Search results
Results from the WOW.Com Content Network
Suppose S 1 (t) and S 2 (t) are the prices of two risky assets at time t, and that each has a constant continuous dividend yield q i. The option, C, that we wish to price gives the buyer the right, but not the obligation, to exchange the second asset for the first at the time of maturity T. In other words, its payoff, C(T), is max(0, S 1 (T ...
Here the price of the option is its discounted expected value; see risk neutrality and rational pricing. The technique applied then, is (1) to generate a large number of possible, but random, price paths for the underlying (or underlyings) via simulation, and (2) to then calculate the associated exercise value (i.e. "payoff") of the option for ...
An increase in open interest along with an increase in price is said by proponents of technical analysis [4] to confirm an upward trend. Similarly, an increase in open interest along with a decrease in price confirms a downward trend. An increase or decrease in prices while open interest remains flat or declining may indicate a possible trend ...
As above, the PDE is expressed in a discretized form, using finite differences, and the evolution in the option price is then modelled using a lattice with corresponding dimensions: time runs from 0 to maturity; and price runs from 0 to a "high" value, such that the option is deeply in or out of the money. The option is then valued as follows: [5]
Under the trinomial method, the underlying stock price is modeled as a recombining tree, where, at each node the price has three possible paths: an up, down and stable or middle path. [2] These values are found by multiplying the value at the current node by the appropriate factor u {\displaystyle u\,} , d {\displaystyle d\,} or m ...
(Note that the alternative valuation approach, arbitrage-free pricing, yields identical results; see “delta-hedging”.) This result is the "Binomial Value". It represents the fair price of the derivative at a particular point in time (i.e. at each node), given the evolution in the price of the underlying to that point.
The Black formula is similar to the Black–Scholes formula for valuing stock options except that the spot price of the underlying is replaced by a discounted futures price F. Suppose there is constant risk-free interest rate r and the futures price F(t) of a particular underlying is log-normal with constant volatility σ.
The risk-free interest rate is 5%. XYZ stock is currently trading at $51.25 and the current market price of C X Y Z {\displaystyle C_{XYZ}} is $2.00. Using a standard Black–Scholes pricing model, the volatility implied by the market price C X Y Z {\displaystyle C_{XYZ}} is 18.7%, or: