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Black Scholes Model
What Is the Black Scholes Model?
The Black Scholes model, also known as the BlackScholesMerton (BSM) model, is a mathematical model for pricing an options contract. In particular, the model estimates the variation over time of financial instruments. It assumes these instruments (such as stocks or futures) will have a lognormal distribution of prices. Using this assumption and factoring in other important variables, the equation derives the price of a call option.
Key Takeaways
 The BlackScholes Merton (BSM) model is a differential equation used to solve for options prices.
 The model won the Nobel prize in economics.
 The standard BSM model is only used to price European options and does not take into account that U.S. options could be exercised before the expiration date.
The Basics of the Black Scholes Model
The model assumes the price of heavily traded assets follows a geometric Brownian motion with constant drift and volatility. When applied to a stock option, the model incorporates the constant price variation of the stock, the time value of money, the option’s strike price, and the time to the option’s expiry.
Also called BlackScholesMerton, it was the first widely used model for option pricing. It’s used to calculate the theoretical value of options using current stock prices, expected dividends, the option’s strike price, expected interest rates, time to expiration and expected volatility.
The formula, developed by three economists—Fischer Black, Myron Scholes and Robert Merton—is perhaps the world’s most wellknown options pricing model. It was introduced in their 1973 paper, “The Pricing of Options and Corporate Liabilities,” published in the Journal of Political Economy. Black passed away two years before Scholes and Merton were awarded the 1997 Nobel Prize in Economics for their work in finding a new method to determine the value of derivatives (the Nobel Prize is not given posthumously; however, the Nobel committee acknowledged Black’s role in the BlackScholes model).
The BlackScholes model makes certain assumptions:
 The option is European and can only be exercised at expiration.
 No dividends are paid out during the life of the option.
 Markets are efficient (i.e., market movements cannot be predicted).
 There are no transaction costs in buying the option.
 The riskfree rate and volatility of the underlying are known and constant.
 The returns on the underlying are normally distributed.
While the original BlackScholes model didn’t consider the effects of dividends paid during the life of the option, the model is frequently adapted to account for dividends by determining the exdividend date value of the underlying stock.
The Black Scholes Formula
The mathematics involved in the formula are complicated and can be intimidating. Fortunately, you don’t need to know or even understand the math to use BlackScholes modeling in your own strategies. Options traders have access to a variety of online options calculators, and many of today’s trading platforms boast robust options analysis tools, including indicators and spreadsheets that perform the calculations and output the options pricing values.
The Black Scholes call option formula is calculated by multiplying the stock price by the cumulative standard normal probability distribution function. Thereafter, the net present value (NPV) of the strike price multiplied by the cumulative standard normal distribution is subtracted from the resulting value of the previous calculation.
In mathematical notation:
BlackScholes Model
What Does the Black Scholes Model Tell You?
The Black Scholes model is one of the most important concepts in modern financial theory. It was developed in 1973 by Fischer Black, Robert Merton, and Myron Scholes and is still widely used today. It is regarded as one of the best ways of determining fair prices of options. The Black Scholes model requires five input variables: the strike price of an option, the current stock price, the time to expiration, the riskfree rate, and the volatility.
The model assumes stock prices follow a lognormal distribution because asset prices cannot be negative (they are bounded by zero). This is also known as a Gaussian distribution. Often, asset prices are observed to have significant right skewness and some degree of kurtosis (fat tails). This means highrisk downward moves often happen more often in the market than a normal distribution predicts.

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The assumption of lognormal underlying asset prices should thus show that implied volatilities are similar for each strike price according to the BlackScholes model. However, since the market crash of 1987, implied volatilities for at the money options have been lower than those further out of the money or far in the money. The reason for this phenomena is the market is pricing in a greater likelihood of a high volatility move to the downside in the markets.
This has led to the presence of the volatility skew. When the implied volatilities for options with the same expiration date are mapped out on a graph, a smile or skew shape can be seen. Thus, the BlackScholes model is not efficient for calculating implied volatility.
Limitations of the Black Scholes Model
As stated previously, the Black Scholes model is only used to price European options and does not take into account that U.S. options could be exercised before the expiration date. Moreover, the model assumes dividends and riskfree rates are constant, but this may not be true in reality. The model also assumes volatility remains constant over the option’s life, which is not the case because volatility fluctuates with the level of supply and demand.
Moreover, the model assumes that there are no transaction costs or taxes; that the riskfree interest rate is constant for all maturities; that short selling of securities with use of proceeds is permitted; and that there are no riskless arbitrage opportunities. These assumptions can lead to prices that deviate from the real world where these factors are present.
Black Scholes Calculator
You can use this BlackScholes Calculator to determine the fair market value (price) of a European put or call option based on the BlackScholes pricing model. It also calculates and plots the Greeks – Delta, Gamma, Theta, Vega, Rho.
Enter your own values in the form below and press the “Calculate” button to see the results.
Option Type: Call Put  Values  

x  Variable  Symbol  Input Value  From  To 
Spot Price  SP  
Strike Price  ST  
Expiry Time (Y)  t  
Volatility (%)  v  
Rate (%)  r  
Div. Yield (%)  d 
Option Type: Call Option
y  Axis  Symbol  Result 

Value  
d1  
d2  
Delta  
Gamma  
Theta  
Vega  
Rho 
The BlackScholes Option Pricing Formula
You can compare the prices of your options by using the BlackScholes formula. It’s a wellregarded formula that calculates theoretical values of an investment based on current financial metrics such as stock prices, interest rates, expiration time, and more. The BlackScholes formula helps investors and lenders to determine the best possible option for pricing.
The Black Scholes Calculator uses the following formulas:
d_{1} = ( ln(SP/ST) + (r – d + (σ 2 /2)) t ) / σ √t
d_{2} = ( ln(SP/ST) + (r – d – (σ 2 /2)) t ) / σ √t = d_{1} – σ √t
C is the value of the call option,
P is the value of the put option,
N (.) is the cumulative standard normal distribution function,
SP is the current stock price (spot price),
ST is the strike price (exercise price),
e is the exponential constant (2.7182818),
r is the current riskfree interest rate (as a decimal),
t is the time to expiration in years,
σ is the annualized volatility of the stock (as a decimal),
d is the dividend yield (as a decimal).
Black Scholes
This calculator does not consider dividends paid on your stock and would thus not be accurate for companies that pay them. decrease the BlackScholes value because dividends are not paid on stock options but are paid to shareholders.’);”>

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