the videos before going into more in-depth reading and they are a good way to avoid being overwhelmed by the sheer volume of content when you look at the readings.
    Kriti Dhawan
    Kriti Dhawan
    2021-07-16
    A great curriculum provider. James sir explains the concept so well that rather than memorising it, you tend to intuitively understand and absorb them. Thank you ! Grateful I saw this at the right time for my CFA prep.
    nikhil kumar
    nikhil kumar
    2021-06-28
    Very well explained and gives a great insight about topics in a very short time. Glad to have found Professor Forjan's lectures.
    Marwan
    Marwan
    2021-06-22
    Great support throughout the course by the team, did not feel neglected
    Benjamin anonymous
    Benjamin anonymous
    2021-05-10
    I loved using AnalystPrep for FRM. QBank is huge, videos are great. Would recommend to a friend
    Daniel Glyn
    Daniel Glyn
    2021-03-24
    I have finished my FRM1 thanks to AnalystPrep. And now using AnalystPrep for my FRM2 preparation. Professor Forjan is brilliant. He gives such good explanations and analogies. And more than anything makes learning fun. A big thank you to Analystprep and Professor Forjan. 5 stars all the way!
    michael walshe
    michael walshe
    2021-03-18
    Professor James' videos are excellent for understanding the underlying theories behind financial engineering / financial analysis. The AnalystPrep videos were better than any of the others that I searched through on YouTube for providing a clear explanation of some concepts, such as Portfolio theory, CAPM, and Arbitrage Pricing theory. Watching these cleared up many of the unclarities I had in my head. Highly recommended.